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NO HEXAGONS. THE CENTRAL PLACE THEORY ILLUSION REVEALED
Matteo CAGLIONI UMR ESPACE, University of Nice Sophia Antipolis
Giovanni RABINO DAStU, Polytechnic of Milan
European Colloquium of Theoretical & Quantitative Geography September 5-9th 2013, Dourdan, France
INTRODUCTION
• The Central Place Theory (or presumed theory), together with the power law and the spatial interaction, is considered as one of the fundamental laws of geography.
“ Christaller’s system is too rigid to have any chance of representing reality, but…
the theory is an outstanding creation, offering great insights about capability of economic factors to shape spatial systems,
without ever simulating them in any detailed respect ”
A. Wilson
INTRODUCTION
• Underneath this Wilson’s consideration there are 2 tacit assumptions:
1. Spatial Structures of city systems are substantially ordered.
2. Classical economic theories are able to explain this order.
INTRODUCTION
In this work we want to show that those assumptions should be rejected:
• On the theoretical side CPT is not compatible with the power law
Critics from Science of Complexity and Neuroeconomics
• On the operational side Empirical spatial structures show no order in hierarchy and distances
Power law is well suited to show a phenomenon called pareidolia
POWER LAW with negative exponent
Power Law
80 / 20 ruleLorenz
Pareto’sdistribution
Lotka’s law
Noise 1 / fRank-size
rule
Zipf’s law
Fractal law
POWER LAW in geography
• Auerbach (1913): Pr = C r -1
• Zipf (1941): Pr = C r -β
• Pareto (1896): F(P) = rP = C P -1/β
• Power Law: f(P) = C P -(1+1/β)
For β = 1 all of them are the same.
Integral of a power law is still a power law.
POWER LAW in geography
0
0,01
0,02
0,03
0,04
0,05
0,06
0,07
200 1.400 2.600 3.800 5.000 6.200 7.400 8.600 9.800 11.000 12.200
popolazione
freq
uen
za
Popolazione 2001 PowerLaw LogNormale
Population sample (Italy 2001) follows a Log-Normal distribution with power law tail
BECKMANN’S MODEL
• Several authors referred to models of Beckmann (1958), Beckmann-McPherson (1970) and Parr (1969) in order to explain relation between city hierarchy and Zipf’s law (empirically verified).
• Can Beckmann’s model validate the Central Place Theory?
y = 3E+06x-1,062
R2 = 0,9882
1.000
10.000
100.000
1.000.000
10.000.000
1 10 100 1.000 10.000
rango
po
po
lazio
ne
BECKMANN’S MODEL
• We cannot observe mean values of city size (neither classes)
• It is rare to find two cities with the same size
• Christaller and Zipf are antithetic (degeneration)
It seems we have aperfect correspondencebetween a rank-size ruleand Christaller’s model
but…
rank
po
pu
lati
on
SPATIAL HIERARCHY
• Geographers are fascinated by spatial hierarchy.
• Christaller (1933), Lösch (1940), Isard (1956), Skinner (1964) reported spatial hierarchies formed by systems of cities.
• Reality = deformation of theoretical model.
• Is a spatial hierarchy just an illusion ?
It is possible to find Christaller’s spatial hierarchy in a random configuration (Okabe & Sadahiro, 1994).
DISTANCE ANALYSIS
• SHP files from ISTAT, INSEE, EUROSTAT
• For each municipality we considered its barycentre
• Point Pattern Analysis – Nearest Neighbour Distance
DISTANCE ANALYSIS
DISTANCE ANALYSIS
8.101 Italian Municipalities in 2001 – Real and Simulated
DISTANCE ANALYSIS
36.565 French Municipalities in 1999 – Real and Simulated
DISTANCE ANALYSIS
23.011 French Agglomerations in 1999 – Real and Simulated
DISTANCE ANALYSIS
0,00
0,05
0,10
0,15
0,20
0,25
0 10 20 30 40 50 60 70 80 90 100 110
distanza [km]
fre
qu
en
za
P-P MP-MP M-M MG-MG G-G
P-P sim MP-MP sim M-M sim MG-MG sim G-G sim
P-P Chr MP-MP Chr M-M Chr MG-MG Chr G-G Chr
PAREIDOLIA
• The natural and instinctive tendency of men in willing to recognise ordered patterns, also where they does not exist, and finding familiar forms in vague or random stimulus (e.g. images, sounds, …) is called pareidolia*.
* It looks like, but it is not.
PAREIDOLIA in geography
• Continuous search of ordered patterns in the settlements location, for us, it is a typical case of pareidolia: we can find a order just because we believe in its existence, also if it does not exist at all.
• An example in the classical location theory is Christaller’smodel of the central places, which organise cities in an extremely ordered way on the territory.
PAREIDOLIA in geography
Constant distribution of population
PAREIDOLIA in geography
Linear distribution of population
PAREIDOLIA in geography
Power Law distribution of population
PAREIDOLIA in geography
Power Law distribution of population
PAREIDOLIA in geography
Thiessen’s polygons with 10 and 7 main cities.
PAREIDOLIA
• “Our brains misperceive evenness as random,
and wrongly assume that groupings are deliberate.”
Charlie Eppes
NUMB3RS 3x05
A.
C.
B.
CONCLUSIONS
• Spatial structures are not random… they are pseudo-random.
• Christaller’s and CPT’s contribution has been really important in development of a geographical theoretic and quantitative thought.
• Nowadays we need to recognise its erroneousness and teach to young people how to recognise spatial structure taking into account the spatial complexity and the new economical theories.
THANKS FOR YOUR ATTENTION!
Matteo CAGLIONI [email protected]
Giovanni RABINO [email protected]
European Colloquium of Theoretical & Quantitative Geography September 5-9th 2013, Dourdan, France
POWER LAW DISTRIBUTION
• A continuous stochastic variable X is distributed like a power law with negative exponent, if it presents this probability density function:
fX(x) = C x - a
• Frequency of an event x is inversely proportional to his dimension.
CENTRAL PLACE THEORY
• Marketing principle
• Transport/Traffic principle
• Administrative principle
CENTRAL PLACE THEORY
Località Popolazione Numero Descrizione
R Reichshauptstadt 4.000.000 1 località internazionali
RT Reichsteil 1.000.000 2 località parte dello stato
L Landeszentrale 500.000 6 capoluoghi di regione
P Provinzialhauptorte 100.000 18 capoluoghi di province più ampie
G Gaubezirk 30.000 54 capoluoghi di provincia
B Bezirkshauptorte 10.000 162 capoluoghi di distretti
K Kreisstädtchen 4.000 486 capoluoghi
A Amtsstädtchen 2.000 1.458 città amministrative
M Marktorte 1.200 4.374 borgo-mercato
H Hilfszentrale Orte 800 13.122 località centrali ausiliarie
• The number of cities of each class is an arithmetic progression
• Centrality / Importance expressed in term of population