Grupo de Brauer e o teorema de Merkurjev-Suslin / Brauer group and the Merkujev-Suslin theorem

Camargo, Gilberto Luiz Angelice de

28 May 2013

Neste trabalho mostramos o importante teorema de Merkurjev- Suslin para o caso de 2-torção, seguindo o artigo [Mer06], que afirma que, para qualquer corpo F de característica diferente de 2, a 2-torção \'IND.2 Br\'(F) do grupo de Brauer de F é gerada pelas classes de álgebras de quatérnions / In this work we show the important theorem of Merkurjev- Suslin for 2-torsion, following the paper [Mer06], which states that for any field F of characteristic not 2 the 2-torsion \'IND. 2 Br\'(F) of the Brauer Group of F is generated by the quaternion algebra classes

Brauer group

Grupo de Brauer

Grupo de Brauer e o teorema de Merkurjev-Suslin / Brauer group and the Merkujev-Suslin theorem

Gilberto Luiz Angelice de Camargo

28 May 2013

Neste trabalho mostramos o importante teorema de Merkurjev- Suslin para o caso de 2-torção, seguindo o artigo [Mer06], que afirma que, para qualquer corpo F de característica diferente de 2, a 2-torção \'IND.2 Br\'(F) do grupo de Brauer de F é gerada pelas classes de álgebras de quatérnions / In this work we show the important theorem of Merkurjev- Suslin for 2-torsion, following the paper [Mer06], which states that for any field F of characteristic not 2 the 2-torsion \'IND. 2 Br\'(F) of the Brauer Group of F is generated by the quaternion algebra classes

Grupo de Brauer

Brauer group

Topological construction of C*-correspondences for groupoid C*-algebras

Holkar, Rohit Dilip

12 September 2014

No description available.

510

groupoid

topological correspondences

groupoid representation

induced representations

Brauer group

groupoid morphisms

bicategory

Mathematics (PPN61756535X)

Teorema 90 de Hilbert para o radical de Kaplansky e suas relações com o grupo de Galois do fecho quadrático / Hilbert's Theorem 90 for the Kaplansky's radical and its relations with Galois group of quadratic closure

Matos, Fábio Alexandre de, 1976-

24 August 2018

Orientador: Antonio José Engler / Tese (doutorado) - Universidade Estadual de Campinas, Instituto de Matemática Estatística e Computação Científica / Made available in DSpace on 2018-08-24T22:18:49Z (GMT). No. of bitstreams: 1 Matos_FabioAlexandrede_D.pdf: 1117786 bytes, checksum: ce8cedb8cf95de8f81d4d520e2d308ad (MD5) Previous issue date: 2014 / Resumo: Apresentaremos neste trabalho um estudo sobre a aritmética corpos de característica distinta de 2 com um número finito de classes de quadrados. Dividido em duas partes, começaremos com um estudo do radical de Kaplansky de um corpo F e seu comportamento em 2-extensões de F. Na segunda parte introduziremos um novo objeto, as bases distinguidas, e exploraremos suas propriedades obtendo uma generalização do Teorema 90 de Hilbert, versão para o radical de Kaplansky, e propriedades cohomológicas de corpos que possuam base distinguida / Abstract: We will present in this work a study about the arithmetic of fields of characteristic different from 2 with a finite number of square class. Divided in two parts, we will start with a study of the Kaplansky¿s radical of a field F and its behavior in 2-extensions of F. In the second part will introduce a new object, the distinguished bases, and we will explore its properties obtaining a generalization of Hilbert¿s Theorem 90 for the Kaplansky's radical and cohomological properties of fields that own distinguished basis / Doutorado / Matematica / Doutor em Matemática

Kaplansky, Radical de

Formas quadráticas

Brauer, Grupo de

Galois, Teoria de

Kaplansky radicals

Galois Theory

Quadratic forms

Brauer group

Rational embeddings of the Severi Brauer variety

Meth, John Charles

30 September 2010

In an attempt to prove Amitsur's Conjecture for cyclic subgroups of the Brauer group, we look at rational embeddings of the Severi Brauer variety of an algebra into its norm hypersurface. We enlarge the collection of such embeddings, and generalize them to embeddings of generalized Severi Brauer varieties into determinantal varieties. / text

Severi Brauer variety

Central simple algebra

Brauer group

Division algebra

Skew field

Tautological bundle

Determinantal variety

Norm hypersurface

Groupe de Brauer des espaces homogènes à stabilisateur non connexe et applications arithmétiques / The Brauer group of homogeneous spaces with non connected stabilizer and arithmetical applications

Lucchini Arteche, Giancarlo

29 September 2014

Dans cette thèse, on s'intéresse au groupe de Brauer non ramifié des espaces homogènes à stabilisateur non connexe et à ses applications arithmétiques. On développe notamment différentes formules de nature algébrique et/ou arithmétique permettant de calculer explicitement, tant sur un corps fini que sur un corps de caractéristique 0, la partie algébrique du groupe de Brauer non ramifié d'un espace homogène G\G' sous un groupe linéaire G' semi-simple simplement connexe à stabilisateur fini G, le tout en donnant des exemples de calculs que l'on peut faire avec ces formules. Pour ce faire, on démontre au préalable (à l'aide d'un théorème de Gabber sur les altérations) un résultat décrivant la partie de torsion première à p du groupe de Brauer non ramifié d'une variété V lisse et géométriquement intègre sur un corps fini ou sur un corps global de caractéristique p au moyen de l'évaluation des éléments de Br(V) sur ses points locaux. Les formules pour un stabilisateur fini sont ensuite généralisées au cas d'un stabilisateur G quelconque via une réduction de la cohomologie galoisienne du groupe G à celle d'un certain sous-quotient fini. Enfin, pour K un corps global et G un K-groupe fini résoluble, on démontre sous certaines hypothèses sur une extension déployant G que l'espace homogène V:=G\G' avec G' un K-groupe semi-simple simplement connexe vérifie l'approximation faible (ces hypothèses assurant la nullité du groupe de Brauer non ramifié algébrique). On utilise une version plus précise de ce résultat pour démontrer ensuite le principe de Hasse pour des espaces homogènes X sous un K-groupe G' semi-simple simplement connexe à stabilisateur géométrique fini et résoluble, sous certaines hypothèses sur le K-lien défini par X. / This thesis studies the unramified Brauer group of homogeneous spaces with non connected stabilizer and its arithmetic applcations. In particular, we develop different formulas of algebraic and/or arithmetic nature allowing an explicit calculation, both over a finite field and over a field of characteristic 0, of the algebraic part of the unramified Brauer group of a homogeneous space G\G' under a semisimple simply connected linear group G' with finite stabilizer G. We also give examples of the calculations that can be done with these formulas. For achieving this goal, we prove beforehand (using a theorem of Gabber on alterations) a result describing the prime-to-p torsion part of the unramified Brauer group of a smooth and geometrically integral variety V over a global field of characteristic p or over a finite field by evaluating the elements of Br(V) at its local points. The formulas for finite stabilizers are later generalised to the case where the stabilizer G is any linear algebraic group using a reduction of the Galois cohomology of the group G to that of a certain finite subquotient.Finally, for a global field K and a finite solvable K-group G, we show under certain hypotheses concerning the extension splitting G that the homogeneous space V:=G\G' with G' a semi-simple simply connected K-group has the weak approximation property (the hypotheses ensuring the triviality of the unramified algebraic Brauer group). We use then a more precise version of this result to prove the Hasse principle forhomogeneous spaces X under a semi-simple simply connected K-group G' with finite solvable geometric stabilizer, under certain hypotheses concerning the K-kernel (or K-lien) defined by X.

Groupe de Brauer

Espaces homogènes

Cohomologie galoisienne

Groupes finis

Approximation faible

Principe de Hasse

Brauer group

Homogeneous spaces

Galois cohomology

Finite groups

Weak approximation

Hasse principle

Propriedades aritmeticas de corpos com um anel de valorização compativel com o radical de Kaplansky / Arithimetical properties of fields with a valuation ring compatible with the Kaplansky's Radical

Dario, Ronie Peterson

25 March 2008

Orientador: Antonio Jose Engler / Tese (doutorado) - Universidade Estadual de Campinas, Instituto de Matematica, Estatistica e Computação Cientifica / Made available in DSpace on 2018-08-10T18:05:59Z (GMT). No. of bitstreams: 1 Dario_RoniePeterson_D.pdf: 1951766 bytes, checksum: afa64043636e06c86924e24d6fe65f43 (MD5) Previous issue date: 2008 / Resumo: Esta tese é um estudo das propriedades aritméticas de corpos que possuem um anel de valorização compatível com o Radical de Kaplansky. São utilizados os métodos da teoria algébrica das formas quadráticas, teoria de Galois e principalmente, a teoria de valorizações em corpos. Apresentamos um novo método para a construção de corpos com Radical de Kaplansky não trivial. Demonstramos uma versão do Teorema 90 de Hilbert para o radical. Para uma álgebra quaterniônica D, demonstramos que um anel de valorização do centro de D possui extensão para um anel de valorização total e invariante de D se, e somente se, for compatível com o Radical de Kaplansky / Abstract: This thesis is a study of the arithmetical properties of fields with a valuation ring compatible with the Kaplansky¿s Radical. The methods utilized are algebraic theory of quadratic forms, Galois theory and valuation theory over fields. We present a new construction method of fields with non-trivial Kaplansky¿s Radical. We also prove a version of the Hilbert¿s 90 Theorem for the radical. Let D a quaternion algebra and F the center of D. A valuation ring of F has a extension to a total and invariant valuation ring of D iff is compatible with the Kaplansky¿s Radical / Doutorado / Algebra / Doutor em Matemática

Kaplansky, Radical de

Teoria da valorização

Galois, Teoria de

Brauer, Grupo de

Aneis de divisão

Kaplansky radicals

Valuation theory

Galois theory

Division rings

Brauer group

Profinite groups