Solving fuzzy relation equations with a linear objective function

This paper studies the optimization model of a linear objective function subject to a system of fuzzy relation inequalities (FRI) with the max-Einstein composition operator. If its feasible domain is non-empty, then we show that its feasible solution set is completely determined by a maximum solutio

The Multi-objective transportation problem refers to a special class of vector-minimum linear programming problems in which the constraints are of equality type and all the objectives are non-commensurable and conflict with each other. All the methods either generate a set of non-dominated solutions

An optimization model with a nonlinear objective function subject to a system of fuzzy relation equations is presented. Since the solution set of the fuzzy relation equations is in general a non-convex set, when it is not empty, conventional nonlinear programming methods are not ideal for solving su