Greenberg's conjecture and Iwasawa module of Real biquadratic fields I

Abstract

The main aim of this paper is to investigate Greenberg's conjecture for real biquadratic fields. More precisely, we propose the following problem: What are real biquadratic number fields k such that rank(A(k∞)) = rank(A(k1))?, where A(k∞) is the 2-Iwasawa module of k and A(k1) is the 2-class group of k1 the first layer of the cyclotomic Z2-extension of k. Moreover, we give several families of real biquadratic fields k such that A(k∞) is trivial or isomorphic to Z/2n Z or Z/2 Z × Z/2n Z, where n is a given positive integer. The reader can also find some results concerning the 2-rank of the class group of certain real triquadratic fields.

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