On the distribution of modular inverses from short intervals

Abstract

For a prime number p and integer x with (x,p)=1 let x denote the multiplicative inverse of x modulo p. In the present paper we are interested in the problem of distribution modulo p of the sequence x, x =1, …, N, and in lower bound estimates for the corresponding exponential sums. As representative examples, we state the following two consequences of the main results. For any fixed A > 1 and for any sufficiently large integer N there exists a prime number p with ( p)A N such that (a,p)=1|Σx N ep(ax)| N. For any fixed positive γ< 1 there exists a positive constant c such that the following holds: for any sufficiently large integer N there is a prime number p > N such that N > (c( p p)γ/(1+γ)) and (a,p)=1 |Σx N ep(a x)| N1-γ.