Post on 03-Jan-2016
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Fuzzy Applications Fuzzy Applications In In
Finance and InvestmentFinance and Investment
1390
March
School of Economic Sciences
In the Name of God
Dr. K.PakizehDr. K.Pakizehk.Dehghan Manshadik.Dehghan ManshadiE.JafarzadeE.Jafarzade
Forecasting Demand Using Fuzzy Forecasting Demand Using Fuzzy AveragingAveraging
1
Forecasting Demand Using Fuzzy Averaging
Experts estimates for annual demand for a new product.
Five experts are asked to forecast the annual demand for a new product using Fuzzy Delphi technique which requires use of triangular numbers
Ai = (a(i) 1 ; a(i) M; a(i) 2 ); i = 1; …..; 5. Here a(i) 1 is the smallest number of units to be produced, a(i) M is the most likely number of units, and a(i) 2 is the largest
number of units. The experts opinions are shown on Table bellow:
Forecasting Dem
and Using Fuzzy A
veraging
The Defuzzied Average
Forecasting Dem
and Using Fuzzy A
veraging
2Fuzzy Zero-Based BudgetingFuzzy Zero-Based Budgeting
The fuzzy zero-based budgeting method uses triangular numbers to model fuzziness in budgeting. it is more realistic to use fuzzy data instead of crisp data.
Consider a company with several decision centers, say A;B; and C. Assume that the decision makers agree on some preliminary budgets using a specified
number of budget levels for each center depending on its importance. The budgets are expressed in terms of triangular fuzzy numbers obtained by certain
procedure .
The following possible budget levels were suggested:
for the centerA;A0 < A1 < A2;for the centerB;B0 < B1;for the centerC;C0 < C1 < C2:
Fuzzy Zero-Based Budgeting
normal
minimal
improved
Fuzzy Zero-Based B
udgeting
The total budget available to the company is limited but it is flexible and could be expressed by a right trapezoidal number L of the type shown in Fig. bellow with membership function:
Total available budget.
Fuzzy Zero-Based B
udgeting
The decision makers follow a step by step budget allocation procedure according to the
importance of each center in their opinion.
where
Fuzzy Zero-Based B
udgeting
ExampleThe limited available budget L given by
and
Fuzzy Zero-Based B
udgeting
Cumulative budgets.
NOTE: The budget of center B is at level 0 (smaller than normal ); the decision makers may consider the option to close this center and redistribute the
money to the other two centers which are more important.
Fuzzy Zero-Based B
udgeting
3Fuzzy ValuationFuzzy Valuation
Fuzzy Valuation
Valuation is One of the most important aspect of Investment and Finance Problems. Although there are many methods in valuation, but most of them are
based on calculation of present value of cash flows.In most cases its assumed that the discount rate is fixed and deterministic. But we know that such assumption can rarely be true. So one of the applicable method in
order to consider a probabilistic discount rate is Fuzzy procedure.
Here this procedure is introduced with an example.
Fi = cash flow in period IR= discount ratePV=ordinary present value (its with uncertainty)
Fuzzy Valuation
Now we assume a fuzzy discount rate and rewrite the PV formula as bellow:
Discount rate in period i (triangular fuzzy number)
Example
Fuzzy Valuation
Fuzzy Valuation
4Portfolio Selection Based on the Fuzzy Decision TheoryPortfolio Selection Based on the Fuzzy Decision Theory
Portfolio Selection Based on the Fuzzy Decision Theory
with the membership function:
Furthermore, the optimal decision is defined by the following non-fuzzy subset
Portfolio Selection
Based
on th
e Fuzzy D
ecision T
heory
An investor can construct a portfolio based on m potential market scenarios from an investment universe of n assets with and xmax i being the minimum and
the maximum weight of the ith asset, respectively. Let Rik denote the return of the ith asset for the kth market scenario and let Rk(x) = n i=1
Rikxi denote the portfolio return for the kth scenario, at the end of the investment period. For each scenario, the investor may have a target range for
the expected return, over the investment period. Denoting Rmin k and Rmax k as the minimum and the maximum expected returns, respectively, for the kth
market scenario, and characterizing the degree of the investor’s satisfaction with portfolio x for the kth scenario as the following linear membership function:
Portfolio Selection
Based
on th
e Fuzzy D
ecision T
heory
portfolio selection model can be written as follow:
Portfolio Selection
Based
on th
e Fuzzy D
ecision T
heory
References:
[1] Yong Fang and et.al;Fuzzy portfolio optimization;theory and methods;
[2] George Bojadziev and Maria Bojadziev;Fuzzy Logic for Business,Finance, and Management;
[3] Ludmila Dymowa;Soft computing in Economics and Finance;
[4]Kaufman, Arnold &Madan M.Gupta,1991,Fuzzy mathematical models in engineering and management science,Elsevier Science Publications.
References
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