Genus theory, governing field, ramification and Frobenius
Abstract
In this work we develop, through a governing field, genus theory for a number field with tame ramification in T and splitting in S, where T and S are finite disjoint sets of primes of . This approach extends that initiated by the second author in the case of the class group. It allows expressing the S-T genus number of a cyclic extension / of degree p in terms of the rank of a matrix constructed from the Frobenius elements of the primes ramified in /, in the Galois group of the underlying governing extension. For quadratic extensions /, the matrices in question are constructed from the Legendre symbols between the primes ramified in / and the primes in S.
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