On the p-divisibility of even K-groups of the ring of integers of a cyclotomic field
Abstract
Let k be a given positive odd integer and p an odd prime. In this paper, we shall give a sufficient condition when a prime p divides the order of the groups K2k(Z[ζm+ζm-1]) and K2k(Z[ζm]), where ζm is a primitive mth root of unity. When F is a p-extension contained in Q(ζl) for some prime l, we also establish a necessary and sufficient condition for the order of K2(p-2)(OF) to be divisible by p.
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