Abstract
Let p be an odd prime and F be a number field whose p-class group is cyclic. Let F{q} be the maximal pro-p extension of F which is unramified outside a single non-p-adic prime ideal q of F. In this work, we study the finitude of the Galois group G{q}(F) of F{q} over F. We prove that G{q}(F) is finite for the majority of q's such that the generator rank of G{q}(F) is two, provided that for p=3, F is not a complex quartic field containing the primitive third roots of unity.
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