On the distribution of α p2 modulo one in the intersection of two Piatetski--Shapiro sets
Abstract
Let t denote the integer part of t∈R and \|x\| the distance from x to the nearest integer. Suppose that 1/2<γ2<γ1<1 are two fixed constants. In this paper, it is proved that, whenever α is an irrational number and β is any real number, there exist infinitely many prime numbers p in the intersection of two Piatetski--Shapiro sets, i.e., p= n11/γ1= n21/γ2, such that equation* \|α p2+β\|<p-14(γ1+γ2)-2743+, equation* provided that 27/14<γ1+γ2<2. This result constitutes an generalization upon the previous result of Dimitrov [4].
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