On the structure of even K-groups of rings of algebraic integers

Abstract

In this paper, we describe the higher even K-groups of the ring of integers of a number field in terms of class groups of an appropriate extension of the number field in question. This is a natural extension of the previous collective works of Browkin, Keune and Kolster, where they considered the case of K2. We then revisit the Kummer's criterion of totally real fields as generalized by Greenberg and Kida. In particular, we give an algebraic K-theoretical formulation of this criterion which we will prove using the algebraic K-theoretical results developed here.