Iwasawa Invariants of Even K-groups of Rings of Integers in the Z2-extension over Real Quadratic Number Fields

Abstract

Let F be a real quadratic number field, and let Fcyc denote its cyclotomic Z2-extension. For each integer n≥0, let Fn be the unique intermediate field in Fcyc such that [Fn:F]=2n. By studying the 2-adic divisibility of Dirichlet L-series at negative integers, we derive an asymptotic formula that determines the order of the 2-primary part of even K-groups of rings of integers of Fn for sufficiently large n. As a corollary, we determine their λ and μ invariants. We also establish a lower bound for n beyond which this asymptotic formula holds. Our results have two main applications: (1) For K=Q, Q(p) or Q(2p) with p3 8, we determine the structure of the 2-primary tame kernels K2OKn(2); (2) We explicitly determine the three Iwasawa invariants λ,μ, for a family of real quadratic number fields, whose discriminants have arbitrarily many prime divisors.

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