An Analogue of Greenberg's Conjecture for CM Fields

Abstract

Let K be a CM field and K+ be the maximal totally real subfield of K. Assume that the primes above p in K+ split in K. Let S be a set containing exactly half of the prime ideals in K above p. We show, assuming Leopoldt's conjecture is true for K and p, that there is a unique Zp-extension of K unramified outside of S (the S-ramified Zp-extension of K). Such Zp-extensions for CM fields have similar properties to the cyclotomic Zp-extensions of a totally real field. For example, Greenberg proved some criterion for the Iwasawa invariants μ=λ=0 of the cyclotomic Zp-extension of a totally real field, and we will prove analogous results for the S-ramified Zp-extension of a CM field. We also give a numerical criterion for the Iwasawa invariants μ=λ=0 for an imaginary biquadratic field, which is analogous to the one given by Fukuda and Komatsu for real quadratic fields.

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