Dedekind sums and mean square value of L(1,) over subgroups

Abstract

An explicit formula for the quadratic mean value at s=1 of the Dirichlet L-functions associated with the odd Dirichlet characters modulo f>2 is known. Here we present a situation where we could prove an explicit formula for the quadratic mean value at s=1 of the Dirichlet L-functions associated with the odd Dirichlet characters modulo not necessarily prime moduli f>2 that are trivial on a subgroup H of the multiplicative group ( Z/f Z)*. This explicit formula involves summation S(H,f) of Dedekind sums s(h,f) over the h∈ H. A result on some cancelation of the denominators of the s(h,f)'s when computing S(H,f) is known. Here, we prove that for some explicit families of f's and H's this known result on cancelation of denominators is the best result one can expect. Finally, we surprisingly prove that for p a prime, m≥ 2 and 1≤ n≤ m/2, the values of the Dedekind sums s(h,pm) do not depend on h as h runs over the elements of order pn of the multiplicative cyclic group ( Z/pm Z)*.