Linear equations with two variables in Piatetski-Shapiro sequences

Abstract

For every non-integral α>1, the sequence of the integer parts of nα (n=1,2,…) is called the Piatetski-Shapiro sequence with exponent α, and let PS(α) denote the set of all those terms. For all X⊂eq N, we say that an equation y=ax+b is solvable in X if the equation has infinitely many solutions of distinct pairs (x,y)∈ X2. Let a,b∈ R with a≠ 1 and 0≤ b<a, and suppose that the equation y=ax+b is solvable in N. We show that for all 1<α<2 the equation y=ax+b is solvable in PS(α). Further, we investigate the set of α ∈ (s,t) so that the equation y=ax+b is solvable in PS(α) where 2< s <t. Finally, we show that the Hausdorff dimension of the set is coincident with 2/s.