On the distribution of α p modulo one over Piatetski-Shapiro primes

Abstract

Let [\, ·\,] be the floor function and \|x\| denotes the distance from x to the nearest integer. In this paper we show that whenever α is irrational and β is real then for any fixed 1<c<12/11 there exist infinitely many prime numbers p satisfying the inequality equation* \|α p+β\| p11c-1226c6p equation* and such that p=[nc].