Functional equations for zeta functions of F1-schemes

Abstract

For a scheme X whose Fq-rational points are counted by a polynomial N(q)=Σ aiqi, the F1-zeta function is defined as ζ(s)=Π(s-i)-ai. Define =N(1). In this paper we show that if X is a smooth projective scheme, then its F1-zeta function satisfies the functional equation ζ(n-s) = (-1) ζ(s). We further show that the F1-zeta function ζ(s) of a split reductive group scheme G of rank r with N positive roots satisfies the functional equation ζ(r+N-s) = (-1) ( ζ(s) )(-1)r.