Kloosterman sums with twice-differentiable functions

Abstract

We bound Kloosterman-like sums of the shape \[ Σn=1N (2π i (x f(n)+ y f(n)-1)/p), \] with integers parts of a real-valued, twice-differentiable function f is satisfying a certain limit condition on f'', and f(n)-1 is meaning inversion modulo~p. As an immediate application, we obtain results concerning the distribution of modular inverses inverses f(n)-1 p. The results apply, in particular, to Piatetski-Shapiro sequences tc with c∈(1,43). The proof is an adaptation of an argument used by Banks and the first named author in a series of papers from 2006 to 2009.