Irrational numbers associated to sequences without geometric progressions

Abstract

Let s and k be integers with s ≥ 2 and k ≥ 2. Let gk(s)(n) denote the cardinality of the largest subset of the set 1,2,..., n that contains no geometric progression of length k whose common ratio is a power of s. Let rk() denote the cardinality of the largest subset of the set 0,1,2,…, -1\ that contains no arithmetric progression of length k. The limit \[ n→ ∞ gk(s)(n)n = (s-1) Σm=1∞ (1s ) (rk-1(m)) \] exists and converges to an irrational number.