Enviar artigo por via de e-mail On the size of the genus of a division algebra
- Autores: Chernousov V.I.1, Rapinchuk A.S.2, Rapinchuk I.A.2
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Afiliações:
- Department of Mathematical and Statistical Sciences
- Department of Mathematics
- Edição: Volume 292, Nº 1 (2016)
- Páginas: 63-93
- Seção: Article
- URL: https://journals.rcsi.science/0081-5438/article/view/173439
- DOI: https://doi.org/10.1134/S0081543816010053
- ID: 173439
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Resumo
Let D be a central division algebra of degree n over a field K. One defines the genus gen(D) as the set of classes [D′] ∈ Br(K) in the Brauer group of K represented by central division algebras D′ of degree n over K having the same maximal subfields as D. We prove that if the field K is finitely generated and n is prime to its characteristic, then gen(D) is finite, and give explicit estimations of its size in certain situations.
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Sobre autores
Vladimir Chernousov
Department of Mathematical and Statistical Sciences
Autor responsável pela correspondência
Email: vladimir@ualberta.ca
Canadá, Edmonton, Alberta, T6G 2G1
Andrei Rapinchuk
Department of Mathematics
Email: vladimir@ualberta.ca
Estados Unidos da América, Charlottesville, VA, 22904-4137
Igor Rapinchuk
Department of Mathematics
Email: vladimir@ualberta.ca
Estados Unidos da América, Cambridge, MA, 02138
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