High moments of the Estermann function

Abstract

For a/q∈Q the Estermann function is defined as D(s,a/q):=Σn≥1d(n)n-se(n aq) if (s)>1 and by meromorphic continuation otherwise. For q prime, we compute the moments of D(s,a/q) at the central point s=1/2, when averaging over 1≤ a<q. As a consequence we deduce the asymptotic for the iterated moment of Dirichlet L-functions Σ_1,…,k q|L(12,1)|2·s |L(12,k)|2|L(12,1·s k)|2, obtaining a power saving error term. Also, we compute the moments of certain functions defined in terms of continued fractions. For example, writing f(a/q):=Σj=0r (1)jbj where [0;b0,…,br] is the continued fraction expansion of a/q we prove that for k≥2 and q primes one has Σa=1q-1f(a/q)k2 ζ(k)2ζ(2k) qk as q∞.