Special values of Dirichlet series and zeta integrals

Abstract

For f and g polynomials in p variables, we relate the special value at a non-positive integer s=-N, obtained by analytic continuation of the Dirichlet series ζ(s;f,g)=Σk1=0∞ ... Σkp=0∞ g(k1,...,kp)f(k1,...,kp)-s\ \,((s)0), to special values of zeta integrals Z(s;f,g)=∫x∈[0,∞)p g(x)f(x)-s\,dx \, \ ((s)0). We prove a simple relation between ζ(-N;f,g) and Z(-N;fa,ga), where for a∈ p,\ fa(x) is the shifted polynomial fa(x)=f(a+x). By direct calculation we prove the product rule for zeta integrals at s=0, degree(fh)· Z(0;fh,g)=degree(f)· Z(0;f,g)+degree(h)· Z(0;h,g), and deduce the corresponding rule for Dirichlet series at s=0, degree(fh)·ζ(0;fh,g)=degree(f) ·ζ(0;f,g)+degree(h)·ζ(0;h,g). This last formula generalizes work of Shintani and Chen-Eie.