Selmer group associated to the Chow group of certain codimension two cycles

Abstract

Let X be a surface with geometric genus and irregularity zero which is defined over a number field K. Let X denote a smooth spread of X over the spectrum of a Zariski open subset in the spectrum of the ring of integers and A2 stands for the group of algebraically trivial cycles on schemes modulo rational equivalence. If j*: A2(X) A2(X) be the flat pull-back corresponding to the embedding j:X X then we prove that (j*)(K)/A2(X)(K) is a torsion group. Here (j*)(K), A2(X)(K) stand for the cycles fixed under the action of the absolute Galois group.