Minimizing GCD sums and applications to non-vanishing of theta functions and to Burgess' inequality

Abstract

In recent years the question of maximizing GCD sums regained interest due to its firm link with large values of L-functions. In the present paper we initiate the study of minimizing for positive weights~w of normalized L1- norm the sum Σm1 , m2 ≤slant N w(m1)w(m2)(m1,m2)m1m2 . We consider as well the intertwined question of minimizing a weighted version of the usual multiplicative energy. We give three applications of our results. Firstly we obtain a logarithmic refinement of Burgess' bound on character sums ΣM<n≤slant M+N(n) improving previous results of Kerr, Shparlinski and Yau. Secondly let us denote by θ (x,) the theta series associated to a Dirichlet character modulo p. Constructing a suitable mollifier, we improve a result of Louboutin and the second author and show that, for any x>0, there exists at least p/( p) δ+o(1) (with δ=1-1+2 2 2 ≈ 0.08607) even characters such that θ(x,) ≠ 0. Lastly we obtain lower bounds on small moments of character sums.