Counting periodic points over finite fields

Abstract

Let V be a quasiprojective variety defined over Fq, and let φ:V→ V be an endomorphism of V that is also defined over Fq. Let G be a finite subgroup of AutFq(V) with the property that φ commutes with every element of G. We show that idempotent relations in the group ring Q[G] give relations between the periodic point counts for the maps induced by φ on the quotients of V by the various subgroups of G. We also show that if G is abelian, periodic point counts for the endomorphism on V/G induced by φ are related to periodic point counts on V and all of its twists by G.