Geometric Progression-Free Sequences with Small Gaps II

Abstract

When k is a constant at least 3, a sequence S of positive integers is called k-GP-free if it contains no nontrivial k-term geometric progressions. Beiglb\"ok, Bergelson, Hindman and Strauss first studied the existence of a k-GP-free sequence with bounded gaps. In a previous paper the author gave a partial answer to this question by constructing a 6-GP-free sequence S with gaps of size O((6 n/ n)). We generalize this problem to allow the gap function k to grow to infinity, and ask: for which pairs of functions (h,k) do there exist k-GP-free sequences with gaps of size O(h)? We show that whenever (k(n)-3) h(n) h(n)42· n and h,k satisfy mild growth conditions, such a sequence exists.