On a Filtration of CH0 for an Abelian Variety A

Abstract

Let A be an abelian variety defined over a field k. In this paper we define a filtration Fr of the group CH0(A) and prove an isomorphism K(k;A,...,A)[1r!] Fr/Fr+1[1r!], where K(k;A,...,A) is the Somekawa K-group attached to r-copies of the abelian variety A.\\ In the special case when k is a finite extension of Qp and A has split multiplicative reduction, we compute the kernel of the map CH0(A)[12]→ Hom(Br(A),/)[12], induced by the pairing CH0(A)× Br(A)→Q/.