On a Zeta-Barnes type function associated to graded modules

Abstract

Let K be a field and let S=n≥ 0 Sn be a positively graded K-algebra. Given M=n≥ 0 Mn, a finitely generated graded S-module, and w>0, we introduce the function ζM(z,w):= Σn=0∞H(M,n)(n+w)z, where H(M,n):=K Mn, n≥ 0, is the Hilbert function of M, and we study the relations between the algebraic properties of M and the analytic properties of ζM(z,w). In particular, in the standard graded case, we prove that the multiplicity of M, e(M)=(m-1)!w 0Resz=mζM(z,w).