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A Thesis
entitled
Ignition and Combustion Characteristics of Nanoscale Metal and Metal Oxide Additives
in Biofuel (Ethanol) and Hydrocarbons
By
Matthew Jones
Submitted to the Graduate Faculty as partial fulfillment of the requirement for the
Master of Science Degree in Mechanical Engineering
____________________________________
Dr. Calvin Hong Li, Committee Chair
____________________________________
Dr. Matthew Franchetti, Committee Member
____________________________________
Dr. Yong Gan, Committee Member
____________________________________
Dr. Patricia R. Komuniecki, Dean
College of Graduate Studies
The University of Toledo
August 2011
Copyright 2011, Matthew Jones
This document is copyrighted material. Under copyright law, no parts of this document
may be reproduced without the expressed permission of the author.
iii
An Abstract of
Ignition and Combustion Characteristics of Nanoscale Metal and Metal Oxide Additives
in Biofuel (Ethanol) and Hydrocarbons
by
Matthew Jones
Submitted as partial fulfillment of the requirements for the
Master of Science Degree in Mechanical Engineering
The University of Toledo
August 2011
Metal energetic additives are added to propellants and explosives to improve
ignition and combustion performance. In particular, aluminum has been used as an
energetic material in solid-based propellant rockets and explosives for many years due to
its high combustion enthalpy and low cost. Recently, the introduction of nanotechnology
has led to significant developments in the field of energetic materials. Nanoscale
energetic materials, due to their surface area and unique thermal properties, are known to
exhibit many advantages over conventional micron sized particles. However, the current
mechanisms of nanoaluminum ignition and combustion are not fully understood.
Furthermore, studies involving suspensions of energetic nanomaterials in a liquid
medium (nanofluids) are very limited. A fundamental understanding of micron and
nanoscale aluminum combustion is critical to the design and implementation of practical
propulsion systems that use aluminum additives. Therefore, a comprehensive review on
the ignition and combustion of energetic nanoparticles was performed, with a primary
focus on aluminum, and two novel experimental studies were performed to investigate
the combustion characteristics of nanoscale aluminum (n-Al) and aluminum oxide (n-
Al2O3) in liquid fuels, namely, ethanol (C2H5OH).
iv
The first experimental study examined the heating values of several nanofluid
suspensions of n-Al (50 nm) and n-Al2O3 (36 nm) in ethanol. The primary objective of
this experimental study was to characterize the combustion reaction and gain a better
understanding of nanoaluminum oxidation in a multi-component heterogeneous system.
The heat of combustion was studied using a modified static bomb calorimeter system.
Combustion experiments were performed with volume fractions of 1%, 3%, 5%, 7%, and
10% for n-Al, and 0.5 %, 1%, 3%, and 5% for n-Al2O3. Combustion element composition
and surface morphology were evaluated using a scanning electron microscope and energy
dispersive spectroscopy system. The results indicate that the amount of heat released
volumetrically from ethanol combustion increases almost linearly with n-Al
concentration. Nanoaluminum volume fractions of 1% and 3% did not show
enhancement in the average volumetric heat of combustion, however, higher volume
fractions of 5%, 7%, and 10% increased the volumetric heat of combustion by 5.82%,
8.65%, and 15.31%, respectively. Aluminum oxide and heavily passivated n-Al additives
did not participate in combustion reactively, and there was no contribution from Al2O3 to
the combustion enthalpy in the tests. A combustion model that utilized Chemical
Equilibrium with Applications (CEA) was conducted as well and was shown to be in
good agreement with the experimental results.
Along with energy density enhancement, achieving precise control over the
reactivity of nanofluids is an opportunity for future nanoenergetic fuel applications. A
second experimental study involved the study in ignition probability of n-Al (50 nm) and
n-Al2O3 (36 nm) in ethanol and the commonly used No. 2 fuel oil (diesel). The primary
aims in this study were to study the effect of nanoenergetic additives on the ignition
v
probability of ethanol with a hot-plate setup, and to explore the underlying mechanisms
of ignition. Aluminum and Al2O3 were suspended in ethanol and diesel fuels from 0.1%
to 3% volume fractions, and dropped onto a hot plate at temperatures varying from
approximately 300 ºC to 600 ºC. The experimental probability was calculated and a
logistic regression approach was used to determine the 50% ignition threshold.
Nanoaluminum in ethanol was found to significantly increase the ignition probability:
ethanol suspensions with 1%, 2%, and 3% aluminum volume fractions ignited as much as
100 ºC lower than pure ethanol, and exhibited burning regimes similar to disruptive
combustion in slurry droplets, while ethanol suspensions with n-Al2O3 volume fractions
ignited at higher temperatures than pure ethanol. In addition, diesel mixtures with n-Al
and n-Al2O3 additives demonstrated relatively the same hot plate ignition probability as
pure diesel. Therefore, the likelihood of nanofluid ignition was strongly correlated with
volume fraction concentration, metal additive material, and surface tension (contact
angle).
vi
Contents
Abstract iii
Table of Contents vi
List of Tables ix
List of Figures x
List of Abbreviations xiv
List of Symbols xv
1 Introduction 1
1.1 Research Motivation……………………………………………….….............3
1.2 Research Objectives…………………………………………………………...5
1.3 Method of Approach……………………………………………………..…....6
2 Literature Review on Nanoenergetic Combustion 7
2.1 Combustion of Metal fuels ……………………………………………………7
2.1.1 Enthalpy of Combustion…………………………………………….8
2.1.2 Glassman‘s Criteria for Vapor-phase Metal Combustion……….....11
2.1.3 Kinetically-controlled vs. Diffusive-controlled Combustion…...…18
2.2 Micron and Nanoscale Aluminum Combustion……………………………..22
2.2.1 Characteristics of Nanoscale Materials……………………….……23
vii
2.2.2 Micron Aluminum Combustion……………………………………28
2.2.3 Nanoscale Aluminum Combustion …………………………..……34
2.3 Nanoenergetic Applications……………………………………………….…41
2.3.1 Nanocomposites…………………………………………………....42
2.3.2 Solid-based Composite Propellants……………………………..…43
2.3.3 Nanofluids……………………………………………………….....45
2.4 Summary……………………………………………………………………..49
3 Energetic Characteristics of Nanoscale Metal Additives in Biofuel 51
3.1 Experimental Methods……………………………………………………….54
3.2 Results and Discussion………………………………………………………65
3.2.1 Experimental Results…………………..…………………………..65
3.2.2 Thermodynamic Equilibrium Calculations………………………...71
3.3 Conclusions…………………………………………………………………..75
4 Ignition Characteristics of Nanoscale Metal Additives in Biofuel 78
4.1 Experimental Methods……………………………………………………….79
4.2 Results and Discussion…………………………………………………..…..89
4.2.1 Experimental Results………………………………………............89
4.2.2 Effect of Surface Tension……………………………………….…95
4.2.3 Heterogeneous Nucleation…………………….….…..…………....98
4.2.4 Theory of Thermal Droplet Ignition……………………………...101
4.3 Conclusions………………………………………………………………....104
5 Conclusions and Future Work 106
5.1 Concluding Remarks……………………………………………………......106
viii
5.2 Extensions of Research ………………………………………………….....107
References 110
Appendices
Appendix A: Sample CEA Output File for Ethanol in Air……….………….…124
Appendix B: Logistic Regression………………………………………..……..129
ix
List of Tables
Table 2.1 Thermodynamic properties of metals and their combustion products
in O2. Taken at 1 atm and initially at 298K….……………………....... 13
Table 3.1
Fuel properties of ethanol fuel and commercial diesel fuel……........
60
Table 3.2 Material properties of aluminum nanoparticle samples………………. 63
Table 4.1 Liquid fuel properties..………………………………………………... 84
Table 4.2 Additive material properties, as specified by the manufacturer…........ 84
Table 4.3 Experimental data recorded for the ignition experiments of pure
ethanol………………………………………………………………… 86
x
List of Figures
Fig. 2.1 Combustion enthalpy (heat of combustion) of energetic materials in
oxygen (O2)……………………………………………………………….. 8
Fig. 2.2 Heat of combustion of liquid fuels in O2..................................................... 9
Fig. 2.3 Calculated CEA adiabatic flame temperatures for Al in O2 and standard
air, stoichiometric reactants initially at 298 K………………..................... 15
Fig. 2.4 Calculated CEA adiabatic flame temperatures for Al in liquid water and
CO2, stoichiometric reactants initially at 298 K………………….............. 16
Fig. 2.5 Time-exposed free fall luminosity images of 215 µm Al particles in
mixtures of 21% O2 / 79% N2, 21%O2 / 79% Ar, and pure N2O, CO2,
CO. The side scale indicates distance (mm) from laser ignition…………. 17
Fig. 2.6 Schematic representation of the flame structures observed in aluminum
combustion…………………………………………………....................... 21
Fig. 2.7 Surface to bulk atom ratio for spherical iron crystals…………………….. 23
Fig. 2.8 Size dependence of melting points for Sn, and size dependent heat of
fusion for Sn……………………………………...………………………. 24
Fig. 2.9 Micron-sized aluminum vapor phase particle combustion……………….. 29
Fig. 2.10 Burning time of micron aluminum particles from 10 to 1000 μm……...... 31
xi
Fig. 2.11 Sequence of polymorphic phase transitions for micron aluminum
oxidation…………………………………………………………………... 33
Fig. 2.12 Aluminum ignition temperatures in literature………………………….…. 35
Fig. 2.13 Schematic of size-dependent self-heating rates against a constant external
heating rate………………………………………………………………... 36
Fig. 2.14 Nanoscale aluminum heterogeneous surface combustion………………... 37
Fig. 2.15 Levitas‘ diagram for nanoaluminum melting dispersion mechanism…….. 38
Fig. 2.16 Ignition temperatures for aluminum from various sources……………….. 39
Fig. 2.17 Proposed overall ignition stages of micro and nano-sized aluminum……. 40
Fig. 2.18 Combustion enthalpy for monomolecular materials and metal fuels…….. 43
Fig. 2.19 Competing effects for AP/HTPB/AL matrices, showing oxidizer/fuel
(O/F) diffusion flames and near-surface aluminum combustion…………. 45
Fig. 2.20 Microexplosion behavior of micron aluminum n-heptane slurries……….. 47
Fig. 3.1 Energy content of interest for select fuels and fuel additives in O2………. 55
Fig. 3.2 Schematic of the calorimeter system and combustion vessel…………….. 55
Fig. 3.3 Temperature vs. time data plot determined with thermocouple readings.... 56
Fig. 3.4 Calibration measurements for benzoic acid………………………….…… 59
Fig. 3.5 Experimental volumetric heat of combustion of pure ethanol fuel………. 61
Fig. 3.6 Experimental volumetric heat of combustion of sealed ethanol fuel…….. 61
Fig. 3.7 Experimental volumetric heat of combustion of diesel fuel……………… 62
Fig. 3.8 SEM images of n-Al and n-Al2O3 powder at 500 nm magnification……... 63
Fig. 3.9 Steric stabilization (left) and electrostatic stabilization (right) of additives
in a solution……………………………………………………………….. 64
xii
Fig. 3.10 a) Volumetric HoC of Eth + n-Al samples at 20 atm, and b) volumetric
and gravimetric HoC of Eth + n-Al samples……………………………... 66
Fig. 3.11 a) Volumetric HoC of ethanol + n-Al2O3 samples, and b volumetric and
gravimetric HoC of ethanol + n-Al2O3 samples………………………….. 67
Fig. 3.12 a) EDS spectra after combustion for Eth + 5% n-Al, and.b) EDS spectra
after combustion for Eth + 5% n-Al2O3…………………………………... 68
Fig. 3.13 SEM images of residual combustion products of Eth + 5% n-Al2O3 for a)
2.00 µm magnification and b) 500 nm magnification…………………….. 69
Fig. 3.14 SEM images of residual combustion products of Eth + 5% n-Al for 50
µm magnifications………………………………………………………... 70
Fig. 3.15 Calculated adiabatic flame temperatures for ethanol and aluminum
mixtures at stoichiometric conditions, for initial reactant temperatures of
298 K…………………………………………………………………….... 72
Fig. 3.16 Calculated adiabatic flame temperatures for ethanol and aluminum oxide
at stoichiometric conditions, for initial reactant temperatures of 298 K….. 72
Fig. 3.17 Calculated adiabatic flame temperatures for ethanol and aluminum
mixtures at stoichiometric conditions, for initial reactant temperatures of
298 K……………………………………………………………………… 73
Fig. 4.1 Schematic of experimental setup for the ASTM E 659 standard…………. 80
Fig. 4.2 Schematic of hot surface ignition operating parameters………………….. 80
Fig. 4.3 Schematic of the hot surface ignition experimental setup………………... 82
Fig. 4.4 Illustration of the hot surface ignition experimental setup……………….. 82
Fig. 4.5 Wire schematic of the hot surface ignition experimental setup…………... 83
xiii
Fig. 4.6 Low temperature distribution across the hotplate setup…………………... 83
Fig. 4.7 SEM image of particle size and distribution of pure Al nanoparticles
(left) and Al2O3 nanoparticles (right)……………………………………... 85
Fig. 4.8 Ethanol ignition data events, experimental probability, regression curve
and 95% confidence intervals…………………………………………….. 87
Fig. 4.9 Repeated ethanol tests over time, solid markers (■) designate the
regression fit, while empty markers the experimental probability (□)….... 88
Fig. 4.10 Ignition probability regression curves of aluminum/ethanol suspensions
compared to pure ethanol…………………………………………………. 89
Fig. 4.11 Regression curve with confidence band for pure Al in ethanol…………... 90
Fig. 4.12 Limits of ignition for pure Al in ethanol………………………………….. 90
Fig. 4.13 Regression curve with confidence band for Al2O3 in ethanol……………. 91
Fig. 4.14 Limits of ignition for Al2O3 in ethanol…………………...…..…………... 91
Fig. 4.15 Regression curve with confidence band for pure Al in diesel……………. 92
Fig. 4.16 Limits of ignition pure Al in diesel……………………………………….. 93
Fig. 4.17 Regression curve with confidence band for Al2O3 in diesel….…………... 93
Fig. 4.18 Limits of ignition for Al2O3 in diesel…………………………………….. 94
Fig. 4.19 Contact angles of ethanol/aluminum mixtures……………………………. 97
Fig. 4.20 Contact angles of ethanol and water for comparison….………………….. 97
Fig. 4.21 Schematic of a slurry fuel droplet, with regions A, B, and C….................. 98
Fig. 4.22 Characteristic ―S-curve‖ of ignition and extinction events……………….. 102
Fig. B.1 Experimental ignition data of pure ethanol (linear
model)…………………………………………………………………….. 131
xiv
List of Abbreviations
AFOSR… Air Force Office of Science Research
AIT… Auto Ignition Temperature
ALICE… Aluminum Ice Composite
AP… Ammonium Perchlorate
APS… Average Particle Size
ASTM… American Society for Testing and Materials
CEA… Chemical Equilibrium with Applications
CNT… Carbon Nanotubes
Da… Damkohler Number
DSC… Differential Scanning Calorimetry
DTA… Differential Thermal Analysis
EDS… Energy Dispersive X-Ray Spectroscopy
EPA… Environmental Protection Agency
FGS… Functionalized Graphene Sheet
HMX… Octogen
HoC… Heat of Combustion
HTPB… Hydroxyl-Terminated Poly-Butadiene
JANAF… Joint Army Navy Air Force
MDM… Melt Dispersion Mechanism
MIC… Metastable Intermolecular Composites
n-Al… Nanoaluminum
n-Al2O3… Nanoaluminum Oxide
NM… Nitromethane
SAM… Self-assembled Monolayer
SEM… Scanning Electron Microscopy
SHS… Self-Propagating High Temperature Synthesis
SRM… Solid Rocket Motor
SSA… Specific Surface Area
TEM… Transmission Electron Microscopy
TDI… Toluene Diisocyanate
TGA… Thermogravimetric Analysis
TNT… Trinitrotoluene
W… Watt
XPS… X-ray Photoelectron Spectroscopy
XRD… X-ray Diffraction
xv
List of Symbols
… Frequency factor
… Spalding transfer number
… Specific heat of surrounding gas
… System heat capacity
… Diffusivity coefficient
… Dimensionless Damkohler number
… Activation energy
… Mass consumption rate per unit area
… Gibbs energy of liquid
… Gibbs energy of vapor
… Effective latent heat of gasification ,
… Reference state of enthalpy at a temperature of 298K
... Available enthalpy
… Heat of combustion
... Heat of formation from a standard state of 298K
… Energy needed for droplet heating per unit mass of fuel gasified
… Reference state of enthalpy at a volatilization point
… Enthalpy of volatilization
… Stoichiometric fuel to oxygen ratio
K… Evaporation coefficient
… Knudsen number
… Heterogeneous specific reaction rate constant
… Specific latent heat of gasification
… Shell accumulated shell thickness
… Mass gasification rate
… Mass rate of fuel consumption
… Mass fraction (concentration) of oxidizer in the ambient stream
xvi
… Mass of vapor embryo
N… Gas concentration
… Ambient pressure, for liquid, for pressure of vapor
… Heat of combustion per unit mass
… Enthalpy of combustion
… Universal gas constant
… Activation temperature
… Boiling point
… Kinetic burning characteristic time
… Diffusive burning characteristic time
… Ambient temperature
… Stoichiometric fuel to oxygen ratio
… Volume of vapor embryo
… Average fuel molecular weight
… Pure fuel molecular weight
... Effective oxidizer concentration
… Ambient oxidizer mass fraction
… Standard normal probability density
… Statistical significance
… Beta heat transfer parameter
... Logistic regression coefficients for i = 1, 2, etc…
… Critical system Damkohler number
… Lower system Damkohler number
… Upper system Damkohler number
… Porosity
… Wetting contact angle
… Mean free path of a gas
… Thermal conductivity of air
… Logistic regression
… Ratio of the molecular mean free path length to the diameter
… Interfacial tension
... Solid volume fraction
… Free energy barrier to nucleate
1
Chapter One
Introduction
Metal additives have been utilized in solid propellants and fuels for some time
and have been shown to dramatically increase combustion enthalpies and quality. These
metalized additives in fuels combust to significantly heat up and expand the surrounding
gases, providing a larger specific impulse, the impulse per unit amount of propellant.
Common metallic materials of interest, including aluminum, boron, magnesium, and
zirconium [1], offer increases in the overall energy density of the fuel and effectively
reduce the tank storage volume. In the current state of the art implementation, energetic
additives offer a high volumetric enthalpy of combustion, facilitating transportation of
more payload per given fuel volume. However, given that the energetic additive sizes are
in the micron range and sometimes even the millimeter range, there are numerous side
effects to the combustion process, including ignition delays, slow burn rates, and
incomplete combustion of large (micron-sized) metal particles [2]. Furthermore, in
liquid-based fuels, a major challenge of dispersing metal additives is the settling of solid
particles in the fuel. Consequently, conventional liquid fuels may need to be remixed or
processed before use, due to the rapid settling of energetic additive particles.
2
This has led to new approaches to mitigate several of the disadvantages of larger metal
particle additions in fuels.
New advances in nanotechnology are being developed to understand and enhance
energy interactions in various fuel formulations. Fundamental research on nanomaterials,
such as nanoparticles suspended in fluids (nanofluids) and oxide reduction reactions
between nanoscale metals (superthermites), have led to entire new classes of energetic
materials. By taking advantage of the new functionalities offered by nanoparticles, the
reactivity and efficiency of propulsion vehicles has proven to be substantially improved.
For instance, nanoscale materials containing nanometer Al particles, can theoretically
release more than twice as much energy as the best molecular explosives [3]. Utilizing
aluminum nanoscale additives in solid-based composite propellants, it is possible to have
faster burning rates and more complete combustion [4, 5], thus improving the
performance of aluminized propellants. In liquid propellants, nanoparticles, due to their
high specific surface area, can be successfully suspended in fuels much longer than
micron-sized particles without precipitation out of the solution. In addition, recent studies
have reported reduced ignition delays in nanoaluminum suspended in ethyl alcohol and
JP-8 [6], increased catalytic activity in cerium oxide suspended in biodiesel [7], and
higher ignition probability of diesel with nanoaluminum additives [8] compared to the
base fuels. Based on these developments, the research on energetic nanomaterials has
become a topic of immense significance, and has led to a relatively new area of research
named ―nanoenergetics.‖ Current investigations are underway to further characterize the
energy contributions of nanoparticles, and to develop a unified understanding of the
relationships between nanoparticle additives and fuel performance.
3
1.1 Research Motivation
With recent advancements in nanoscale material production techniques, there has been
renewed interest in metal particle combustion and their energetic applications. The
energy consumed and cost to produce nanoparticles is reduced with the development of
new manufacturing technologies, offering nanoparticle additives that are increasingly
affordable [9]. As a result, it is now possible to routinely synthesize and characterize
nanoparticles, for instance, nanoaluminum is now commercially available as an
electroexplosively produced material named ALEX [10]. Furthermore, new low-cost
manufacturing techniques in functionalized graphene sheets have lead to their
consideration as alternatives to carbon nanotubes (CNT) [11]. Further development in
this area is expected to make these additives more available and affordable in the near
future. Presently, there are relatively few practical applications that are taking advantage
of nanoparticles ignition and combustion enhancements, and this opens up a large
window of opportunity for the research of new viable energetic fuels and their future
applications of nanoscale additives, including as advanced weapons, combustion
synthesis materials, and propellant enhancers [12].
There are many practical applications of nanoenergetic additives that have
attracted worldwide attention and given rise to new fuel formulations, however, there has
been considerable debate over the mechanism of nanoparticle ignition, and the conditions
at which nanoparticles burn. For example, considering aluminum, the most commonly
used metallic additive [13], current theoretical models cannot fully explain
nanoaluminum ignition in certain environmental conditions and particle size ranges. In
particular, bulk aluminum ignition is typically associated with the melting of the ambient
4
oxide layer at 1700-2400ºC, while the ignition temperatures of nanoscale aluminum has
been determined to be well below the bulk material value at 660 ºC [14]. A number of
experimental investigations on aluminum additive combustion have reported a wide
range of ignition temperatures even within the same particle distribution [14-17]. There is
also a critical diameter below which a vapor flame cannot be self-sustained; therefore
several investigators [18-20] have studied the conditions at which nanoparticles burn
diffusively or kinetically. Furthermore, the phenomena of the growth of the aluminum
oxide layer, effect of mechanical stresses or strains, and phase changes of the surrounding
oxide layer and core solid-liquid of core are not completely understood [21].
Consequently, more experimental studies are needed to fully characterize nanoaluminum
and along with other metals as nanoenergetic materials.
While there are a number of combustion enhancements resulting from the
addition of nanoparticles to gelled and solid-based propellants, there has been relatively
little investigative work on the combustion properties of nanoparticles suspended in
liquids (nanofluids). Nanoscale structures (< 100 nm) stably suspended in fluids give rise
to exciting new properties and phenomena. Previous studies [22, 23] have shown that the
addition of nanoparticles to liquids, such as water, may substantially improve the thermal
conductivity and mass transfer inside the liquid, even at low concentrations. For example,
it was found that carbon nanotubes suspended in oil enhance the thermal conductivity of
the mixture by as much as 250% [24]. This enhancement effect is dependent on
temperature [25], and thus provides enhanced thermal transport and heat sink capabilities
for fuels as well. Recent attention has focused on the potential large scale implementation
of nanoparticles as viable secondary energy carriers [9]. This concept proposes that pure
5
nanoenergetic materials or suspensions of nanoenergetic materials in a liquid medium can
be controllably ignited to provide a secondary release of thermal energy. The combustion
products can then be captured and reprocessed into their original nanoparticle form for
repeated use. Very few studies currently in press or within the last few years [6-8, 11, 26,
27] have investigated nanofluid combustion phenomena, and there is currently a need for
more insight into their behavior, particularly in alternative energy systems.
A projected decline in the world‘s oil production and concern of greenhouse gas
emissions have led to a recent push for increased propellant performance and
environmental sustainability. Current propellants in use, such as hydrazine, have many
negative health and environmental effects to human and animals. According to the U.S.
Environmental Protection Agency (EPA) [28], short term exposure to hydrazine can
result in permanent damage to the central nervous system, kidneys, and liver. In addition,
there is also concern about the occupational exposure of kerosene-based fuels, such as
military JP-8 and civilian equivalents Jet-A [29]. As a result, several alternative
propellants with nanoenergetic additives have been proposed such as graphene sheets or
nanoaluminum suspended in nitromethane [11, 30], and nanoaluminum suspended in
liquid or frozen water formulations [31-33]. Thus, nanoenergetics offer a range of
benefits, and it is of interest to explore other promising fuel candidates that minimize the
formation of greenhouse gases, ozone-forming pollutants, and harmful or toxic
emissions.
1.2 Research Objectives
The primary aims in this study were to study the effect of aluminum nanoenergetic
additives on the ignition and combustion characteristics of biofuel (ethanol). As a result,
6
this experimental study characterizes the combustion of commercially available
aluminum and aluminum nanoparticles to gain a better understanding of aluminum
oxidation in a multi-component heterogeneous system, and as a secondary energy carrier
suspended in ethanol. This study is one of the first studies investigating the combustion
nature of this fuel formulation. The basic combustion studies here may be extended to
more complex nanoenergetic systems, such as bimodal (combination of micron and
nanoscale) aluminum compositions, mechanically alloyed metals, or metastable
intermolecular composite (MIC) materials.
1.3 Method of Approach
The next chapter provides a brief introduction on nanoenergetic particle combustion,
particularly the work done on micron-sized and nanoscale aluminum, and the current
applications that utilize the unique features of the nanoscale additives. Chapter 3
describes a calorimeter study on the heat of combustion of the ethanol/aluminum fuel
formulations and their calculated flame temperatures, currently accepted by Nanoscale
Research Letters. Chapter 4 describes a hot plate ignition probability of
ethanol/aluminum and diesel/aluminum fuel formulations. Chapter 5 summarizes the
results and proposes future work. Finally, Appendices A and B are provided for
additional reference.
7
Chapter Two
Literature Review of Nanoenergetic Combustion
The combustion of nanoenergetics is a multidisciplinary subject, and due to their
propellant performance enhancing abilities, there has been a large body of research in
order to effectively model and understand the mechanism of nanoscale metal ignition and
combustion. A brief review of metal particle combustion is provided in section 2.1. As
shown in section 2.2, a better theoretical understanding of the thermodynamics and
reaction kinetics of micron-sized and nanoscale aluminum particles can lead to improved
combustion models and prediction capabilities. Ultimately, as reviewed in section 2.3,
this can lead to practical nanoenergetic applications that utilize the unique features of
micron and nanoscale energetic materials.
2.1 Combustion of Metal Fuels
Early works by von Grosse and Conway [34], and Glassman [35], serve as general
framework for current metal combustion models. The combustion of metal-oxygen
systems typically involves a significant release of energy, and the products of combustion
are usually condensed when at room temperature. Thus, the general equation for metal
8
( ) oxidation reactions is . Due to their high reactivity, they
are rarely found in their free (unbound) form in nature. Metals may react in the presence
of an oxidizer to form an oxide passivation layer - a thin 25Å (~2.5 nm) protective layer
that surrounds the metal particle, prevents spontaneous combustion, and impedes against
further oxidation of the metal. There are many of contributing factors that determine
which materials are best suited for a given application, including the enthalpy of
combustion (energy content), toxicity, chemical stability, cost and availability, and
properties of the metal and its oxide.
2.1.1 Enthalpy of Combustion
Metal additives are evaluated, in part, by the amount of energy they release for a given
mass or volume. As shown in Fig. 2.1, the heats of combustion for various energetic
materials are illustrated for comparison. Aluminum, boron, and beryllium offer the
Fig. 2.1: Combustion enthalpy (heat of combustion) of energetic materials in oxygen
(O2), compiled from Ref. [36].
9
highest energetic content in comparison to the other materials. Carbon has the advantage
of participating energetically, typically in the form of graphene sheets or carbon
nanotubes (CNT), without producing any residual solid oxide material [11]. In theory,
boron (a metalloid) has demonstrated to be an excellent energetic material, with the
highest volumetric heat of combustion of any known element. Furthermore, as shown in
Fig. 2.2, compared to hydrocarbon fuels boron has approximately 40% higher energy
density on a gravimetric basis and more than three times higher on a volumetric basis.
Fig. 2.2: Heat of combustion of liquid fuels in O2, compiled from Ref. [37].
Unfortunately, the practical implementation of boron-based propellants has thus far
resulted in poor combustion efficiency and low energetic performance [38]. The
combustion of boron is limited due to its inhibitive oxide coating, and ―energy trapping‖
due to the formation of HBO2 species within a hydrogen containing atmosphere [39]. As
a result, for the efficient combustion of boron particles, the oxide layer must first be
removed, and the formation of HBO2 reduced. Recent attention has focused on the
potential large scale implementation of nanoparticles as viable secondary energy carriers
[9]. This concept proposes that pure nanoenergetic materials or suspensions of
10
nanoenergetic materials in a liquid medium can be controllably ignited to provide a
secondary release of thermal energy. In addition to energetic content, a critical
consideration is the toxicity and chemical stability of the metal reactants and products.
The present concern for reduced toxicity significantly restricts the application of certain
metals. For instance, the high energy content of beryllium is particularly attractive;
however it is extremely hazardous to humans and animals even in small doses [9]. For
engineering applications, magnesium also has been used in fuel systems; though due to
its reaction with water and humid air, it is fairly unstable to handle. Other considerations
include the cost to produce, flame temperatures, material abundance, and burning
characteristics of the metal and its oxide, respectively.
Powdered spherical aluminum is the most widely used metal in energetic
materials [13], and the primary focus of the present study. Aluminum additives have been
utilized foremost in solid propellants and fuels for many years, and have been shown to
dramatically increase combustion enthalpies and quality. Aluminum is used due to its low
cost, high combustion enthalpy, high thermal conductivity, excellent surface absorption,
and low melting and ignition temperatures [13]. Furthermore, the main combustion
product of aluminum in oxygen, Al2O3, is relatively non-toxic, environmentally stable,
and may be recycled back to pure aluminum with an electrolytic reduction [9, 40]. As a
result, recently there has been a substantial amount of fundamental research in micron
[41, 42] and nanoscale aluminum [43], and also of applied research in aluminized gel
[30-32, 44], liquid [6-8, 11, 26, 27], and solid-based [4, 5, 33] propellant formulations.
There are many materials that have generated interest in regards to their
applications as energetic materials. Aluminum and magnesium have been used as
11
energetic additives to chemical rockets, mostly solid propellants, while boron has been
used for air breathing (jet engine) applications such as in ramjets [45]. When considering
energetic additives, there are many factors that determine which material to use. In
existing metalized propellants, aluminum is the leading additive used in combustion
systems due to its unique combination of low cost, commercial availability, and heat of
combustion. As a result, the primary focus of this work is on aluminum ignition and
combustion.
2.1.2 Glassman’s Criterion for Vapor-phase Metal Combustion
A significant portion of fundamental metal combustion research is whether a metal
particle will burn with a detached gaseous flame or with a surface reaction on the metal
surface. Consequently, the combustion process can be classified by the phase of the
reactants. If both the reactants are initially in the same phase, usually gases, then the
process is called homogeneous. Hence, a ―gas-phase chemical reaction‖ refers to a
homogenous reaction in which the fuel and oxidant are both gases. Heterogeneous
reactions are when the reactants initially exist in different phases, for instance a reaction
between an oxygen gas and solid coal. Furthermore, in some cases, it is possible to have
two combustion fronts, a heterogeneous one at the surface and a homogeneous one
detached. It is important to note that in some combustion literature, the terms
―heterogeneous‖ and ‗homogeneous‘ can also be defined as the interface (the location) at
which the chemical reaction occurs. To avoid misunderstanding, the terms heterogeneous
and homogeneous in this work will only denote the phase of the reactants and not the
location.
12
In liquid hydrocarbon combustion, the combustion process occurs in the gas
phase. The flame temperature exceeds the fuel saturation temperature (boiling point) at a
designated pressure, so that the fuel will vaporize and diffuse towards the oxidizing
atmosphere to react [35]. In contrast to liquid fuel droplet combustion, metal particles can
either burn homogenously as a vapor or heterogeneously as a liquid/gas surface
combustion process. In addition, metals can be classified by whether their combustion
products are volatile or non-volatile. According to Glassman‘s criterion for vapor phase
combustion of metals [35], the metal will burn in the vapor phase if the metal flame
temperature is greater than its boiling point (Tb). This flame temperature is a known
value, providing that the combustion products are non-volatile, and if the metal particle
meets this criterion, it will burn very much like a hydrocarbon droplet.
The volatility of a metal combustion product depends on the properties of the
metal and its oxide, and the available energy of the reaction. Since many metallic oxides
decompose (dissociate) into several smaller suboxides of the original metal oxide, a true
thermodynamic boiling point does not exist for most metal oxides [46]. For instance,
there is no gaseous aluminum oxide (Al2O3), only a variety of Al, O, and AlxOy species.
Rather, a ―vaporization-decomposition,‖ or ―volatilization‖ temperature exists, that is
more appropriately defined as a ―psuedo-boiling point.‖ If the enthalpy required to gasify
the metal oxide ( ), is greater than the available energy from the chemical reaction
( ), then at a given pressure the metal combustion product will be non-volatile, as
described in Eq. 2.1 below [35],
(2.1)
where is the enthalpy of combustion, and is the energy to bring the
13
metal to its volatilization temperature from an initial reference value of 298K. Analogous
to a boiling process, the metal oxide begins to decompose, and any further energy input is
absorbed by the metal oxide volatilization process without increasing the flame
temperature. Thus, for metal particle combustion with non-volatile product oxides, the
particle flame temperature can be assumed to be the metal oxide volatilization
temperature (Tvol).
On the other hand, if the energy available from the oxidation reaction is greater
than the heat of vaporization-dissociation of the metal oxide, then the combustion product
will be volatile. In this case, the flame temperature must be calculated, and compared to
the metal boiling point (Tb). Again, if the metal flame temperature is greater than its
boiling point (Tb), the metal will boil off and burn in the vapor phase; otherwise it will
occur as a heterogeneous surface reaction. As shown in Table 2.1, the thermodynamic
properties of metals and their oxides are listed. The boiling point of the metal Tb and the
Table 2.1:
Thermodynamic properties of metals and their combustion products in
oxygen. Taken at 1 atm and initially at 298K, adapted from Refs. [35, 47].
Material Tb (K) Combustion
Product Tvol (K)
(kj mol-1)
(kj
mol-1
) (kj mol-1
)
Aluminum
(Al) 2791 Al2O3 4000 1676 1860 2550
Boron (B) 4139 B2O3 2340 1272 360 640
Beryllium
(Be) 2741 BeO 4200 608 740 1060
Iron (Fe) 3133 FeO 3400 272 610 830
Lithium (Li) 1620 Li2O 2710 599 400 680
Magnesium
(Mg) 1366 MgO 3430 601 670 920
Silicon (Si) 3173 SiO2 2860 904 606 838
Titanium (Ti) 3631 Ti3O5 4000 2459 1890 2970
Zirconium
(Zr) 4703 ZrO2 4280 1097 920 1320
oxide volatilization temperature Tvol can be compared according to Glassman‘s
14
hypothesis, to determine the phase of combustion, whereas the energy required to heat up
to the volatilization temperature and then volatilize the oxide +
can be compared to the heat of formation to determine if the combustion
product is volatile. For example, for an aluminum-oxygen system initially at
stoichiometric conditions (1 atm and 298K), the heat to gasify Al2O3, 1860 kj mol-1
, is
more than the chemical energy released when the oxide is formed, 1676 kj mol-1
, hence
the oxide is regarded as a non-volatile product under those conditions. Since the flame
temperature is a known value limited to the metal oxide volatilization temperature, 4000
K, and this is larger than the metal boiling point, 2791 K, it is expected to burn in the
vapor phase. Boron, however, under the same conditions, is expected to have a volatile
combustion product B2O3 (g), and it does not necessarily have a limited flame
temperature, ultimately the calculated flame temperature would determine whether the
flame burns at the particle surface or as a vapor. In this context, for metal combustion in
pure oxygen at 1 atm, the metals Al, Be, Fe, Li, Mg, and Ti, would be expected to burn as
a vapor, while B, Si, and Zr would be expected to burn heterogeneously [47]. Regarding
Fe and Ti, the actual metal boiling points and oxide volatilization temperatures are close
enough to burn either way, due to thermal losses in the flame.
Before the availability of useful tools to calculate burning temperatures, such as
STANJAN [48] and NASA Chemical Equilibrium with Applications (CEA) [49] (also
known as the Gordon-McBride Computer Code), Glassman‘s criterion was used to
predict the combustion phase of metal reactions. With the development of
thermochemical databases such as JANAF [50] and computing machines, the adiabatic
flame temperature can be readily determined by equilibrium concentrations or the
15
minimization of free energy. In the case of high temperature metal-combustion reactions,
dissociation may occur of products back to reactants, and phase equilibrium needs to be
satisfied, hence equilibrium computations need to be performed to satisfy chemical
equilibrium. For CEA, its two combustion modules use a descent Newton-Raphson
numerical technique to minimize the Gibbs or Helmholtz free energy. As shown in Fig.
2.3, the adiabatic flame temperatures were calculated for aluminum in pure O2 and
standard dry air composition (N2 78.08%, O2 20.95%, Ar 0.94%, CO2 0.03%), with
reactants initially at 298 K.
Fig. 2.3: Calculated CEA adiabatic flame temperatures for Al in pure O2 and standard
air, stoichiometric reactants initially at 298 K, also seen in [35].
The aluminum boiling point, as shown as ―Al vapor,‖ will increase with pressure, which
can be validated by applying the Clausius–Clapeyron relation. Similarly, the adiabatic
flame temperatures will increase with increasing pressure due to less dissociation of
stable species according to Le Chatelier‘s principle. In addition, for most metal-oxygen
systems, with increased pressure there is a smaller enthalpy of volatilization ( ) for
16
the metal oxide, due to favorable equilibrium conditions of reduced dissociation [35].
Thus for isobaric combustion, aluminum metal is expected to burn in the vapor phase in
pure O2 and standard dry air composition, as predicted by Glassman‘s criterion. In
addition to total system pressure, the metal combustion phase can be influenced by the
form of the oxidizer. Depending on the oxygen reactant, the available enthalpy ( )
will be affected due to a change in the heat of reaction ( ), and thus, the phase of
combustion may change as well [47]. As shown in Fig. 2.4, stoichiometric aluminum
reactions with water and carbon dioxide initially at 298 K
are expected to start burning heterogeneously at approximately 1.5 atm and 5 atm,
respectively.
Fig. 2.4: Calculated CEA adiabatic flame temperatures for Al in liquid water and
carbon dioxide, stoichiometric reactants initially at 298 K, also seen in [35].
Experimentally, these temperatures and burning modes can be observed, Bucher reported
laser ignition of 215 µm aluminum particles burning in various atmospheres at room
17
temperature [51]. As shown in Fig. 2.5, combustion of Al in O2/N2, O2/Ar, and N2O
mixtures occur with a large envelope flame. While combustion of Al in CO2 and H2O
(steam) atmospheres have a reduced flame envelope reaction, whereas no flame envelope
exists in CO, indicating a transition to heterogeneous combustion. Furthermore, Legrand
et. al [52] observed pictures of laser ignition of Al in CO2, where the flame zone was very
near the surface, indicative of heterogeneous combustion.
Fig. 2.5: Time-exposed free fall luminosity images of 215 µm Al particles in mixtures
of 21% O2 / 79% N2, 21%O2 / 79% Ar, and pure N2O, CO2, CO. The side
scale indicates distance (mm) from laser ignition [51].
Therefore, the metal-combustion phase can change based upon the metal and metal oxide
properties and the available enthalpy from the reaction. A metal particle can be predicted
to burn with a detached gaseous flame or with a surface reaction on the metal surface, by
means of both experimental and numerical approaches, such as CEA. However, there are
some limitations to programs of this type. For instance, the CEA code specifies an output
based on a specific user input state and does not describe the reaction rate. Therefore, it
does not state how the reaction occurs, for example, if the chemical reaction occurs
18
instantly, slowly, or negligibly slow. Furthermore, it does not take into account the initial
metal oxide layer that is likely to be present. In addition, the particle size also plays a
critical role in determining the combustion phase. As a result, in the next section,
additional considerations of the chemical kinetics are required to determine the reaction
timescale and its effect on the combustion phase.
2.1.3 Kinetically-controlled vs. Diffusive-controlled Combustion
Combustion phenomena are understood to be controlled by two competing effects, the
reaction kinetics and the diffusion of chemical species and heat [53]. When the reaction
rate is slow compared to the rate of species and heat diffusion, there is adequate time to
reach spatial equilibrium. In this case, the reaction is said to be kinetically-controlled,
because the reaction rate controls the overall burning time. Examples of this combustion
regime include the initiation of combustion (ignition) and explosions. However, when the
reaction rate is fast compared to the rate of diffusion, spatial non-uniformities exist, and
the reaction can be characterized as diffusion-controlled. This regime is typical of candle
burning or fuel droplet burning. Furthermore, it is possible to have comparable kinetic
and diffusion rates, such as in premixed fuel burning. As a result, two reaction timescales
and an associated dimensionless ratio have been established as the current general theory
for metal particle combustion.
In diffusive-controlled burning, the burning regime is based on the classical ―D2‖
law for liquid droplet combustion in a quiescent atmosphere. First formulated by
Spalding [54] and Godsave [55], this approach states that the droplet lifetime is
proportional to the square of the diameter, and this holds experimentally for both droplet
19
evaporation and burning,
(2.2)
Where is the droplet diameter, the initial droplet diameter, the evaporation or
combustion coefficient, and the instant in time. By setting the final diameter to zero, the
total droplet lifetime can be described in terms of the initial diameter as,
(2.3)
Assuming infinitely fast kinetics with respect to heat and mass transport, the particle
mass consumption rate per unit area, , can be derived as [56],
(2.4)
where is mass rate of fuel consumption, the radius of the droplet, the oxidizer
density, the diffusivity coefficient, and is the Spalding transfer number. This is
exactly the expression used to describe liquid hydrocarbon droplet burning, except in the
case of metal combustion, takes the simple form of , due to no fuel volality.
Where, is the stoichiometric fuel to oxygen ratio, and is the mass concentration of
oxidizer in the ambient stream. After integration, the characteristic time scale for
diffusively controlled metal combustion is as follows,
(2.5)
Where and are the gas and particle density, respectively. Examining Eq. 2.5, the
mass diffusion coefficient is known to vary roughly as due to more molecules
being packed in a given volume, essentially hindering their movement. The gas density
( is proportional to pressure, therefore the product of is independent of pressure,
20
and thus, diffusive burning is said to be approximately independent of pressure. In
addition, because in the diffusively-controlled regime there is usually a flame limiting
temperature, it is said to be independent of the ambient combustion temperature. In other
words, it is normally unexpected that the flame temperature of a diffusively-controlled
particle is higher than its oxide volatilization point. While in kinetically-controlled
burning, i.e. - burning with fast diffusion, the particle mass consumption rate per unit area
can be written as,
(2.6)
where is the heterogeneous specific reaction rate constant for surface oxidation.
Similar to the diffusive case, after integration, the kinetic burning characteristic time is
derived as [56],
(2.7)
In this case, kinetic burning is said to be inversely dependent on pressure. To determine
which characteristic rate is dominant for a given particle, a dimensionless Damkohler
number ( ) is used, as follows,
(2.8)
indicating that for , the reaction is diffusively-controlled, the transition
point, and the reaction is kinetically-controlled. This relation predicts an inverse
relationship between particle size and pressure. Therefore, smaller particles at low
pressure favor kinetically-controlled conditions, and large particles at high pressures are
expected to burn diffusively. In general, the value of the number can vary across the
flame in accordance with the gas and particle temperature profiles and the change of the
21
particle diameter [57]. Thus, alternate regions of kinetic and diffusion particle
combustion modes may co-exist within the same flame sheet.
To illustrate this, as shown in Fig. 2.6, from left to right, there is a ―Diffusion-
Limited‖ combustion, in which there is a detached gaseous flame away from the particle
surface. In this case, the temperature peaks in the flame region, and is limited to the
Al2O3 volatilization or ―boiling‖ temperature. In the ―Transitional‖ schematic, the
diffusive rates become faster relative the kinetic rates and the oxidizer can diffuse closer
to the particle surface. In this case, a kinetic or a near surface diffusively controlled
regime may prevail. Finally, the ―Shrinking Core‖ schematic illustrates a kinetically-
controlled regime, where a fast heterogeneous reaction occurs, and the entire particle is
consumed in a heterogeneous fashion. This is expected to occur for very small
(nanoscale) particles.
Fig. 2.6: Schematic representation of the flame structures observed in aluminum
combustion [20].
Thus, in both vapor phase and heterogeneous combustion of metals, there are two known
22
competing characteristic timescales, kinetic and diffusive, and the number is used to
predict which timescale is present. A burn time relation of yields a classical
diffusive combustion, while yields a kinetically-limited flame [20]. The particle
enthalpy of combustion, combustion phase, and reaction timescales are all significant
features of aluminum combustion, particularly as the particle diameter is reduced to the
nanoscale. This leads to many practical applications of nanoscale materials, however, it is
also important to understand the underlying cause. In the next section, the unique features
of nanoparticles are explored and the current theoretical understanding of micron-sized
and nanoscale aluminum particles is briefly reviewed.
2.2 Micron scale and Nanoscale Aluminum Combustion
Nanoscale energetic materials, due to their surface area and unique thermal properties,
are known to exhibit many advantages over conventional micron sized particles. New
combustion regimes are being reported that have significant practical applications. There
has been a good amount of research on micron-sized aluminum combustion, as recently
reviewed by Beckstead [41]. However, for nanoscale aluminum combustion, there
currently has been considerable debate over the mechanism of nanoparticle ignition, and
the exact conditions under which the particle burns. Similar to very fine coal particles,
nanoscale aluminum has the ability to burn on its surface. Nanoaluminum synthesis and
combustion have been reviewed and describe the first nanoaluminum applications being
explored [1, 3, 13, 47]; however, there have been recent advances that deserve attention.
23
2.2.1 Characteristics of Nanoscale Materials
Nanoscale energetic materials are known to exhibit many advantages over conventional
micron sized particles. Several thermodynamic and heat transfer properties can be
changed, primarily attributed to an increase in surface-to-bulk atom ratio and specific
surface area. This high specific surface area leads to more surface available to react, and
thus leads to higher reactivity. As the size of a bulk material approaches the nanoscale, its
surface area will increase with respect to its volume. As shown in the Fig. 2.7, a reduction
in particle size has the ability to increase the surface atom to bulk atom ratio for spherical
iron nanocrystals [58].
Fig. 2.7: Surface to bulk atom ratio for spherical iron crystals [58].
Atoms at the surface of a particle are exposed to their environment and are in a state of
higher energy than interior bulk atoms [59]. Consequently, the cohesive energy, or the
energy required to loosen an atom from the surface, is decreased with decreasing particle
sizes. These surface atoms are more loosely bound than the bulk atoms, and surface
tension effects for nanoscale solid materials are no longer negligible. In addition, due to
their small diameters, the temperature uniformity within the particles is enhanced, and the
24
particles quickly reach equilibrium with their surroundings. Therefore, the non-
dimensional Biot numbers are usually below unity, and Fourier numbers increase [47].
As a result, nanoscale particles will often exhibit different properties and behaviors than
larger particles of the same substance.
In differential scanning calorimetry (DSC) and nanocalorimetric measurements, it
was discovered as the size of particles decrease, there is a corresponding decrease in
melting point temperature and heat required for melting (heat of fusion). As a result, there
has been considerable research interest in melting point depression and size-dependent
heat of fusion phenomenon. This phenomenon encompasses a wide range of materials, as
shown in Fig. 2.8.a, for tin (Sn) nanoparticle diameters ranging from 50 nm to 5 nm, the
melting point temperatures were reduced from 232°C to approximately 160°C. Also
illustrated in Fig. 2.8.b, the normalized heat of fusion for Sn can decrease as much as
70% [60].
Fig. 2.8: a) Size dependence of melting points for Sn, and b) size dependent heat of
fusion for Sn [60].
For experimental studies with nanoaluminum, first systematically studied by Eckbert et.
al [14], a wide range of ignition temperatures have been observed. Lai et al [15]
performed nanocalorimetric measurements and found a decrease in melting temperature
25
up to 140°C. Comparing to Lai and Eckbert‘s results, Sun and Simon [16] performed a
DSC study and found a reduced magnitude of melting point depression, proposing that
the compressive force of the oxide layer increased their melting point values. After using
an integrated form of the Clausius–Clapeyron equation, the effect of the compressive
pressure on the melting point temperature was calculated, and a corrected value was
obtained. Dreizin‘s group [17] performed differential scanning calorimetry on
nanoaluminum powders and found that nano-aluminum melting temperatures were much
lower than bulk value melting temperatures in all cases. They also found that data
between melting models that predict DSC signals and experimental results only
qualitatively matched. Furthermore, a melting point study based on molecular dynamics
suggested that Al clusters of 1 nm can ignite as low as 400 K (127° C) [61].
Presently, experimental DSC responses and predictive theoretical melting models
have met with limited success. Theoretically, size-dependent melting point depression
can be described using variants of the classical Gibbs-Thompson model [16], with the use
of different models based on the selected assumptions. With this model, it is assumed
that the heat of fusion decreases with particle size due to the increase in the solid-liquid
surface energy (surface tension). Although the melting phenomena are not fully
understood yet, it is suggested that the greater mobility of surface atoms and a decrease in
cohesive energy partly determines the fall or rise of the melting point of a nanosolid [62].
Authors have also suggested that the change in melting temperature is triggered by
increasing fraction of lattice defects or surface irregularities with decreasing particle size
[16], or metal/metalloid impurities [21]. Furthermore, a recent review reported that
discrepancies between the particle surface energies and those found in the literature
26
suggest that the conditions under which the Gibbs-Thompson equation is used needs to
be reconsidered [63]. As a result, there may be aspects of the melting process that remain
to be taken into account and there is a need for more detailed experimental analysis with
corresponding theory that is accurate on the nanoscale.
When developing models for nanoparticle combustion, it is also important to take
into consideration the mean free path of air with respect to the particle diameter. For
instance, the mean free path of air at ambient pressure is approximately m
(~66 nm) [64]. As will be shown, micron-sized aluminum particles tend to burn with a
flame stabilized around the particle. Because micron particles are much larger than the
mean free path of air, they can sustain a detached gaseous flame. However, when
developing combustion models on the nanoscale, it is possible that particles are smaller
than the mean free path of air. As a result, there may be a critical diameter below which a
vapor flame cannot be self sustained. The Knudsen number below is used to determine
whether the continuum assumption, that particles can be considered macroscopic objects
in a continuous gas, is valid [56],
(2.9)
where is the mean free path of the surrounding gas, and is representative length scale,
in this case the particle diameter. The mean free path, or the average distance of a particle
between collisions, can be defined as,
(2.10)
where is the ratio of the molecular mean free path length to the diameter, and N is the
gas concentration. In a free molecular regime , the nanoparticles can be
27
considered large burning particles, however, nanoparticles are typically smaller than the
mean free path, and a continuum burning model may not be valid. Therefore in
combustion modeling, there are three regimes that may be considered, that being a
continuum regime, free-molecule regime, and a transitional regime [65].
Other considerations for nanoscale additives are presence of an ambient metal
oxide layer, which is significant in determining the fuel additive energy potential.
Depending on the metal and layer thickness, the enthalpy of combustion and combustion
rate may be decreased, or oxidation may be inhibited altogether. For nanoparticle
diameters of 20 nm or less, the oxide layer becomes a more prominent part of the particle
volume, accounting for approximately 60% energy loss per volume [66]. Therefore, it is
expected that nanoparticles release more energy when taken as a whole, due to more
complete combustion; however, there may be a lower limit of the particle diameter on the
energetic enhancement of nanoparticles. As a result, to prevent any oxidation, the metal
must be first be synthesized and then stored in an inert atmosphere, such as argon.
Furthermore, post-processing techniques can selectively coat the outer layer with another
material altogether, such as with organic self-assembled monolayers (SAMs). For
example, a recent study investigated alkyl-substituted epoxide capping on the surface of
aluminum, and determined that the particles were effectively passivated, but were no
longer pyrophoric [66]. Nonetheless, the development of surface modifying and synthesis
techniques needs to be considered when utilizing nanoscale materials.
As will be described more in section 2.4, these unique configurations of increased
surface to volume ratio, temperature uniformity, melting point depression, and oxide
layers have many practical applications in nanoenergetic materials. An increase in surface
28
area can lead to increased chemical reactivity, allowing more fuel to be in contact with
the oxidizer. For instance, catalytic activity is essentially a surface area phenomenon, and
the active surface at which the reaction takes place is increased when the surface to
volume ratio is increased. Gold, being a noble metal, is normally regarded as chemically
inert, however, for particles 5 nm or less, gold was found to be catalytically active [67].
In particle thermal ignition, which may be defined as when the particle self-heating rate is
greater than the external heating rate, smaller particles self-heat more effectively,
therefore it is proposed the particles may ignite at lower temperatures under a constant
heating rate. Furthermore, physical properties of nanoparticles such as melting point are
important because they heavily influence the ignition temperature and oxidation of
nanoscale metals. Finally, the reaction time scales can change due to smaller diffusion
distances, and the close proximity of the fuel and oxidizer may reduce the diffusion
length and increase the reaction (burning) rate. Therefore, the experimental combustion
nature of a micron versus nanoscale metals, specifically aluminum, is described in the
following two sections.
2.2.2 Micron Aluminum Combustion
As predicted by Glassman‘s criterion of vapor phase combustion, aluminum is expected
to burn as a vapor because the boiling point, or vaporization-dissociation point, of
aluminum oxide is higher than the metal‘s boiling point. The particle is expected to
closely follow the diffusively-controlled D2 liquid hydrocarbon droplet combustion;
however, it cannot be directly extended to model aluminum combustion without several
modifications. The fact that the final diameter does not reduce to zero, the condensation
29
of an oxide cap and actual deposition of the oxide cap on the particle, and limited flame
temperature are three key modifications that need to be considered when modeling
aluminum. As mentioned, there are exceptions when micron aluminum will continuously
burn in a kinetically-controlled heterogeneous reaction, such as in CO atmospheres [52].
Nevertheless, in gaseous micron aluminum combustion, the ignition event is typically
associated with melting or cracking of the ambient oxide layer at approximately 2350 K
(2070 ºC), that protects the metal. In the case of cracking, the particle is first heated up,
and the core aluminum melts to form liquid aluminum. Liquid aluminum has a density of
2.4 (g/cm3) and solid aluminum has a density of 2.7 (g/cm
3), therefore there is an
approximate 12% volumetric expansion of the core, leading to cracking [68]. Ignition is
then initiated on the exposed aluminum with a heterogeneous surface reaction, the
interior metal begins to evaporate and diffuse towards the surrounding oxidizer, and the
product aluminum oxides (primarily ALO) condense as an oxide cap (Al2O3) on the
particle. The particles then usually burn with a detached diffusion flame as shown in Fig.
2.9.
Fig. 2.9: Micron-sized aluminum vapor phase particle combustion [69].
30
The maximum flame temperature is then maintained at the vaporization-dissociation
temperature of the oxide, until the entire oxide cap is dissociated. Consequently, the
flame temperature is predetermined by the vaporization–dissociation temperature of the
aluminum oxide, and the surrounding environment temperature exerts a small influence
on the particle burning time [20]. Overall, there are approximately 16 different
elementary reactions (surface, gas-phase, disassociation, and condensation) within the
presence of H2O, CO2, and O2 oxidizers [41].
Dreizin characterized the entire process of micron aluminum combustion, for
free-falling droplet diameters of 85, 120, 165, and 190 μm, in air [42]. There were three
proposed distinct phases of aluminum ignition in air. The first stage comprised of
spherically symmetric vapor phase combustion with a smoke cloud, modeled by the
conventional vapor phase droplet combustion theory. Subsequently, there is a
nonsymmetrical particle combustion characterized by particle spinning and an increase in
size and density of the smoke cloud. Finally, there is a formation of an oxide cap and
decrease in particle temperature. Experimentally, one common prediction of the metal
burning mode is to plot the burning time against the particle diameter, and fit a power law
relation with an exponent [20]. As shown in Fig. 2.10,
31
Fig. 2.10: Burning time of micron aluminum from 10 to 1000 μm, from Ref. [41].
Beckstead [41] compiled micron burning times from over 400 datum points and ten
sources to illustrate that micron-sized particles burn in the diffusive (D2) regime,
however, the effect of condensation of the oxide cap on the particle, and the fact that the
particle diameter does not reduce to zero, slightly reduce the exponent to around 1.5 or
1.8. Based on the combustion data from over ten different sources, Beckstead proposed
an empirical relation for burning times of aluminum particles,
where,
(2.11)
32
for
for
and an effective oxidizer concentration, , is expressed as a mole fraction ( ) of O2,
H2O, and CO2,
with O2 being approximately twice more effective as an oxidizer than H2O and about five
times more effective than CO2. Thus, Eq. 2.11 is the current expression commonly used
to describe micron aluminum combustion up to the current time.
Also in micron aluminum research, thermogravimetric analysis (TGA) has
identified an evolution of aluminum oxide material properties according to the
surrounding temperature rise. The natural amorphous aluminum oxide may exist in
several different crystalline forms (polymorphs) that change according to its temperature
rise, that being amorphous → γ → δ → θ → α-Al2O3 [70], leading to a step-wise particle
mass increase. Simultaneous differential thermal analysis (DTA) and thermogravimetric
analysis can determine the mass increase due to aluminum oxidation according to
temperature, and X-ray diffraction (XRD) patterns of samples oxidized determine the
polymorph phase. As shown in Fig. 2.11, Trunov et. al [71] identified four different
oxidation stages (I, II, III, and IV), in the first stage, as the metal is heated, the natural
amorphous alumina layer grows until it reaches a critical thickness (approx. 5 nm), and
then the oxide layer fractures and transforms into a crystalline γ-alumina phase.
33
Fig. 2.11: Sequence of polymorphic phase transitions for micron aluminum [1].
In the second stage, the γ-alumina oxide layer increases in density and molten aluminum
leaks through the γ-alumina faults, growing into the third stage as one of the similar
intermediary transitions such as δ or θ. In the final polymorph stage, the oxidation rate
increases and the crystalline structure becomes significantly dense as α-alumina.
Furthermore, it also was qualitatively proposed that these phase transformations are
responsible for the wide range ignition temperatures of nanoscale aluminum that are
currently being reported, as described in the next section.
In general, the simple hydrocarbon droplet combustion model can be extended to
model aluminum particle combustion; however, several modifications need to be
considered. Aluminum either ignites due to cracking under thermal stress or melting of
the oxide shell. As mentioned in previous experiments, an oxide cap develops and the
particle diameters do not reduce to zero, thus the exponent for the D2 law is reduced to
1.5 or 1.8. Very detailed computational models have been formulated, that are highly
dependent on the assumptions used. Beckstead‘s model [72] shows good agreement
34
between the model and available experimental data. However, most of these models
assume gaseous combustion with infinite kinetics, when aluminum approaches the
nanoscale, kinetics can have a much larger influence and both gas and surface phase
reactions need to be considered for an accurate representation. Nonetheless, even for
micron particles, some aspects, such as the physics of oxide condensation, are not
completely understood [35].
2.2.3 Nanoscale Aluminum Combustion
In nanoscale aluminum combustion, the conditions at which particles combust and the
cause of ignition are still unclear. Due to limited information on the burning of
nanoparticles, there is no current suitable model [18]. Due to their small scale, diffusion
becomes faster relative to the reaction rates, and it is expected to be a kinetically-
controlled regime. Similar to very fine coal particles, nanoscale aluminum has the ability
to burn on its surface. In this case, a fast heterogeneous reaction occurs, and the entire
particle is consumed in a heterogeneous fashion. In contrast with bulk aluminum ignition,
a number of experimental investigations on nanoaluminum combustion have reported a
wide range of ignition temperatures, even within the same particle distributions, as shown
in Fig. 2.12,
35
Fig. 2.12: Aluminum ignition temperatures in literature, sources are provided in Ref.
[71].
Thus, the ignition temperatures of nanoscale aluminum have been determined to be near
the aluminum melting point at 660 ºC, well below the bulk material value of 1700-
2400ºC. Similar to micron-sized ignition, the ignition event is typically associated with
melting or cracking of the ambient oxide layer. As mentioned at the end of last section,
Trunov et al. [71] suggested that the wide range of nanoparticle combustion is a result of
the sequence of four polymorphic phase transformations. A qualitative analysis suggested
that, within the four-stage oxidation, different particle self-heating rates were responsible
for the range of ignition temperatures, as shown in Fig. 2.13.
36
Fig. 2.13: Schematic of size-dependent self-heating rates against a constant external
heating rate [71].
Three different self-heating curves (fine, intermediate, and course particles), can intersect
with an external heating rate that is determined by the thermal analyzer. For a constant
external heating rate (―particle heating rate‖), smaller particle ranges are expected to
trigger the transition to the second oxidation stage (γ-alumina) at lower temperatures;
however, this transition to the second stage can be delayed under higher heating rates.
Again, thermal ignition may be defined as when the self-heating rate is greater than the
external heating rate [35]. Therefore, nanoparticles self-heat more efficiently, and this
may be a contributing factor to ignition.
Rai et al. [73] proposed that aluminum nanoparticle oxidation occurs in two
distinct regimes. At temperatures below the melting point of aluminum, a slow oxidation
occurs with oxygen-limited diffusion through the aluminum oxide shell. At temperatures
above the melting point of aluminum, a fast oxidation occurs with both aluminum and
oxygen diffusing through the oxide shell, followed by a hollowing of the aluminum core
37
at temperatures above 1000 °C. In the case of oxidation through the shell, it is a surface
phenomenon with transport of reactants through the oxide shell, as shown in Fig. 2.14.
Fig. 2.14: Nanoscale aluminum heterogeneous surface combustion, where the ―surface‖
is between ―Liquid Al‖ and ―Al oxide‖ [69].
In the case of shell rupturing, once the integrity of the surface coating is destroyed, the
exposed aluminum undergoes a direct kinetically-controlled surface reaction. Due to
higher curvature of the particle, the oxide shell is in tension and the aluminum core is in
compression, and this results in easier mechanical rupturing of the coating compared to
large particles [73]. However, under very high heating rates, a new fast oxidation
mechanism, named the melting dispersion mechanism (MDM), was discovered for
nanoaluminum particles in shock-tube experiments under heating rates in the order of 107
°C/ s [74, 75]. The change in volume due to fast melting of the nanoaluminum core
induces of pressures of 0.1–4 GPa, and causes spallation of the oxide shell, as shown in
Fig. 2.15.
38
Fig. 2.15: Levitas‘ diagram for nanoaluminum MDM [74], also observed in Ref. [75].
This and several other models cannot currently be modeled by diffusion oxidation
models. Furthermore, the phenomena of the growth of the aluminum oxide layer, effect
of mechanical stresses or strains, and phase changes of the surrounding oxide layer and
solid-liquid of the core are not completely understood [21].
Consequently, several investigators [18-20] have studied the conditions at which
aluminum particles burn diffusively or kinetically. As the size of the particle is reduced,
there is a transition at which diffusively-controlled burning particle will start to burn
kinetically-controlled. A formal study of nanoaluminum oxygen found that a transition is
expected to occur around 10 μm for a pressure of 8.5 atm [20]. In this case, Beckstead‘s
Eq. 2.11 in the last section is no longer valid for very small diameters. Similar to
Beckstead‘s expression, Huang [18] proposed the following kinetic expression, for the
39
burning of aluminum dusts in air,
(2.12)
Where is in cm, , , and is the universal gas constant.
Comparing Huang‘s model to the model for micron aluminum, experimental
data on the burning time can be plotted, as shown in Fig. 2.16.
Fig. 2.16: Ignition temperatures aluminum from various sources, sources are provided
in Ref. [18].
This illustrates that a transition between the and burning regimes is expected to
be anywhere for diameters of approximately 6 μm to 20 μm. However, there is still little
information on the conditions that this transition occurs. Several different techniques are
used to determine this transition, one being the empirical power law fit of burning time,
and others include measuring the effect of pressure and temperature on the burning time.
While diffusively-controlled particles burn at an approximately known temperature and
40
are independent of pressure, kinetically-controlled particles are known to have a high
dependence on the atmospheric temperature and pressure. As shown in Fig. 2.16, it can
be seen that nanoparticles burning at 3500 K have much shorter burning times than 1500
K or 2000 K, further suggesting that they burn kinetically-controlled. A more direct
approach is to observe if any gaseous phase combustion products exist. Therefore,
emission spectrography of flame fronts can determine which species are present, for
instance, significant amounts of the vapor product AlO in the surrounding gas-phase
indicates there is a diffusively-controlled mechanism [76]. Furthermore, when oxidizer
availability is changed, in other words, the diffusion coefficient is changed; this
should affect diffusive burning and not have an influence on kinetic burning [57].
Taking micron and nanoscale aluminum into consideration, the entire aluminum
combustion process can be divided into five major stages [69], as shown in Fig. 2.17.
Fig. 2.17: Proposed overall ignition stages of micro and nano-sized aluminum [69].
41
Starting with stage 1) there is particle heating with phase transformations, 2) core melting
due to cracks or melting of oxide layer, 3) heterogeneous reactions or healing of cracks,
4) particle consumption due to heterogeneous reactions for nanoscale particles, or melting
of oxide layer to form an oxide cap for micron-sized particles, and finally 5) a detached
vapor phase flame front for micron-sized particles. The critical stage is between stages 3)
and 4), in which the dominant characteristic rate determines whether the entire reaction
will be kinetically-controlled or switch to diffusively-controlled. Although many studies
provide useful information on the behavior of nanoaluminum combustion, further
experimental studies are needed to fully characterize nanoaluminum in certain
environmental conditions and particle size ranges. Furthermore, there are relatively few
practical applications are taking advantage of the unique characteristics of the nanoscale,
most notably the higher specific surface area, higher reactivity, shorter burning times,
and overall more complete combustion. In particular, the system design of new energetic
or fuel propellants can benefit from these characteristics.
2.3 Nanoenergetic Applications
There are many practical applications to nanoenergetic additives that have attracted
worldwide attention and given rise to new fuel formulations. Because aluminum has been
the most applied and experimented metal additive, the focus of this section will be on
aluminum. With recent advancements in nanoscale aluminum production techniques,
there has been renewed interest in metal particle combustion and their energetic
applications. Presently, there are relatively few practical applications are taking
advantage of nanoparticles ignition and combustion enhancements, and this opens up a
42
large window of opportunity for the research of new viable energetic fuels and their
future applications of nanoscale additives, including as advanced weapons, combustion
synthesis materials, and propellant enhancers [12]. Due to the relatively limited studies
involving nanoenergetics suspended in liquid fuels, other currently applied formulations
such as condensed metal reactions and solid-based composite fuel applications are also
reviewed.
2.3.1 Nanocomposites
The combination of decreased particle sizes, diffusion distances, and increased surface to
volume ratio have lead to a new class of condensed metal reactants called
nanocomposites. Also called thermites, or metastable intermolecular composite (MIC)
materials, they are a powdered mixture between a metal (fuel) and metal-oxide (oxidizer),
and can combust in an exothermic reduction-oxidation reaction between a metal and a
metallic or non-metallic oxide. The material is most commonly mixed with aluminum;
hence, a thermite reaction is sometimes called an aluminothermic reaction. However,
other common metals used include but are not limited to Mg, B, Ti, and Zr, along with
metallic oxides Fe2O3, CuO, MoO3, and C2F4 [47] For example, the classic thermite
reaction used is ferric oxide and aluminum, as shown below,
2 (2.13)
is commonly applied in welding. Monomolecular materials such as trinitrotoluene (TNT)
and octogen (HMX) are typically limited in their heat of combustion compared to metal
reactions, as shown in Fig. 2.18 [1].
43
Fig. 2.18: Combustion enthalpy for monomolecular materials and metal fuels [1].
Conventional micron-sized thermites are also limited due to their low rates of energy
release. However, for these nanocomposite materials, also known as ―super-thermites,‖
the combustion rate, velocity, and energy density can be controlled. In particular, the
unique combination of a high rate of energy release and heat of combustion make these
formulations attractive. For example, these nanoenergetic materials offer more than twice
the energetic release than traditional monomolecular materials [3]. Furthermore, it is
possible to add a relatively small amount of nanocomposite to micron-aluminum in order
to dramatically increase its burning rate, with little overall change to combustion
enthalpies [77]. This has many applications in materials processing, such as self-
propagating high temperature synthesis (SHS), and in explosives and military
applications as well.
2.3.2 Solid-based Composite Propellants
There also have been many new developments in solid based propellant formulations due
to nanoenergetic additives. For solid fuel chemical rockets, an entire block of premixed
44
fuel and oxidizer propellant, called a grain, is stored within the combustion chamber. The
current standard used solid based fuel-oxidizer system in solid rocket motor (SRM)
applications is an aluminum fuel mixture with an ammonium perchlorate (AP) oxidizer.
An elastomeric binding agent solidifies the fuel-oxidizer mixture, most commonly
hydroxyl-terminated poly-butadiene (HTPB), and curing agents are considered for
processing, such as epoxy thermosetting toluene diisocyanate (TDI). In addition, various
catalysts such as ferric oxide and titanium dioxide can be used to accelerate burning. In
this mixture (matrix), aluminum typically reacts with combustion products of the
energetic oxidizer and binder, such as H2O and CO2, at its volatilization temperature [35].
For solid aluminum metalized propellants, two large sources of combustion inefficiency
are the accumulation of slag, which are residue aluminum products, and incomplete
combustion. Conventional aluminum particles increase the chamber temperature, in order
to provide a larger specific impulse. However, because agglomerated molten particles at
the surface lift off, they do not significantly alter the burning rate. Dokhan reported that
enhanced rates were found for ultra-fine micron aluminum added to AP-based propellant,
with enhancement increases for reduced Al size [4]. It was discovered that when using
nanoaluminum additives, the particles burn near the binder matrix surface, and thus, it is
possible to have increase burning rates and reduce the size of slag particles, improving
the performance of aluminized propellants [20]. As shown in Fig. 2.19, the competing
effects of micron or nano aluminum additives can reduce (a, b) or increase (c, d) the
burning rate.
45
Fig. 2.19: Competing effects for AP/HTPB/AL binder matrices, showing oxidizer/fuel
(O/F) diffusion flames and near-surface aluminum combustion [5].
Nano-aluminum was found overcome the competing effects, as shown in (d), and
increases the propellant burning rates by 60–100% when compared to micro-aluminized
propellants [5]. As a result, bimodal burning can be used in solid propellant combustion
to tailor the combustion rate for particular applications.
2.3.3 Nanofluids
In contrast with solid propellants, gelled and liquid propellants can be throttled in the
engine, allowing longer range flight missions than SRM powered vehicles. Recent
attention has focused on nanoenergetic additives dispersed in liquid fuels, which offer
numerous capabilities and advantages to liquid fuel combustion. However, thus far there
have been relatively few advances in the ignition of colloidal suspensions. Previous
46
studies [22, 23] have shown that the addition of nanoparticles to liquids (nanofluids),
such as water, may substantially improve the thermal conductivity and mass transfer
inside the liquid even at low concentrations. For example, it was found that the measured
thermal conductivity of oil with suspended carbon nanotubes are anomalously (>250%)
greater than theoretical predictions and are nonlinear with nanotube loadings [24]. Thus,
this provides opportunities for enhanced thermal transport and heat sink capabilities, and
leads to several significant applications, such as in two-phase heat transfer or reducing
the pumping power in heat exchangers. In addition, there may be combustion instabilities
in both liquid-fueled and solid-fueled systems due to unsteady acoustical waves in the
combustion chamber. These traveling waves can result in high-frequency, or ―screech‖
oscillations, can result in pressure variations that can sometimes result in catastrophic
motor failure. Agglomerated metal particles have also been shown to dampen acoustic
vibrations that may lead to these combustion instabilities. The magnitude is dependent on
the mass fraction of particles in the chamber, and generally, larger particles have the
ability to damp lower frequencies, while smaller particles can damp out higher
frequencies [78]. It may be interesting to see what applications nanoparticle additives
have to offer in this area.
Recent attention has focused on the potential large scale implementation of
nanoparticles as viable secondary energy carriers [9]. This concept proposes that pure
nanoenergetic materials or suspensions of nanoenergetic materials in a liquid medium can
be controllably ignited to provide a secondary release of thermal energy. The combustion
products can then be captured and reprocessed into their original nanoparticle form for
repeated use. Previous studies have shown that suspended metallic colloids also have
47
the ability to be optically ignited by a simple light source, such as a camera, resulting in a
multipoint or ―distributed ignition‖ within a combustion engine [79]. Local disruptive
burning behavior similar to microexplosive slurry droplet combustion has recently been
observed for nanoaluminum suspended in ethanol [27]. As shown in Fig. 2.20, as the
droplet evaporates in a heated environment, there is a formation of a nonvolatile glass-
like shell from the particles left behind, leading to ignition.
Fig. 2.20: Microexplosion behavior of micron aluminum n-heptane slurries [80].
It has been suggested that this combustion regime enhances local turbulence and
promotes more complete combustion [80]. In addition, recent studies have reported
reduced ignition delays for rapid aerosol compression of nanoaluminum additives in
ethanol and JP-8 [6]. In monopropellants, the linear burning rates of nitromethane
(CH3NO2) were found to be enhanced by nanoaluminum (38 nm and 80 nm) additives in
deflagration studies [30]. It was demonstrated that nanoaluminum also shows promise to
replace any non-energetic gelling agents (i.e. - fumed silica), due to its large interfacial
area. In a later study, the linear burning rates of CH3NO2 were also found to be increased
by aluminum oxide (ALOOH), silica (SiO2), and functionalized graphene sheet additives
[11]. It was suggested that increased burning rates were due to enhancements in radiation
and thermal conductivity. Tyagi [8] demonstrated that hotplate ignition probability can be
48
enhanced in hydrocarbons (diesel fuel) with nanoaluminum (50 nm) and nanoaluminum
oxide (15 and 50 nm). With aluminum volume fractions of 0%, 0.1%, and 0.5%, hot plate
droplets were found to have much higher ignition probability regardless of the aluminum
size or form. Finally, experimental studies with cerium oxide in liquid fuels are known to
display increased catalytic activity, resulting in oxidation of hydrocarbons and
functioning as an oxygen buffer against NOx formation. Cerium oxide additives to
biodiesel resulted in reductions of NOx by approximately 30% and reductions of
hydrocarbon emissions by 25-40% [7]. Therefore, nanoparticles can function as a catalyst
and an energy carrier, as well. In addition, due to the small scale of nanoparticles, the
stability of the fuel suspensions should be markedly improved.
Several investigations with nanoaluminum in liquid and frozen H2O oxidizer
systems exemplify how nanoscale energetic materials can enhance the reactivity in
propellants while maintaining ―green‖ reaction products [31]. Risha et al. investigated the
combustion behavior of nanoaluminum and liquid water in an argon environment [32].
Nanoaluminum and liquid water with no gelling agent were heavily packed into quartz
microtubes and ignited, it was found that the mass burning rate was 157% faster when the
diameter was decreased from 130 nm to 50 nm, while micron-sized aluminum did not
ignite at all. Originally proposed for micron particles [81], unpassivated aluminum and
steam (H2O) can react to produce hydrogen, with three possible reactions [82],
(2.14)
(2.15)
(2.16)
By carrying and reacting in-situ hydrogen from an Al/H2O mixture, as opposed to
49
carrying cryogenic hydrogen along with a fuel delivery system [32], this offers new
capabilities to make H2 on demand without storage or transport of hydrogen. This has
great interest to offer more non-toxic alternatives to the currently deployed hydrazine
propellants and in underwater propulsion applications, where the oxidizer does not need
to be carried on board the vehicle. Building upon this research, latest fuel research with
nanoaluminum and frozen water (ice) composites, offer increased handling and safety to
the fuel [33]. The official name for this is formulation is aluminum-ice (ALICE), and is
being jointly researched and developed by Pennsylvania State University, NASA, Purdue
University, and the Air Force Office of Scientific research (AFOSR). These composites
show improved vacuum specific impulse over traditional AP/HTPB/AL composites. This
formulation is very difficult to ignite with larger sized aluminum, however, with
nanoparticles, their increased surface area provide more reactivity with water, and
scientists have successfully used nanoaluminum (80 nm) frozen in ice to launch a rocket.
Furthermore, there is an interest in retaining the aluminum combustion products and
reducing them back into the original aluminum fuel. As a result, current developments of
utilizing nanoaluminum in liquid and frozen water formulations show great promise, and
are being considered for lunar and Mars propulsion systems .
2.4 Summary
There has been a considerable amount of research on the combustion of micron and
nanoscale aluminum metal. As expected, the current costs of implementation may be an
obstacle; however, further development in this area is expected to make these additives
more available and affordable in the near future. Nonetheless, a fundamental
50
understanding of micron and nanoscale aluminum combustion is critical to the design and
implementation of practical propulsion systems that use aluminum additives.
Nanocomposites, solid-based, gelled, and liquid fuels all have demonstrated available
benefits to nanoparticle additives. However, relatively little investigative work has been
performed on nanofluids. More experiments on the feasibility of these fuels, especially
the combustion of nanofluid fuels, are needed to explore novel applications of
nanoparticles.
51
Chapter Three
Energetic Characteristics of Nanoscale Additives in
Biofuel
In this work, the combustion properties and performance of nanoaluminum (n-Al)
and nanoaluminum oxide (n-Al2O3) additions to liquid ethanol (C2H5OH) were
qualitatively and quantitatively investigated. As mentioned in chapter two,
nanoaluminum suspended in ethanol can lead to reduced ignition delays [6] over pure
ethanol. Nanoaluminum additives in ethanol also exhibit excellent stability
characteristics, in comparison to micron particles [27]. Furthermore, micron particles are
difficult to ignite and maintain the reaction. With limited studies on this fuel formulation,
the primary objective of this experimental study was to characterize the combustion and
gain a better understanding of n-Al oxidation in a multi-component system. As a result,
the heat of combustion (HoC) was studied using a modified static bomb calorimeter
system. Combustion experiments were performed with volume fractions of 1%, 3%, 5%,
7%, and 10% for n-Al, and 0.5 %, 1%, 3%, and 5% for n-Al2O3. Finally, thermodynamic
equilibrium calculations were carried out and compared to the experimental results. The
fundamental combustion studies in this study may be extended to more complex
nanoenergetic systems.
52
This experimental study characterizes the combustion of commercially available
aluminum (Skyspring, corp.) and aluminum oxide (Nanophase, corp.) nanoparticles in
ethanol. Thermally conductive nanoscale additives in ethanol are known to significantly
enhance thermal transport properties in the liquid mixture. Ali et al [83] performed a
systematic hot-wire beam displacement study of pure Al nanoparticles (18 nm) in water,
ethyl glycol, and ethanol at volume fractions from 0.085% to 0.42%. Their reported
enhancements of thermal conductivity and thermal diffusivity in ethanol were 24.27%
and 29.43%, respectively. Hu et al [84] utilized a transient hot-disk method to evaluate
the thermal conductivity of AlN nanoparticles (20 nm) in ethanol, resulting in a 20%
increase in thermal conductivity at a volume fraction of 4%. Furthermore, Allen et. al [6]
blended nanoaluminum (50 nm) within ethanol and kerosene-based JP-8 to reduce
ignition delays in a rapid compression machine by 32% and 50%, respectively, and the
authors proposed that a reduction in ignition delay may be a direct consequence of
increased thermal conductivity leading to accelerated internal heating and evaporation of
Al-ethanol nanofluid droplets. Furthermore, nanoaluminum additives in ethanol exhibit
excellent stability characteristics, and micro explosive behavior similar to disruptive
slurry droplet combustion [27].
Ethanol is widely used as a biofuel and oxygenated (oxygen containing) fuel
additive, in order to reduce greenhouse gases from fossil fuel use and promote energy
diversification. Alcohols contain oxygen and thus more fuel can be burned with the same
amount of air. The first chemical rockets, and the first manmade objects to achieve
spaceflight, such as the V2 rocket, consisted of liquid oxygen (LOx) and ethanol systems
[85]. Since then, other liquid fuels have been developed and used, such as kerosene-
53
based derivates JP-8 and Jet-A. Nonetheless, ethanol production and technology still
plays a major role in U.S. government incentives and public policies. Ethanol was
chosen based on its use as an oxygenated biofuel, and its complete combustion products
in pure O2 of CO2 and H2O [41]. Both of these products are possible oxidizers for
aluminum, under certain environmental conditions, yielding the following global
reaction mechanism, if O2 is assumed the reactant,
(3.1)
This global reaction does not express all the elementary features of combustion; however,
its detailed mechanism is currently known, with kinematic models available for the fuel
[86]. Furthermore, proponents of ethanol state that its low overall emissions compared to
gasoline, high octane number, and relatively low bio-toxicity make it an attractive
alternative fuel. Any spillage of pure ethanol may be simply diluted with water and
disposed of down the drain [87]. On the contrary, ethanol detractors believe that its low
energy content, poor ignition characteristics in general, and low flame temperatures are
drawbacks that make it less viable. It also easily contaminates soil and water supplies,
although it has been shown to biodegrade faster than hydrocarbon-based fuels [37].
Aluminum is used due to its numerous applications as an energetic material, high
volumetric heat of combustion, high thermal conductivity, excellent surface absorption,
and low melting/ignition temperatures [13]. If O2 is assumed the primary oxidizer for
aluminum combustion, the global reaction mechanism is as the following,
(3.2)
The main combustion product of aluminum, Al2O3, is environmentally stable and may be
recycled back to pure aluminum with an electrolytic reduction [9, 40]. Therefore, when
54
considering ethanol‘s lower energy density, aluminum combustion within ethanol could
be regarded as a viable formulation, if its energetic value is practical. Furthermore, if the
poor ignition characteristics of ethanol, especially in cold weather conditions, and low
flame temperatures are mitigated, that would greatly increase its attractiveness as an
alternative fuel. Obviously, these are just a small number of the considerations when
examining the use of alcohols, such as methanol and ethanol, within current propulsion
systems. Nevertheless, generally speaking, more research and development on the
feasibility of novel alternative fuels are needed to meet increased environmental
regulations and fuel efficiency in the near future.
3.1 Experimental Methods
As discussed in chapter two, fuels are evaluated, in part, by the amount of heat released
during combustion. Calorimetry is defined as the science of measuring the heat released
from chemical reactions or physical changes [88], and oxygen (O2) bomb calorimeters
are commonly used to determine the enthalpy of combustion for solid and liquid samples.
The enthalpy of combustion, defined as the amount of heat released per unit of sample, is
commonly expressed as calories per gram (cal/g), Btus per pound (Btu/lb.), or
Joules/gram (J/g). Oxygen bomb calorimeters are sufficiently precise that they are widely
used in laboratory instruction and commercial procedures with heat of combustion. It is
important to know that the enthalpy of combustion may be expressed volumetrically
(MJ/L) or gravimetrically (MJ/kg), as shown for liquid fuels and fuel additives in Fig.
3.1.
55
Fig. 3.1: Energy content of interest for fuels and fuel additives in O2 from [36, 37].
Regarding constant volume calorimeter experiments, the reactants are enclosed in a
stainless steel vessel and ignited in pure O2 to ensure complete combustion. The heat of
combustion of the fuel sample is determined indirectly from the heat transfer to the
surrounding distilled water. In the present study, the combustion experiments were
carried out with a modified static bomb calorimeter under a closed hood, as shown below
in Fig. 3.2.
Fig. 3.2: Schematic of the calorimeter system and combustion vessel [88, 89].
56
The calorimeter system is assumed to be adiabatic, resulting in no heat transfer (ideally)
between the system and the ambient environment. The only heat transfer that occurs is
assumed to be between the combustion vessel and the surrounding water within the
system itself. Approximate 1 gram samples were placed on the combustion capsule, and
combustion was initiated with an ignition unit via electrical discharge through a Ni-Cr
alloy fuse wire (length of 10 cm) in contact with the sample. Experiments were carried
out in the presence of 2 liters of distilled water in the oval bucket with pure O2 pressures
of 20 atm. In the case of liquid or solid samples, the total heat liberated in the combustion
process is primarily due to three sources: 1) the combustion of a fuel sample, 2) the
ignition of a fuse, and 3) the formation of extraneous acids such as nitric acid (HNO3)
and sulfuric acid (H2SO4). The water temperature rise was then determined from the
average of four T-type thermocouples embedded in the system, as illustrated in Fig. 3.3.
Fig. 3.3: Temperature vs. time data plot determined with thermocouple readings.
57
Note that the markers in Fig. 3.3 indicate a temperature reading every 50 seconds, while
the actual acquisition system recorded temperatures every 10 seconds. After combustion,
the interior of the vessel was washed with a jet of water and a titration procedure of the
residual products (bomb washings) using sodium carbonate (Na2CO3) and methyl red
indicator determined the amount of nitric acid formed. It was determined that no
significant amounts of extraneous acids were formed in this study.
In order to determine the heat of combustion of a given sample, the heat capacity
of the calorimeter system first needs to be determined by using a calorimetric standard.
The total system heat capacity is a summation of the heat capacities of the combustion
vessel and its contents, the surrounding water, any component submerged in the water,
and the calorimeter jacket. In this study, the heat capacity and accuracy of the system
were determined by calculating the heat transferred to the water by the combustion of
benzoic acid (C7H6O2), having a quoted energy of combustion of 6318 calories per gram.
For one gram ) samples of benzoic acid with predetermined heats of combustion ( ),
the system heat capacity ( ) was determined by the following equation,
(3.3)
where is the correction value for any sources of heat other than the
sample, such as the formation of nitric acid, or the combustion of fuse wire. Each
centimeter of consumed fuse wire represents 2.3 calories of extraneous heat released
during combustion of the wire, and each millimeter of alkali used to titrate the bomb
washings represents 1 calorie set free by the oxidation of nitrogen to form nitric acid, if a
concentration of 0.0709 N sodium carbonate was used for titration [89]. The term is
the recorded temperature rise accompanying the combustion event (°C). Ultimately, it
58
was discovered that several flushes of the vessel with O2 removed any residual nitrogen
in the vessel, and the samples used in this study did not contain the necessary sulfur to
form sulfuric acid.
In actual experiments, a small amount of radiation may have been introduced, in
this case, a radiation correction for is used, as derived in ASTM Designation D240
[90]. Before ignition, the system typically gains a small amount of heat from the
surrounding air, and after ignition, the system water is warmer than air and this results in
a loss of heat to the air. The D240 method attempts to correct the radiation effect, by
assuming that the calorimeter is equally heated by its surroundings before ignition, after
ignition, and during the first 60 % of the temperature rise. In all subsequent calculations;
the corrected net temperature rise is used,
(3.4)
where the following constants are selected from a plot, such as in Fig. 3.3,
a ≡ time of firing
b ≡ time when the temperature reaches 60 % of the total temperature rise
c ≡ time for steady state temperature, after the temperature rise
≡ temperature at time of firing
≡ temperature at time c
≡ rate of temperature rise during the 5 min. period before firing
≡ rate of temperature rise during the 5 min. period after time c
If the temperature was falling instead of rising after time a or c, the quantities
or become positive.
59
The standard procedure described in the literature recommends at least four
experiments for system calibration [88]. For eight consecutive calibrations, the
experimental heat capacity for the system was determined to be 2523 calories per °C, as
shown in Fig. 3.4.
Fig. 3.4: Calibration measurements for benzoic acid, represented stoichiometrically as
C7H6O2 (s) + 7.5 O2 (g) → 7 CO2 (g) + 3 H2O (l).
Not included in the Fig. 3.4 are periodic combustion of benzoic acid to check the system
for accuracy. Once the system has been calibrated with , the enthalpy of combustion
for any sample may be found with the following relation,
(3.5)
For liquid fuel samples, due to safety concerns, the fuse wire was connected to the liquid
by a cotton thread string. The cotton thread empirical formula CH1.686O0.843 was used with
an energetic value of 16250 J per g [91]. In all cases the fuel sample was to remain at
approximately one gram, and volumetric calorific values were determined from mass to
volume conversions and verified by sample experimental volume measurements.
60
In liquid fuel combustion, the higher heating value (HHV) & lower heating value
(LHV) are both different ways to express the energetic value heat of combustion of a
material. Higher heating value assumes that all of the water vapor combustion products
have condensed, and that the heat of vaporization given up to vaporize the water is
returned. The lower heating value assumes that all the moisture generated in combustion
is in the vapor phase; therefore the HHV is usually 10-20% higher than the lower heating
value. Constant volume bomb calorimetry measures the HHV; however, it may be
possible that moisture generated has not fully condensed to recover the heat of
vaporization given up, within the timeframe of data collection. Therefore, the
experimental calculations included in this report do not discriminate between phase
change and reaction enthalpies. It is assumed that all moisture generated in ethanol
combustion has condensed. To be conservative, an additional ±2.5% error could be
added. As shown in Table 3.1 and Fig. 3.5, for pure ethanol runs, the experimental
volumetric heat of combustion (HoC) was 21.67 ± 1.08 (MJ/L), this is in reasonable
agreement with published values. The approximated 2 MJ/L difference may be due to
using a different grade pure ethanol in this study.
Table 3.1: Fuel properties of ethanol fuel and commercial diesel fuel [36].
Fuel Density
(g/cc)
Literature
HHV (MJ/kg)
Literature
HHV (MJ/L)
Experimental
HoC (MJ/kg)
Experimental
HoC (MJ/L)
Ethanol
(99%) 0.789 28.86 23.4 27.44 ± 1.35 21.67 ± 1.08
Diesel 0.86 45.9 37.3 45.34 ± 2.2 38.54 ± 1.87
61
Fig. 3.5: Experimental volumetric heat of combustion of pure ethanol fuel.
Since ethanol is very volatile, mixtures were prepared and loaded into the vessel
immediately before experiments. In an effort to reduce the experimental error, adhesive
tape sealants were also tested, as shown in Fig. 3.6.
Fig. 3.6: Experimental volumetric heat of combustion of sealed ethanol fuel.
When sealing each combustion capsule, a sheet of 3M transparent tape was stretched
62
across the top of the capsule. Any excess tape over the side was trimmed off, and the
empty capsule was weighed. A small opening in the tape was made to prevent the tape
from collapsing onto the sample under high pressures. However, difficulties in applying
in the seal to the capsule, relatively high uncertainty values compared to pure ethanol,
and the required slower rate of oxygen supply when charging the vessel, resulted in not
using adhesive seals for all subsequent liquid samples. Commercial diesel fuel was also
investigated, as plotted in Fig. 3.7, which was determined to have a relatively large
margin of error. For additive suspensions in diesel, it was determined that additive
loadings could not exceed approximately 0.5% volume fractions without settling.
Fig. 3.7: Experimental volumetric heat of combustion of diesel fuel
In this study, n-Al particles were suspended in pure ethanol with volumetric
fractions of 1%, 3%, 5%, 7%, and 10%, and n-Al2O3 particles were suspended in pure
ethanol with volumetric fractions of 0.5%, 1%, 3%, and 5%. Additive n-Al and n-Al2O3
particles were of 50 nm and 46 nm size, respectively, with properties specified by the
manufacturer in Table 3.2. Since aluminum and aluminum oxide present extreme cases
63
with respect to energy content, aluminum oxide was used as an additive and was
hypothesized to not participate reactively in the experiments.
Table 3.2 Material properties of aluminum nanoparticle samples, including average
particle size (APS) and specific surface area (SSA).
Material Manufacturer Oxide phase
True density
(g/cc)
APS
(nm) SSA (m2/g)
Al (99.9%) Skyspring Amorphous 2.7 50 20-48
Al2O3
(99.5%) Nanophase 70:30, δ:γ 3.6 46 36
Scanning electron microscope (SEM) images in Figs. 3.8 and 3.9 below display the
similar size diameter and size distribution of the nanoaluminum materials. Note that n-
Al2O3 was less conductive than pure aluminum, and was less illuminated.
Fig. 3.8: SEM images of n-Al powder (left) and n-Al2O3 (right) and at 500 nm
magnification.
An Energy Dispersive X-Ray Spectroscopy (EDS) was performed before ignition and it
was determined that the atomic composition of n-Al samples were 78.53% Al, 19.48% O,
and of n-Al2O3 samples were 53.52 % Al, 46.48 % O. Both metals were suspended in
fuels until they exhibited a thick and claylike consistency (i.e. - to the observed threshold
of nanoparticle stability).
Five experiments were performed for each volume fraction and corresponding
64
additive. By applying alternating high and low pressure cycles of sound through the
solution, a simple mechanical dispersion method was used to separate agglomerated
particles. Fuel samples were sonicated in an ultrasonic cleaner for at least 30 minutes at
47 kHz with a power rating of 143 watts. Ultrasonic-induced cavitation applies
mechanical stresses between particles to break apart and reduce agglomeration. Two
additional approaches to stabilization include electrostatic stabilization and steric
stabilization, as shown in Fig. 3.9.
Fig. 3.9: Steric stabilization (left) and electrostatic stabilization (right) of additives in
a solution [92].
In steric or chemical stabilization, an absorbed compound layer alters the surface
properties to separate particles from each other. Previous studies of alumina powders
dispersed in ethanol have used surfactants, or have shown that absorbed acetic acid
generates a steric barrier between alumina particles [93, 94]. Therefore, by modifying the
acidity of the system, the suspending ability can be controlled. In electrostatic
stabilization, the particles are separated by Coulomb repulsion of like charges. In this
case, an electrical double-layer forms when a particle is placed in the dispersing medium.
The interior layer is called the surface charge, and the outer layer is the diffuse layer.
However, electrostatic stabilization is often not used due to the low dielectric constant of
ethanol. In the present author‘s experiments, no gelling agents, apart from the
65
nanoparticles themselves, or surfactants were used, in order to eliminate any contribution
from any other additives than nano-aluminum (n-Al) and nano-aluminum oxide (n-
Al2O3). Once ignited, the total corrected enthalpies of combustion were determined from
the net temperature increase and subtraction of extraneous heat of formations.
Despite being a well controlled instrument to measure thermodynamic properties,
it is important to note that there are errors inherent to using calorimeter-type systems. The
three sources of uncertainty can be attributed to the uncertainty in additive volume
fraction (sample mass and volume measurements), nonadiabaticity of the system, and the
performance variation of the ethanol suspensions themselves. Uncertainties in volume
fraction may be inclusive to the standard error in the samples graphed in the following
experimental figures.
3.2 Results and Discussion
3.2.1 Experimental Results
The nomenclature for the aluminum suspension samples will be as follows: for an
aluminum nanoparticle suspension volume fraction of 5% in ethanol, it will be indicated
by Eth + 5% Al, or Eth + 5% Al2O3 for alumina. As shown in Fig. 3.10a and 3.10b, the
energetic values are represented for volume fractions of Eth + n-Al samples at 1%, 3%,
5%, 7% and 10% with a standard deviation error.
66
(a) (b)
Fig. 3.10: a) Volumetric HoC of Eth + n-Al samples at 20 atm, and b) volumetric and
gravimetric HoC of Eth + n-Al samples.
Initially, at volume fractions of 1% and 3%, there was found to be a decrease in energetic
release for n-Al ethanol suspensions. With subsequently larger volume fractions, there
was an enhancement in volumetric energy release, indicating a transition to one of the
Al2O3 polymorphic phases. It was determined that the n-Al nanoparticles had an
oxidized n-Al2O3 layer on the surface, and that the volumetric HoC was lower than that
of pure ethanol at the volume fractions of 1% and 3% due to the existence of a surface
67
oxidization layer. Once the volume fraction was higher than 3%, more heat of
combustion was released from n-Al in the reaction process, and the volumetric heat of
combustion increased linearly. It is interesting to note that even though there was an
increasing trend in HoC versus volume fraction in Fig. 3.10a, there was a relatively
constant gravimetric HoC for all volume fractions in Fig. 3.10b.
The following Figs. 3.11a and 3.11b show the energetic values for n-Al2O3 samples.
(a)
(b)
Fig. 3.11: a) Volumetric HoC of ethanol + n-Al2O3 samples at 20 atm, and b)
volumetric and gravimetric HoC of ethanol + n-Al2O3 samples.
68
These nanoparticles have a dominating component of Al2O3 coating that was found to
increase the stability of the samples. However, as predicted, the n-Al2O3 nanoparticles did
not react with the ambient vessel O2. In Fig. 3.11.a, n-Al2O3 suspensions exhibited a
linear decreasing trend of energetic release due to the displacement of reactive ethanol. It
is readily apparent in Fig. 3.11.a that the volumetric HoC‘s were more than 2 MJ/L lower
than that of n-Al samples at equivalent volume fractions of 1% and 3%. This confirmed
that the volumetric HoC‘s of Eth + n-Al samples at 1 and 3% were lower than that of
pure ethanol due to oxidization layers. An EDS technique was performed on the residual
combustion products for Eth + 5% n-Al and n-Al2O3, and it was determined that in both
cases the Al:O atomic ratio was approximately 30:60, corresponding to a Al2O3 atomic
composition, as shown in Figs. 3.12a, and 3.12b.
(a)
(b)
Fig. 3.12: EDS spectra after combustion for a) Eth+5% n-Al, and.b) Eth+5% n-Al2O3.
69
The figures illustrate a near identical EDS response after combustion, which indicates a
thorough combustion of n-Al. Note that there is a background level of carbon due to
carbon mounts used in SEM analysis. Figure 3.13 shows the surface morphology of
residual nanoparticles after combustion. It was determined that, once ignited, the
nanoparticles will be quickly oxidized as n-Al2O3 and fused together in a nanoporous
structure. In particular, Eth + 5% n-Al samples will coagulate into droplets, while Eth +
5% n-Al2O3 will flake into a powdery substance.
Fig. 3.13: SEM images of residual combustion products of Eth + 5% n-Al2O3 for a)
2.00 µm magnification and b) 500 nm magnification.
This was characteristic of both n-Al and n-Al2O3 combustion products, however, some
parts of the residual combustion products of pure aluminum in ethanol exhibited surfaces
such as Fig. 3.14.
70
Fig. 3.14: SEM images of residual combustion products of Eth + 5% n-Al for 50 µm
magnifications.
Generally, it was experimentally shown that the amount of heat released from ethanol
combustion increases almost linearly with n-Al concentrations. Nanoaluminum volume
fractions of 1% and 3% deviated from the average volumetric heat of combustion from
that of pure ethanol by 3.78% and 0.66%, respectively. Higher volume fractions of 5%,
7%, and 10% increased the volumetric heat of combustion by 5.82%, 8.65%, and
15.31%, respectively. Nanoaluminum oxide or heavily passivated n-Al does not
participate reactively.
The experimental heat of combustion can be determined with an energy balance
within the system,
, (3.6)
where Q is the heat transfer between the interior of the vessel to the surrounding water,
W is the boundary work, and U is the internal energy of the system. Considering a
constant volume process,
, (3.7)
is the predetermined heat capacity of the vessel and water system, and ΔT is the
temperature change of the system after the combustion reaction. To determine the
71
enthalpy change within the vessel, the definition of enthalpy is used,
, (3.8)
where H is the enthalpy, P is the pressure within the vessel, and V is the vessel volume,
340 cm3. Assuming an ideal gas within the vessel, and combining Eqs. 3.7 and 3.8, the
experimental HoC can be rewritten as,
, (3.9)
where is the change in moles of gas reactants and products, and R is the ideal gas
constant (8.3145 J mol-1
k-1
). For the determined constant heat capacity ( of the
system, the first and final terms of Eq. 3.9 indicate that combustion products with higher
flame temperatures will have larger enthalpies of combustion (HoC).
3.2.2 Thermodynamic Equilibrium Calculations
The combustion thermodynamics was modeled using the NASA CEA computer program
[49]. This code calculates chemical equilibrium product concentrations and determines
thermodynamic properties for the product mixture. By the minimization the Gibbs or
Helmholtz free energy, or the maximization of entropy, adiabatic flame temperatures can
be estimated, as shown in Appendix A. It was assumed that all reactants were initially at
room temperature (298 K), undergoing a constant pressure combustion, as in most
practical applications. As shown in Fig. 3.15, ethanol with an added 10% Al by volume
resulted in a 6 to 9% increase in adiabatic flame temperature over the range of pressures,
and an 8.27% increase at the initial experimental pressure 20 atm.
72
Fig. 3.15: Calculated adiabatic flame temperatures for ethanol and aluminum mixtures
at stoichiometric conditions, for initial reactant temperatures of 298 K.
Fig. 3.16: Calculated adiabatic flame temperatures for ethanol and aluminum oxide at
stoichiometric conditions, for initial reactant temperatures of 298 K.
73
This 8.27% adiabatic flame temperature increase is comparable to the 8.65%
experimental HoC increase due to n-Al additives. A calculation for 20% aluminum in
ethanol predicts a much larger (17%) increase in flame temperature. As shown in Fig.
3.16, ethanol with 5% Al2O3 volumetric concentration resulted in a 1 to 2% lower flame
temperature than pure ethanol, agreeing with the experimental result that n-Al2O3 did not
participate in combustion. Similarly, a calculation for 10% Al2O in ethanol predicts a
further decrease of the flame temperature, displacing more ethanol fuel. Furthermore, as
shown in Fig. 3.17, the calculated adiabatic flame temperatures for solid and vaporized
aluminum in O2 were logarithmically compared to liquid ethanol with Al and Al2O3
volumetric concentrations, similar to Figs. 2.3 and 2.4 in chapter 2.
Fig. 3.17: Calculated adiabatic flame temperatures for ethanol and aluminum mixtures
at stoichiometric conditions, for initial reactant temperatures of 298 K.
74
The change in the combustion regime may also be predicted from Fig. 3.17. For
Al and fuel-oxidizer mixtures with flame temperatures below the Al vaporization
temperature, combustion is expected to occur as a heterogeneous surface reaction. While
mixtures with flame temperatures above the Al vaporization temperature typically occur
in a diffusive gas-phase. Again, this transition in combustion mode has been
experimentally measured; a transition for 10 µm Al in O2 was shown to occur at
approximately 10 atm [20]. In Fig. 3.17, pure ethanol in O2 has a higher adiabatic flame
temperature than the Al vaporization temperature up until approximately 4 atm. Over the
same range of pressures, ethanol with 10% Al additives exhibited flame temperatures
above the Al vaporization temperature up until approximately 14 atm. This indicates that
Al additives in biofuel could significantly influence the combustion regime of the
mixture.
The influence of the oxide layer was taken into account, by incorporating a
bimodal mixture of Al and Al2O3 into the fuel. For the reactant mixture of ―C2H5OH (L)
+ 5% Al : 5% Al2O3 in O2,‖ Fig. 3.17 illustrates a 3.8 to 5.5% decrease in adiabatic flame
temperature from the 10% Al ethanol mixture. This further illustrates the inert
characteristics of Al2O3, and that the presence of an oxide layer significantly reduces the
total combustion energy released from the Al-ethanol mixture. Furthermore, another
interesting result is a clear correlation with threshold of enhancement for the experiment
and thermochemical calculation. In the experiments, it was observed that the threshold
for the energetic enhancement of ethanol was with 3% volume fraction of pure Al. From
Fig. 3.15, the threshold for the flame temperature increase was with also with 3% volume
fraction of pure Al. Taking this into account for a bimodal mixture of 3% total volume
75
fraction, the calculated CEA threshold for the flame temperature enhancement was a
mixture of approximately 1.3% Al + 1.7% Al2O3. For this mixture, data processing of a 1
gram sample yields 36% and 43% active Al content in mass and volume. The thickness
of the oxide coating can then be estimated from the following equation [16]:
(3.10)
Where (2.7 g/cc) and (3.2 g/cc) are the aluminum and amorphous Al2O3
densities, is the outer mean particle radius, and is the pure Al content by mass. Based
on the threshold of experimental and simulation energetic enhancement (3%), the
estimated oxide layer thickness from this calculation was 6.6 nm. It is likely the oxide
layer thickness increased due to exposure to the atmosphere during storage, additional
uncertainty may be attributed to the exclusive nature of Al and Al2O3 in the software and
adiabatic flame assumptions. Authors commonly estimate this oxide thickness from the
particle size distribution and transmission electron microscopy (TEM) imagery. Other
ways to estimate this can be derived from thermogravimetric analysis [16] or binary
phase diagrams [69]. This experimental study proposes a basic new method of oxide
thickness approximation based on experimental HoC and thermochemistry data.
3.3 Conclusions
Combustion element composition and surface morphology were evaluated using a
scanning electron microscope and energy dispersive spectroscopy system. The results
indicate that the amount of heat released volumetrically from ethanol combustion
increases almost linearly with n-Al concentration. N-Al volume fractions of 1% and 3%
76
did not show enhancement in the average volumetric heat of combustion, however higher
volume fractions of 5%, 7%, and 10% increased the volumetric heat of combustion by
5.82%, 8.65%, and 15.31%, respectively. Aluminum oxide and heavily passivated n-Al
additives did not participate in combustion reactively, and there was no contribution from
Al2O3 to the combustion enthalpy in the tests. A combustion model that utilized Chemical
Equilibrium with Applications (CEA) was conducted as well and was shown to be in
good agreement with the experimental results.
Experiments have been conducted to investigate the combustion characteristics of
n-Al and n-Al2O3 in ethanol. To summarize, the conclusions of this study are as follows:
1) Aluminum nanoparticles may be stably suspended in ethanol fuel up to the
concentration of approximately 10% volume fraction for pure aluminum, and 5%
volume fraction for n-Al2O3. Although n-Al has demonstrated its ability as a
gelling agent, it is recommended in future work that a dispersant is incorporated
in the suspension for higher nanoparticle loadings.
2) It was experimentally shown that the amount of heat released from ethanol
combustion increases almost linearly with n-Al concentrations. Nanoaluminum
volume fractions of 1% and 3% deviated from the average volumetric heat of
combustion from that of pure ethanol by 3.78% and 0.66%, respectively. Higher
volume fractions of 5%, 7%, and 10% increased the volumetric heat of
combustion by 5.82%, 8.65%, and 15.31%, respectively. Nanoaluminum oxide or
heavily passivated n-Al does not participate reactively.
3) The oxide layer has a significant effect on reaction energetics. Scanning electron
microscope analyses and x-ray spectroscopy yielded almost identical final
77
element compositions, despite different initial compositions. Nanoaluminum
oxide displaces energetic ethanol fuel and active aluminum content, and may
function as a diffusion barrier, inhibiting phase transitions. Furthermore,
thermodynamic equilibrium modeling with CEA agreed with the reaction
energetics, predicting an 8.27% increase in adiabatic flame temperatures for Eth+
10% Al suspensions. As the size of aluminum fuel additive decreases, there is a
concern as to whether the energy content is significantly decreased. Because the
oxide thickness is relatively independent of the particle diameter, for nanoparticle
diameters of 20 nm or less, the oxide layer becomes a more prominent part of the
particle volume, accounting for approximately 60% energy loss per volume [66].
Therefore, it is expected that nanoenergetic fuel formulations release more energy
when taken as a whole, due to more complete combustion; however, there may be
a lower limit of the particle diameter on the energetic enhancement of
nanoparticles.
4) Furthermore, this may be extended to other burning parameters, such as
linear/mass burning rate and ignition delay that are influenced by the amount of
heat released. Although it is acknowledged that higher energetics may exceed the
limits set by the materials in the combustion system, increase the rate of thermal
NOx formation, and induce dissociation of products back to reactants, this study
provides valuable information on the role of the oxide layer in nanoaluminum
combustion and ability to tailor the reaction energetics.
78
Chapter Four
Ignition Characteristics of Nanoaluminum in Biofuel
Along with energy density enhancement, achieving precise control over the
reactivity of nanofluids is an opportunity for future nanoenergetic fuel applications. A
second experimental study involves the study of ignition probability of n-Al (50 nm) and
n-Al2O3 (36 nm) in ethanol and the commonly used No. 2 fuel oil (diesel). The primary
aims in this study were to study the effect of nanoenergetic additives on the ignition
probability of ethanol with a hot-plate setup, and to explore the underlying mechanisms
of ignition. Aluminum and aluminum oxide were suspended in ethanol and diesel fuels
from 0.1% to 3% volume fractions, and dropped onto a hot plate at temperatures varying
from approximately 300 ºC to 600 ºC. The experimental probability was calculated and a
logistic regression approach was used to determine the 50% ignition threshold.
Nanoaluminum in ethanol was found to significantly increase the ignition probability:
ethanol suspensions with 1%, 2%, and 3% aluminum volume fractions ignited as much as
100 ºC lower than pure ethanol, and exhibited burning regimes similar to disruptive
combustion in slurry droplets, while ethanol suspensions with n-Al2O3 volume fractions
ignited at higher temperatures than pure ethanol. In addition, diesel mixtures with n-Al
and n-Al2O3 additives demonstrated relatively the same hot plate ignition probability as
79
pure diesel. Therefore, the likelihood of nanofluid ignition was strongly correlated with
volume fraction concentration, metal additive material, and surface tension (contact
angle).
4.1 Experimental Methods
As mentioned previously, nanoenergetic additives dispersed in liquid fuels offer
numerous capabilities and advantages to liquid fuel combustion. The standard method to
determine the auto ignition temperature (AIT) of a fuel is the ASTM E659 ―Minimum
Auto Ignition Temperature of Chemical Liquid‖ standard [95]. In this ideal case, the fuel
vapor is uniformly heated in all directions, and insulated from any heat loss. In addition,
ASTM E659 is valid only for liquid and solid fuels that have no condensed phase when
ignition occurs. In accordance with the procedure described in ASTM E659, as shown in
Fig. 4.1, 100 μl of liquid fuel is dropped into a uniformly heated 500 ml glass flask
containing air that is insulated with aluminum foil. The liquid fuel evaporates, and the
temperature is then adjusted until ignition occurs. This is the ideal case in which the
lowest temperature of a fuel will ignite without an external source of ignition. However,
as shown in Fig. 4.2, hot surface or hot plate ignition occurs under less ideal conditions
due to differences in environmental heat losses and test conditions. In this case, the fuel is
only heated from primarily one direction, and hot plate ignition temperatures are
expected to be higher than autoignition temperatures.
80
Fig. 4.1: Schematic of experimental setup for the ASTM E 659 standard [95].
Fig. 4.2:
Schematic of hot surface ignition operating parameters [96].
81
Hotplate ignition, although simple in its geometry, is a complex phenomenon governed
by various factors such as surface geometry, composition, and external environmental
conditions [97]. These conditions are important in determining ignition probabilities for
hot surface ignition events. Ignition then occurs over a range of temperatures, rather than
at a set point. Depending on the application, hot surface ignition of flammable liquids can
be regarded as a risk, or desirable in the case of the combustion of a working fluid. There
is no accepted approach for ignition probability, rather, for each setup; there are several
possible methods that can be used. There are generally two methods for reporting the
results, either the experimental ignition probability for each temperature is reported, or a
curve fitted through the entire range of ignition events. For solid fuels, the Bruceton
method, or ―up and down‖ method is widely used, along with logit, probit, and Wiebull
distribution techniques [98]. In this study, a logistic regression model was used to
calculate the ignition probability, due to its convenience and its successful use with
working fluids by previous authors [99]. There are currently two previous studies of
nanoparticle additives in hot surface ignition experiments: 1) nanoaluminum additives in
diesel [8], and 2) carbon nanotube additives in ethanol [26]. In both cases, there was
determined to be a maximum 20-30% increase in ignition probability at each surface
temperature. In this respect, a single droplet burning may serve as a stepping stone for
understanding spray combustion; however, its practical use is primarily in research.
In this study, a horizontal hot plate setup was used to estimate the hot plate
ignition temperature. The experimental setup consisted of two main elements: an 18 cm
diameter, 2.5 cm thick cast iron heating plate, and a fluid delivery system as shown in
Figs. 4.3, 4.4, and 4.5. A 1500 W spiral copper heating coil was set inside the plate
82
assembly, powered by a heater control unit. Aluminum silicate supported the base of the
heater element, and fiberglass surrounded the entire assembly to minimize heat losses.
The center of the plate was set beneath the top surface to prevent droplets from escaping.
Around the outer radius of the plate, a channel caught any fuel material that was ejected
from the inner region during the experiments. Several high temperature k-type
thermocouples were used to monitor the temperature, with an internal cross-sectional
measurement, an array of surface measurements, and a surface probe closest to the
droplet surface, for use up to 1335°C.
Fig. 4.3: Schematic of the hot surface ignition experimental setup.
Fig. 4.4: Illustration of the hot surface ignition experimental setup.
83
Fig. 4.5: Wire schematic of the hot surface ignition experimental setup.
As shown in Fig. 4.6, low temperature calibration experiments calculated the average
temperature for 600 seconds between the center and four outer circular locations, in
which the total average was within 10% error.
Fig. 4.6: Low temperature distribution across the hotplate setup.
A separate assembly was used to control the fluid delivery. Ultrasonic agitation was used
84
to disperse the mixtures for at least 30 minutes. The volume and flow rate of the liquid
suspensions were controlled with a programmable syringe pump (Cole-Parmer, model
No. 780100C). To ensure that each drop was impinged on the center of the plate, a
swiveling support beam was used to drop in the same region approximately 20 mm above
the plate. The supporting beam also mounted a k-type thermocouple probe to
approximate the initial droplet temperature. A ventilation hood enclosed the entire
experimental setup to continuously remove any gaseous combustion products. Overall,
the heater size and orientation was configured for a reproducible setup, and not to be
representative of any component or device.
In the present study, commercially available aluminum nanoparticles (Skyspring,
corp.) and aluminum oxide (Nanophase, corp.) were used. Tables 4.1 and 4.2 tabulate the
fuel and material properties, respectively.
Table 4.1: Liquid fuel properties [37], all properties at atmospheric pressure.
Fuel Density,
(g/cc)
AIT,
(°C) Tb, (°C)
Flash Point,
(°C)
Volume,
(µl)
k,
(W/mK)
Ethyl Alcohol 0.789 363 78 13 24.7 0.171
Diesel 0.832 256 260-371 66 20.1 0.15
Table 4.2: Additive material properties, as specified by the manufacturer.
Particle Type True Density,
(g/cc ) Diameter, (nm) Crystal Phase
SSA,
(m2/g)
k, (W/mK)
Skyspring Al (99.9%) 2.7
40-60 Amorphous 20-48 250
Nanophase Al2O3
(99.5%) 3.1 36 70:30, δ: γ 36 30
The average liquid droplet diameter was estimated from the total volume of 100 droplets.
From a previous study [100], EDS data reported that the Al/O atomic composition for the
pure Al samples were 78.5/19.5 and 53.5/46.5 for the Al2O3 samples. Scanning electron
85
microscope (SEM) (Hitachi S-480) images of the particle size and distribution can be
seen in Fig.4.7. Stabilizing agents were not used, because this may affect the ignition
process. For instance, a decrease in droplet surface tension has been known to
significantly affect the evaporation rate [101].
Fig. 4.7: SEM image of particle size and distribution of pure Al nanoparticles (left) and
Al2O3 nanoparticles (right).
Ignition experiments were conducted by heating the surface to a starting
temperature of 300 to 400°C. The temperature of the surface was increased by 10°C
increments for approximately 10 to 15 increments, with 15 droplets of fuel dropped onto
the hot plate on each increment. The leidenfrost effect was observed in all cases, in which
a film of fuel vapor is immediately formed under the droplet, physically lifting the
droplet by a cushion of fuel vapor. For each trial, either an ignition event or a pure
evaporation event was recorded. Once ignited or evaporated, any gaseous products were
exhausted by the vent. After each experiment, a silicon carbon abrasive (CAMI Grit
designation 190) and a jet of water was used to remove any excess material. Overall, the
results of over 3500 ignition events on a reproducible setup were recorded during the
86
study. Under this method, a good quantitative indication of the ignitibility of nanofluids
under different conditions can be gathered, as shown in Table 4.3, for pure ethanol.
Table 4.3:
Experimental data recorded for the ignition experiments of pure ethanol.
Temperature, °C Events Trials Experimental Ignition Probability
400 0 15 0
410 0 15 0
420 0 15 0
430 0 15 0
440 0 15 0
450 0 15 0
460 0 15 0
470 0 15 0
480 0 15 0
490 4 15 0.267
500 9 15 0.6
510 11 14 0.786
520 15 15 1
530 15 15 1
540 15 15 1
550 15 15 1
560 15 15 1
In the present study, a logistic regression model is utilized to statistically quantify the
ignition response from surface temperature increase, as described by Hosmer and
Lemeshow [102]. For each temperature, there was a corresponding dichotomous
response: ignition or no ignition. Consequently, the ignition probability and
associated 95% confidence interval can be represented in Eqs. 4.1 and 4.2,
(4.1)
87
(4.2)
where the regression coefficients are and , Z represents the standard normal density
curve at significance, and the standard deviation of the fit. To
determine the coefficients and , an iterative maximum likelihood technique is
performed. Most statistical packages will generate the coefficient estimates along with
the associated deviations. The experimental ignition probabilities at each temperature was
in good agreement with the regression fit, for all fuel suspensions. This may be simply
regarded as a regression tool, however, a more detailed description is provided in
Appendix B. As shown in Fig. 4.8, the experimental ignition probability, regression fit,
along with regression confidence interval can be plotted.
Fig. 4.8: Ethanol ignition data events, experimental probability, regression curve and
95% confidence intervals.
88
In further calibration studies, it may be possible that repeated droplets interact and change
the hot plate surface used in the experiments, despite repeated abrasion and cleaning. As
shown in Fig. 4.9, the ignition of pure ethanol was repeatedly performed throughout the
experiments, due to its ease of handling. It was determined that from the first ethanol
experiment to the last experimental test, ethanol did not significantly deviate from its
initial value. The fifth test did show a decreased value, possibly due to Al2O3
accumulation on the surface. In general, over months of surface testing, the surface
ignition behavior did not deviate significantly.
Fig. 4.9: Repeated ethanol tests over time, solid markers (■) designate the
regression fit, while empty markers the experimental probability (□).
89
4.2 Results and Discussion
4.2.1 Experimental Results
The fuel droplets introduced onto the experimental setup displayed a wide range of
ignition behavior. As previously mentioned, the leidenfrost phenomena was observed for
all fuel mixtures, in which the droplet hovers over an insulating layer of fuel vapor. As
shown in Fig. 4.10, nanoaluminum suspended in ethanol resulted in enhanced ignition.
Fig. 4.10: Ignition probability regression curves of aluminum/ethanol suspensions
compared to pure ethanol.
As shown in Figures 4.11 and 4.12, neat ethanol was observed to start igniting at no less
than 480°C, with a stable flame enveloping the droplet until all of the fuel was consumed.
At low volume fractions of pure Al in ethanol (0.1%, 0.5%), the fuel droplet shrinks
90
axisymmetrically, and either ignites or purely evaporates, leaving agglomeration of pure
Al that ignited at higher hot plate temperatures. Ethanol suspensions with 1%, 2%, and
3% Al volume fractions ignited much lower (100 ºC) than pure ethanol, and exhibited
burning regimes similar to disruptive combustion in slurry droplets.
Fig. 4.11: Regression curve with confidence band for pure Al in ethanol.
Fig. 4.12: Limits of ignition for pure Al in ethanol.
As the droplet burns and evaporates, there is a formation of a glass-like shell from the
91
non-volatile solid left behind; once the droplet ignites there was pronounced spinning and
upward jetting of particle streaks. It has been suggested that this regime enhances local
turbulence and promotes more complete combustion [80]. Furthermore, there was
observed droplet rippling similar to buckling of colloidal suspensions in leidenfrost
boiling [103]. Figures 4.13 and 4.14 display the ignition of Al2O3 mixtures in ethanol.
Fig. 4.13: Regression curve with confidence band for Al2O3 in ethanol.
Fig. 4.14: Limits of ignition for Al2O3 in ethanol.
In all cases, Al2O3 volume fractions ignited at higher temperatures than pure ethanol,
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igniting at no less than 510°C, thus reducing the ignition probability at the same
temperatures.
The ignition behavior of diesel was also investigated in order to determine its
relative ignition performance on the experimental setup. Diesel fuel mixtures were
significantly more explosive than ethanol, with flames exploding across the surface of the
plate. In addition, diesel overall had the greatest uncertainty in ignition events. Diesel
may exhibit a very different ignition profile due to being mix of complex hydrocarbons,
whereas the ethanol used was primarily one molecule (C2H5OH). There also may be
variations in the fuel depending on the vendor. It is suggested that the lighter, more
volatile components of diesel immediately evaporate, followed by the heavier
components. Starting at temperatures as low as 300°C, there is rapid evaporation of more
volatile components up until ignition events at ~560°C. As mentioned in chapter three,
without any dispersing agent, diesel mixtures could not successfully suspend higher
volume fractions of metallic additives. Experimental results are displayed in Figs. 4.15,
4.16, 4.17 and 4.18 for pure Al and Al2O3 at volume fractions of 0.1 and 0.5%.
Fig. 4.15: Regression curve with confidence band for pure Al in diesel.
93
Fig. 4.16: Limits of ignition for pure Al in diesel.
Fig. 4.17: Regression curve with confidence band for Al2O3 in diesel.
94
Fig. 4.18: Limits of ignition for Al2O3 in diesel.
Overall, diesel mixtures with Al and Al2O3 additives demonstrated somewhat similar
surface ignition temperatures to pure diesel. In comparison to Tyagi‘s [8] experiments
with Al in diesel, the results here do not show comparable enhancement. This may
indicate that enhancement is dependent on the materials used and highly dependent on
the experimental temperature range observed. Several differences in experimental
procedure, such as the use of a syringe pump, a heated cast iron surface, and materials
used may also explain the differences in data. In comparison with ethanol suspensions,
wetting behavior may also play a role, as shown in the next section.
The results suggest that a decrease of ignition temperature may be due to several
underlying mechanisms. As previously mentioned, thermally conductive nanoscale
additives in ethanol are known to significantly enhance thermal transport properties in the
liquid mixture, leading to reduced ignition delays. Similarly, as shown in Fig. 4.12 for
pure Al nanoparticles in ethanol, an increase in ignition probability or decreased ignition
95
temperature may be due to enhanced thermodynamic properties of nanofluids.
Comparing the ignition behavior from Al and Al2O3 in ethanol (Figs. 4.12 and 4.14),
suggests that ignition characteristics may be enhanced due to the reactive nature of the
additive material. In the present study, experimental temperatures are below the melting
point commonly reported for aluminum particles; however, there may be forced (spark)
ignition due to the increased specific surface area and size-dependent melting point
depression found in nanoparticles. Previous studies [15, 16] found depressed melting
temperatures and heat of fusion for nanoscale Al, with ignition temperatures as low as
520 °C. Despite the lowest ignition event of the ethanol/Al mixture being at the
experimental temperature of 390°C, it cannot be ruled out that there was a spark ignition
event. Nonetheless, in this case, it may be possible to enhance or inhibit the ignition of
nanoenergetic liquid fuels by using different additives or by selective passivation of the
additive.
4.2.2 Effect of Surface Tension
Surface tension is also an important parameter for evaporation rate and lifetime [98], due
to determining the contact area between the hotplate and liquid, and altering the
evaporation properties of the liquid-vapor interface. Taking this into consideration, a
reduction in surface tension may facilitate the occurrence of ignition. However, there
have been limited works and lack of consistent studies on the effect of size and
concentration of nanoparticles on the surface tension of the nanofluid. In previous sessile
droplet contact angle studies, Vafaei et al [104] found that with increasing bismuth
telluride (Bi2Te3) nanoparticle concentrations, contact angles of iso-octane mixtures on
96
glass and silicon substrates were found to initially increase and then decrease after critical
concentrations. In a later investigation [105], it was numerically calculated that Bi2Te3
nanofluid suspensions containing 2.5 nm and 10.4 nm diameter in iso-octane significantly
reduced the liquid-gas interface surface energy. The authors propose that the
nanoparticles accumulate and assemble at the liquid–gas interface, where the effective
surface tension can be reduced up to 50% for 2.5 nm particles, compared to the bulk
liquid surface. Tensiometer measurements by Kim et al [106] reported no significant
change in surface tension (±3%) of Al2O3 blended in water, compared to that of pure
water. Furthermore, Sefiane and Bennacer [107] found that passivated Al nanoparticles
suspended in ethanol at 0.005 to 0.02 % volume fractions exhibited no change in surface
tension, however, there was found an enhancement in overall evaporation of ethanol by
extending the fluid film on the substrate. Therefore currently, for nanoparticles suspended
in fluids, contact angles have been confirmed to be affected while further studied on
surface tension are needed.
Therefore, contact angles were determined experimentally for ethanol and
ethanol-aluminum suspensions using a Tantec Inc. contact angle meter (Model CAM-
PLUS MICRO) and with the half-angle method at 22 °C in air. As shown in Fig. 4.19,
and compared to water in Fig. 4.20, nanoaluminum additives in ethanol have a tendency
to reduce the contact angle of the droplets. A value of 5° was assigned for complete
wetting of the substrate surface. A decreasing trend of contact angles was observed for
stainless steel, glass, copper, and acrylic resins for higher pure aluminum loadings.
97
Fig. 4.19: Contact angles of ethanol/aluminum mixtures.
Fig. 4.20: Contact angles of ethanol and water for comparison.
However, similar results were confirmed for nanoaluminum oxide, which implies that the
decrease in contact angle may be due to nanoparticle accumulation around the substrate
film edge; in this case, it may be expected to increase the contact area on a heated
surface. Furthermore, diesel fuel mixtures were completely wetted on all surfaces, for all
additive loadings. Similar wetting results for diesel droplets were observed when the
98
droplets impinged on the hot plate. As a result, based on previous studies and the
experimental contact angles of Fig. 4.19, the presence of nanoparticles suspended in these
fuels affects the hot plate contact area, and could possibly have the ability to alter the
droplet interfacial contact area or liquid–gas interface behavior.
4.2.3 Heterogeneous Nucleation
The importance of heterogeneous nucleation may play a vital role in the enhanced
ignition behavior for higher volume fractions (1%, 2%, and 3%) of ethanol and n-Al. In
this study, compared to the well documented ―microexplosion‖ phenomena [27, 80], a
mild disruptive burning phenomena was observed for Eth + Al, in which there is
shattering or fragmentation of parent droplet into smaller ones. With the vaporization of a
volatile liquid, there is the formation of a porous non-volatile shell on the exterior of the
droplet, with subsequent pressure build up and ignition of the interior liquid. A slurry fuel
droplet schematic is shown in Fig. 4.21,
Fig. 4.21: Schematic of a slurry fuel droplet, with regions A, B, and C [80].
99
Where is the accumulated shell thickness, initial droplet radius, and transient
droplet radius. If the internal droplet circulation is not strong enough, or if more volatile
fuel components are entrapped within the accumulated porous shell, this has been known
to lead to homogeneous nucleation by attaining the limit of superheat of the liquid carrier
[108, 109]. The interior region is superheated above its boiling point, then internal
bubbling, and subsequent rapid gasification of these droplets can be reached,
characterized as ―microexplosive,‖ or disruptive burning.
However, if potential nucleation sites are present, this can lead to heterogeneous
nucleation and internal boiling within the droplet. It is likely that this type of boiling
plays a role in the hot surface ignition of the present experimental studies in this chapter.
In contrast to homogeneous nucleation, as in a uniform liquid boiling, heterogeneous
nucleation sites reduce the free energy barrier to form a gas phase and require less energy
to facilitate nucleation. Thus, the energy barrier to attain heterogeneous nucleation is
smaller than homogeneous nucleation. The total energy barrier needed for homogeneous
nucleation in a uniform spherical droplet is,
(4.3)
Where is the energy barrier to nucleate, is the mass of vapor embryo, is the
Gibbs energy of vapor, is the Gibbs energy of liquid, is the volume of vapor
embryo, is the radius of the vapor embryo, is the interfacial tension. Once the
thermal equilibrium and mechanical equilibrium have been achieved, the energy barrier
will be,
100
(4.4)
For colloids, the distinguishing feature of heterogeneous nucleation is the presence of
foreign solid particles in the liquid medium. In contrast to homogeneous nucleation, the
total energy barrier needed for heterogeneous nucleation is the product of homogeneous
nucleation and a function of the wetting contact angle,
(4.5)
Where is the pressure of liquid and is the pressure of vapor, and is the contact
angle of liquid on the solid surface. Once the thermal and mechanical equilibriums have
been reached, the expression may be reduced to,
(4.6)
Depending on the wetting contact angle, the final term
can range from zero to one. If the contact angle is a
non-zero value, as in most cases, the final f is less than 1. Therefore, the energy
barrier to nucleate for a heterogeneous nucleation demands less energy, and internal
bubbling will occur around potential nucleation sites inside the droplet mixture.
It is most likely that heterogeneously induced internal boiling occurred due to the
presence of foreign solid particles, rather than homogeneous nucleation of the interior
mixture due to internal superheating. With higher loadings of particle additives, it is
likely that there are enough suitable heterogeneous nucleation sites that internal boiling
can be initiated. Consequently, internal heterogeneous nucleation is relevant to the
formation of saturated fuel vapor to drive the combustion event. Furthermore, as the
101
outer region of the droplet becomes concentrated with a less volatile, higher boiling point
porous shell, rapid internal bubbling induces the observed disruptive burning event.
Therefore, there is a critical concentration of pure aluminum additives in the fuel
facilitates the onset of heterogeneous nucleation of the liquid carrier, which increases the
ignition probability at a given temperature. However, the mechanisms have not been fully
studied and more work is needed to understand and characterize heterogeneous
nucleation in fuel suspensions.
4.2.4 Theory of Thermal Droplet Ignition
Similar to spherical metal particle combustion, finite rate chemical kinetics also need to
be considered for liquid droplet ignition. The criteria for thermal droplet ignition for fuel
droplets may be modeled by a dimensionless Damkohler or number, which is the ratio
of the characteristic flow time to the characteristic chemical reaction time, as described in
Eq. 4.7 [109, 110],
(4.7)
For a frequency factor of , specific heat of , thermal conductivity of air , ambient
pressure , droplet radius of , universal gas constant , heat of combustion per unit
mass , stoichiometric fuel to oxygen ratio , and pure fuel molecular weight and
average weight . Once a preliminary number has been defined, the system
Damkohler number ) can take two different forms, one for an upper reactive branch
( , and the other for a weakly-reacting branch ( ). As shown in Fig. 4.22, for
, a frozen state corresponds to pure droplet evaporation, while represents
102
an infinitely fast chemical reaction (equilibrium state), corresponding to the D2-law of
droplet combustion.
Fig. 4.22: Characteristic ―S-curve‖ of ignition and extinction events as a function of a
burning rate parameter [109].
Of particular interest in ignition, is the lower branch, where the burning rate slowly
increases until a critical ignition state is reached ( ). The droplet ignition criteria of Law
[110] states that a droplet can achieve ignition, if the number of the system
exceeds a critical number ( , expressed as,
(4.8)
where,
(4.9)
For a given ambient temperature , an activation temperature with
activation energy , ambient oxidizer mass fraction , effective latent heat of
103
gasification , energy needed for droplet heating per unit mass of fuel gasified
, and specific latent heat of gasification . Where,
(4.10)
is the heat transfer parameter. For small numbers of , can be accurately represented
as [110] as,
for (4.11)
Theoretically, there are two different processes that are investigated, first the there
is transient droplet vaporization and heating from the ambient environment. As the
internal heating is increased, the rate of fuel vapor generation is also increased. At an
instantaneous critical point , there is a transition from pure vaporization of the
droplet to active chemical reactions in the surrounding gas-phase, favoring increasing
pressure, temperature, and oxidizer concentration for ignition. Finally, there is an
established gas-phase reaction after which the droplet is said to be ignited. An energy
conservation on the droplet surface yields [109], for a mass gasification rate of ,
(4.12)
or equivalently as,
(4.13)
In the first combustion stage, internal heating with little gasification, the Eq. 4.12 may be
reduced to,
(4.14)
In the second stage, there is little droplet heating with significant vaporization,
(4.15)
104
The mass gasification rate in the first stage of combustion (Eq. 4.14), can be expected to
be larger due to an experimentally confirmed enhanced thermal conductivity , or
effective thermal conductivity in the nanofluid. When considering the thermal
conductivity of ethanol 0.171 (W/mK), and its corresponding fuel additives Al (250
W/mK) and Al2O3 (30 W/mK), enhanced thermal transport may play an important role in
triggering ignition event by rapidly heating the mixture. As a result, there may be
enhanced internal heating and mass transfer rate away from the droplet surface, to initiate
the second combustion stage.
4.3 Conclusions
In the present study, the ignition behavior of ethanol and diesel with nanoaluminum and
nanoaluminum oxide additives were experimentally investigated with hot plate ignition,
and several possible underlying mechanisms are explored. Depending on the
experimental conditions, liquid fuel, and nanoparticle additive, colloidal fuel suspensions
of metallic additives may undergo hot surface ignition at lower temperatures than the
bulk fuel. Therefore, this implies that hot plate ignition probability is highly coupled with
the experimental procedure. As shown in Fig. 4.9, the ignition of ethanol was repeatedly
performed throughout the experiments, and was determined to not significantly deviate
from its initial value. However, it may be possible that within testing one fuel sample,
previous droplets may affect future droplets at higher temperature ranges.
There was found a strong correlation of minimum surface ignition temperatures
with volume fraction concentration and fuel type. Theories of heterogeneous nucleation
and thermal ignition for fuel droplets were also considered. Due to several possible
105
mechanisms, it was found that the greatest ignition enhancement was with aluminum
energetic additives dispersed in ethanol; however, the data suggest that the primary
mechanisms responsible for combustion are within the heat up phase via thermal
transport enhancements within the fuel, or due to heterogeneous nucleation of the
particles present. Therefore, the ignition enhancement in ethanol may be due to a
combination of several other contributing factors: 1) the reactive nature of aluminum, 2)
the ability of ethanol to suspend additives at higher (>2%) volume fractions, 3) enhanced
thermal transport properties, and 4) changing of properties at the liquid-vapor interface.
As a result, along with energy density enhancement, achieving precise control over the
reactivity of nanofluids is an opportunity for future nanoenergetic fuel applications.
106
Chapter Five
Conclusions and Future Work
5.1 Concluding Remarks
In this study, it was experimentally determined that the combustion energetics and
ignition probability of liquid fuel ethanol can be modified with nanoparticle additives. On
the basis of these two experimental observations, along with those available in literature
[6, 26, 27], it was concluded that nanoaluminum suspended in ethanol has the ability to
tailor the reactivity and energetic content of pure ethanol and is relatively easy to
synthesize and handle. Furthermore, the oxide layer has a significant effect on reaction
energetics and aluminum nanoparticles may be stably suspended in ethanol very well.
Investigating new and currently used fuels with nanoenergetics has demonstrated to be
promising in terms of maximizing the efficiency and minimizing the environmental
impact. This study also provides basic research on the combustion of nanofluids, which is
currently an area with relatively little investigative work. Further investigations into the
ignition mechanisms of nanofluids may provide insight into their impact as a viable fuel
in the future. At the present time, there is a need to a unified fundamental understanding
of nanoenergetic additives within colloidal dispersion compositions.
107
5.2 Extensions of Research
Extensions of the current work include the following:
1) Future work could investigate heavier weight loadings of n-Al with the use of
dispersant, and identifying the most effective surfactant for long-term fuel
suspension stability. Furthermore, more advanced materials analysis of the
combustion products, such as X-ray Photoelectron Spectroscopy (XPS), can
determine the actual molecular formula and phase (i.e. - α-Al2O3 or γ-Al2O3) in
addition to the element compositions.
2) Combustion characteristics of different sizes, size distributions, and shapes of
nanomaterials can be investigated. It has been shown that for a given shape, the
surface to volume ratio increases almost linearly with decreasing size, however,
most nanoparticle materials are spherical, which is the smallest surface area
among any surface enclosing a given volume. Thus, different shapes, such as
flakes, that are available may exhibit vastly different behavior. As a result, further
experimental studies on more complex nanostructured fuels, such as nanotubes or
nanorods that take advantage of self-assembly properties of nanoparticles can be
studied.
3) The ignition behavior of powders and fuel materials can also be investigated by
heated wire filaments. Wires can be coated with metallic particles and optically
monitored to determine the ignition temperature of the metal. Previous studies by
Shoshin et. al. [2, 111] determined the ignition temperature of mechanically
alloyed Al-Ti and Al-Mg powders by optically monitoring a heated nichrome
wire with powder coatings. A simple car battery, or multiple connected in series,
108
can provide the DC current through the filament, and a resistor network or
autotransformer can vary the heating rate. Uncoated portions of the wire are then
monitored by an infrared pyrometer to determine the temperature history.
However, the finite thickness of the powder on the wire may introduce error.
Preliminary experiments of the technique in the laboratory have shown that it is
possible to use nickel- chromium fuse wire, a 2901 ignition unit, and a variac
control power supply through the wire. There is interest in experimentally
determining the ignition temperature of nanoparticles, or the ignition temperature
of a fuel formulation, such as a nanofluid.
4) In constant volume experiments, it is possible to determine the pressure history of
the combustion event. The maximum rate of pressure rise is generally
proportional to the flame speed and serves as an indicator of the burn rate [77]. By
fitting a pressure transducer on to a combustion (calorimeter) vessel, it is possible
to estimate the burning rate of fuel samples.
5) Regarding thermochemistry calculations, other CEA combustion modules can be
used, such as Chapman-Jouguet detonations or ―rocket‖ problems in order to
determine theoretical rocket parameters, such as specific impulse. Typical
conditions for a combustion chamber could be 1000 psia and a nozzle expansion
ratio of 40.
6) Other proposed future work may entail flow visualization, a high-speed camera or
video system can visualize droplet lifetime and ignition events, in comparison
with micron-sized aluminum samples, or other metals. In addition, a combustion
109
finite difference model or the incorporation of a micron/nano particle combustion
model into commercial simulation software could be attempted.
110
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Appendix A
Sample CEA Output File for Ethanol in Air
The following sample output file was generated by NASA‘s CEA2 chemical equilibrium
package. A separate program, CEAgui, provides a graphical user interface and prepares
the output file for viewing.
125
126
127
128
129
Appendix B
Logistic Regression
A logistic regression model was utilized to statistically quantify the ignition response
from a surface temperature increase. The dichotomous (binary) variable y, with values of
1 and 0 corresponding to a success response or a fail response, is measured at each
temperature. In simple linear regression, the method of least squares is the standard
approach to approximate the best-fit curve, where the best-fit line y is
that which minimizes the sum of squared deviations, with regression coefficients , ,
and the random error. In this case, the best-fit line may take the values of -∞ to ∞.
However, for binary data, there are some difficulties in using linear and multiple
(polynomial) regression techniques [112]:
For binary data, there is a constraint on the response range; hence, the probability
may only take the values between 0 to 1.
There is a nonlinear probabilistic relationship between y and x.
There is a non-constant variance ( ) in the response (heteroscedasticity); one of
the underlying assumptions of least square techniques are constant variance across
all observations.
130
Finally, there are non-normal error terms; normal error terms are also an
assumption of least squares fits.
Therefore, with binary data sets, there is a need for more suitable regression techniques
such as weighted least squares or nonlinear least squares. Logistic regression is just one
of the techniques to fit binary data. It is useful to use link functions to transform
variables, so that the relationship between the new variables is linear. In this case, a
logistic regression approach was used where the link function is the log of the odds ratio.
The odds ratio is defined as the probability of an event over the probability of
failure, and in logistic regression literature, the probability of a dichotomous outcome is
generally referred to as ,
(B.1)
The probability in nonlinear with respect to y, however, taking the log of the odds
ratio, it is possible to define a new function to achieve linearity.
g (B.2)
Once the regression coefficients are determined, and once the odds ratio is ―log
transformed,‖ the functional relationship is linear, as shown in Fig. B.1,
131
Fig. B.1: Experimental ignition data of pure ethanol (linear model).
With algebraic manipulation it is now possible to calculate the probability , defined
as,
(B.3)
Where represents the conditional probability of , given x, or the
probability that there is an ignition event, at a designated temperature. In this case, the
ignition response is constrained between the values of 0 or 1; therefore the regression
curve is restricted between 0 and 1. To determine the coefficients and , an iterative
maximum likelihood technique is performed. Most statistical packages such as
MINITAB or JMP generate the coefficient estimates along with other useful inferences;
the coefficients and were determined from MINITAB, and the
maximum likelihood procedure was performed in Excel to verify the constants. Finally,
the experimental data, regression curve, and confidence interval can then be plotted as
shown in Fig 4.8.
132
To determine the confidence intervals, a variance summation law must be used
for the variance of a sum [112]. In this case, the two variables are interdependent and the
following variance operator for the function g is used,
(B.4)
Where denotes the covariance of the function g calculated in the maximum
likelihood technique, or reported from a statistical package. To determine the standard
deviation, the square root of the variance is calculated,
(B.5)
Therefore, the upper and lower confidence intervals of the function are,
where Z represents the standard normal density curve. Finally, the confidence intervals
can then be incorporated into the logit model , to calculate the confidence intervals
of the entire logistic curve, as,
(B.6)
or as,
(B.7)