Proximinal sets and connectedness in graphs

Abstract

Let G be a graph with a vertex set V. The graph G is path-proximinal if there are a semimetric d V × V [0, ∞[ and disjoint proximinal subsets of the semimetric space (V, d) such that V = A B, and vertices u, v ∈ V are adjacent iff \[ d(u, v) ≤slant ∈f \d(x, y) x ∈ A, y ∈ B\, \] and, for every p ∈ V, there is a path connecting A and B in G, and passing through p. It is shown that a graph is path-proximinal if and only if all its vertices are not isolated. It is also shown that a graph is simultaneously proximinal and path-proximinal for an ultrametric if and only if the degree of every its vertex is equal to 1.