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Published online by Cambridge University Press: 01 May 1997
The first part of the proof of Lemma 3 given in the author's paper [1] is obviously incomplete. Namely, [Kfr ]v(ζ) in the fifth line from the bottom of page 245 of [1] is not necessarily a cyclic extension over [Kfr ]v−1(ζ) in the next line. To complete the proof, we shall prove an assertion after simple preliminaries, as follows. Let p be an odd prime. For any CM-field k of finite or infinite degree, let k+ denote the maximal real subfield of k, A(k) the p-class group of k (that is, the p-primary component of the ideal class group of k), A(k+) the p-class group of k+, and A(k)− the kernel of the norm map A(k)→A(k+). Since p>2, A(k)−={a∈A(k)[mid ] aj=a−1} where j denotes the complex conjugation of k. For any extension F′/F of CM-fields, let ϕF′/F denote the homomorphism A(F)−→ A(F′)− induced by the natural map A(F)→A(F′). Now, the following completes the proof in question.