Syntomic cohomology and Beilinson's Tate conjecture for K2

Abstract

In this paper, we study an analogue of the Tate conjecture for K2 of U, the complement of split multiplicative fibers in an elliptic surface. A main result is to give an upper bound of the rank of the Galois fixed part of the etale cohomology H2(U,Qp(2)). As an application, we give an elliptic K3 surface X over a p-adic field for which the torsion part of the Chow group CH0(X) of 0-cycles is finite. This would be the first example of a surface X over a p-adic field whose geometric genus is non-zero and for which the torsion part of CH0(X) is finite.