Consider tuples (K1,…,Kr) of separable algebras over a common local or global number field F F, with the Ki related to each other by specified resolvent constructions. Under the assumption that all ramification is tame, simple group-theoretic calculations give best possible divisibility relations among the discriminants of Ki∕F. We show that for many resolvent constructions, these divisibility relations continue to hold even in the presence of wild ramification.
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- The Tame-Wild Principle for Discriminant Relations for Number Fields
- Jones, John (Author)
- Roberts, David P. (Author)
- College of Liberal Arts and Sciences (Contributor)
- Digital object identifier: 10.2140/ant.2014.8.609
- Identifier TypeInternational standard serial numberIdentifier Value1944-7833
- Identifier TypeInternational standard serial numberIdentifier Value1937-0652
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Jones, John W., & Roberts, David P. (2014). The tame-wild principle for discriminant relations for number fields. ALGEBRA & NUMBER THEORY, 8(3), 609-645. http://dx.doi.org/10.2140/ant.2014.8.609