726 Modern Methods of Optimization
Constraint0x (in.)1mObjective functionDesign (decision)Figure 13.8 Concept of fuzzy decision. [13.22], with permission of ASME.subject togj(X)∈Gj, j= 1 , 2 ,... , m (13.55)whereGjdenotes the fuzzy interval to which the functiongj( should belong. ThusX)
the fuzzy feasible region,S, which denotes the intersection of allGj, is defined by the
membership functionμS( X)= min
j = 1 , 2 ,...,m{μGj[gj(X)]} (13.56)Since a design vectorXis considered feasible whenμS( X)> 0 , the optimum design is
characterized by the maximum value of the intersection of the objective function and
the feasible domain:μD(X∗) =maxμD( X), X∈D (13.57)whereμD( X)=min{
μf( X), min
j = 1 , 2 ,...,mμGj[gj(X)]}
(13.58)
13.6.3 Computational Procedure
The solution of a fuzzy optimization problem can be determined once the membership
functions offandgjare known. In practical situations, the constructions of the mem-
bership functions is accomplished with the cooperation and assistance of experienced
engineers in specific cases. In the absence of other information, linear membership
functions are commonly used, based on the expected variations of the objective and
constraint functions. Once the membership functions are known, the problem can be
posed as a crisp optimization problem asFindXandλwhich maximizeλ