On a problem concerning integer distance graphs
Abstract
For D being a subset of positive integers, the integer distance graph is the graph G(D), whose vertex set is the set of integers, and edge set is the set of all pairs uv with |u-v| ∈ D. It is known that (G(D)) ≤ |D|+1. This article studies the problem (which is motivated by a conjecture of Zhu): "Is it true that (G(D)) = |D|+1 implies ω(G(D)) ≥ |D|+1, where ω(H) is the clique number of H?". We give a negative answer to this question, by showing an infinite class of integer distance graphs with (G(D))=|D|+1 but ω(G(D))=|D|-1.
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