Common best proximity point theorems under proximal F-weak dominance in complete metric spaces

Abstract

Suppose that S1 and S2 are nonempty subsets of a complete metric space (M,d) and φ,:S1 S2 are mappings. The aim of this work is to investigate some conditions on φ and such that the two functions, one that assigns to each x∈ S1 exactly d(x,φ x) and the other that assigns to each x∈ S1 exactly d(x, x), attain the global minimum value at the same point in S1. We have introduced the notion of proximally F-weakly dominated pair of mappings and proved two theorems that guarantee the existence of such a point. Our work is an improvement of earlier work in this direction. We have also provided examples in which our results are applicable, but the earlier results are not applicable.