On the Mixed Tate property and the motivic class of the classifying stack of a finite group

Abstract

Let G be a finite group, and let \BCG\ the class of its classifying stack BCG in Ekedahl's Grothendieck ring of algebraic C-stacks K0(StacksC). We show that if BCG has the mixed Tate property, the invariants Hi(\BCG\) defined by T. Ekedahl are zero for all i≠ 0. We also extend Ekedahl's construction of these invariants to fields of positive characteristic.