Uniqueness of best proximity pairs and rigidity of semimetric spaces

Abstract

For arbitrary semimetric space (X, d) and disjoint proximinal subsets A, B of X we define the proximinal graph as a bipartite graph with parts A and B whose edges \a, b\ satisfy the equality d(a, b) = dist(A, B). We characterize the semimetric spaces whose proximinal graphs have at most one edge and the semimetric spaces whose proximinal graphs have the vertices with degree at most 1 only. This allows us to describe the necessary and sufficient conditions for uniqueness of the best proximity pairs and best approximations.