Bernoulli--Dedekind Sums

Abstract

Let p1,p2,…,pn, a1,a2,…,an ∈ , x1,x2,…,xn ∈ , and denote the kth periodized Bernoulli polynomial by k(x). We study expressions of the form \[ Σh ak \ Πi=1\\ i=kn \ pi(ai h+xkak-xi). \] These Bernoulli--Dedekind sums generalize and unify various arithmetic sums introduced by Dedekind, Apostol, Carlitz, Rademacher, Sczech, Hall--Wilson--Zagier, and others. Generalized Dedekind sums appear in various areas such as analytic and algebraic number theory, topology, algebraic and combinatorial geometry, and algorithmic complexity. We exhibit a reciprocity theorem for the Bernoulli--Dedekind sums, which gives a unifying picture through a simple combinatorial proof.