Two Erdos problems on lacunary sequences: Chromatic number and Diophantine approximation

Abstract

Let nk be an increasing lacunary sequence, i.e., nk+1/nk>1+r for some r>0. In 1987, P. Erdos asked for the chromatic number of a graph G on the integers, where two integers a,b are connected by an edge iff their difference |a-b| is in the sequence nk. Y. Katznelson found a connection to a Diophantine approximation problem (also due to Erdos): the existence of x in (0,1) such that all the multiples nj x are at least distance δ(x)>0 from the set of integers. Katznelson bounded the chromatic number of G by Cr-2| r|. We apply the Lov\'asz local lemma to establish that δ(x)>cr| r|-1 for some x, which implies that the chromatic number of G is at most Cr-1 | r|. This is sharp up to the logarithmic factor.