On the distribution of very short character sums

Abstract

We establish a central limit theorem of (1/hp)ΣX< n ≤ X+hp(np) for almost all the primes p, with X uniformly random in [g(p)], g(p) an arbitrary divergent function growing slower than any power of p, provided ( hp)/( g(p))→ 0, \, hp → ∞ as p → ∞. This improves the recent results of Basak, Nath and Zaharescu, who established this for g(p) = ( p)A, A>1. We also use the best currently available tools to expand the original central limit theorem of Davenport and Erdos for all the primes to a shorter interval of starting points. In this paper we exploit a Selberg's sieve argument, recently used by Harper, an intersection result due to Evertse and Silverman and some consequences of the Weil bound on general character sums.

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