Modular hyperbolas and Beatty sequences

Abstract

Bounds for \m,m\ subject to m,m ∈ Z[1,p), p prime, z indivisible by p, mm z p and m belonging to some fixed Beatty sequence \ nα+β : n∈N \ are obtained, assuming certain conditions on α. The proof uses a method due to Banks and Shparlinski. As an intermediate step, bounds for the discrete periodic autocorrelation of the finite sequence 0,\, ep(y1), ep(y2), …, ep(y(p-1)) on average are obtained, where ep(t) = (2π i t/p) and mm 1 p. The latter is accomplished by adapting a method due to Kloosterman.