Abstract
A simple connected graph G is said to be interval distance monotone if the interval I ( u , v ) between any pair of vertices u and v in G induces a distance monotone graph. Aı¨der and Aouchiche [Distance monotonicity and a new characterization of hypercubes, Discrete Math. 245 (2002) 55–62] proposed the following conjecture: a graph G is interval distance monotone if and only if each of its intervals is either isomorphic to a path or to a cycle or to a hypercube. In this paper we verify the conjecture.
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