Solving linear objective optimization problem subjected to novel max-min fuzzy relational equalities as a generalization of the vertex cover problem

Abstract

This paper considers the linear objective function optimization with respect to a novel system of fuzzy relation equations, where the fuzzy compositions are defined by the minimum t-norm. It is proved that the feasible solution set is formed as a union of the finite number of closed convex cells. Some necessary and sufficient conditions are presented to conceptualize the feasibility of the problem. Moreover, seven rules are introduced with the aim of simplifying the original problem, and then an algorithm is accordingly presented to find a global optimum. It is shown that the original problem in a special case is reduced to the well-known minimum vertex cover problem. Finally, an example is described to illustrate the proposed algorithm.