Linear Diophantine equations in Piatetski-Shapiro sequences

Abstract

A Piatetski-Shapiro sequence with exponent α is a sequence of integer parts of nα (n = 1,2,…) with a non-integral α > 0. We let PS(α) denote the set of those terms. In this article, we study the set of α so that the equation ax + by = cz has infinitely many pairwise distinct solutions (x,y,z) ∈ PS(α)3, and give a lower bound for its Hausdorff dimension. As a corollary, we find uncountably many α > 2 such that PS(α) contains infinitely many arithmetic progressions of length 3.