On a basis for Euler-Zagier double zeta functions with non-positive components

Abstract

For a non-negative integer N, let ZN:=ΣNc = 0 Q · ζ(-c,s+c), where the right-hand side is the vector space spanned by the Euler-Zagier double zeta functions over Q. In this paper, we show that ZN =Nc = 0 : even Q · ζ(-c,s+c), where is the direct sum of vector spaces. Moreover, we give a family of relations that exhaust all Q-linear relations on ZN.