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1	Grau de aplicações G-equivariantes entre variedades generalizadas / Degree of G-equivariant maps between generalized manifolds Neyra, Norbil Leodan Cordova 09 June 2014 (has links) Neste trabalho estenderemos os resultados obtidos por Hara [34] e J. Jaworowski [38] substituindo as G-variedades por G-variedades generalizadas sobre Z. Além disso, provamos uma fórmula de comparação geral para grau de aplicações de uma variedade generalizada sobre uma esfera que são equivariantes com respeito a ações de grupos finitos, obtendo uma generalização do resultado de A. Kushkuley e Z. Balanov [40] / In this work, we extend the results obtained by Y. Hara [34] and J. Jaworowski [38] by replacing the free G-manifolds by free generalized G-manifolds over Z. Moreover, we prove a general comparison formula for degrees of equivariant maps from a generalized manifold to a sphere which are equivariant with respect to finite group actions, obtaining a generalization of the result of A. Kushkuley and Z. Balanov [40] Aplicações equivariantes Borel-Moore homology Cohomologia de feixes Degree theory Equivariant maps Generalized manifolds Homologia de Borel-Moore Sheaf cohomology Teoria do grau Variedades generalizadas
2	Grau de aplicações G-equivariantes entre variedades generalizadas / Degree of G-equivariant maps between generalized manifolds Norbil Leodan Cordova Neyra 09 June 2014 (has links) Neste trabalho estenderemos os resultados obtidos por Hara [34] e J. Jaworowski [38] substituindo as G-variedades por G-variedades generalizadas sobre Z. Além disso, provamos uma fórmula de comparação geral para grau de aplicações de uma variedade generalizada sobre uma esfera que são equivariantes com respeito a ações de grupos finitos, obtendo uma generalização do resultado de A. Kushkuley e Z. Balanov [40] / In this work, we extend the results obtained by Y. Hara [34] and J. Jaworowski [38] by replacing the free G-manifolds by free generalized G-manifolds over Z. Moreover, we prove a general comparison formula for degrees of equivariant maps from a generalized manifold to a sphere which are equivariant with respect to finite group actions, obtaining a generalization of the result of A. Kushkuley and Z. Balanov [40] Aplicações equivariantes Cohomologia de feixes Homologia de Borel-Moore Teoria do grau Variedades generalizadas Borel-Moore homology Degree theory Equivariant maps Generalized manifolds Sheaf cohomology
3	Quelques aspects sur l'homologie de Borel-Moore dans le cadre de l'homotopie motivique : poids et G-théorie de Quillen / On some aspects of Borel-Moore homology in motivic homotopy : weight and Quillen’s G-theory Jin, Fangzhou 12 December 2016 (has links) Le thème de cette thèse est les différents aspects de la théorie de Borel-Moore dans le monde motivique. Classiquement, sur le corps des nombres complexes, l’homologie de Borel-Moore, aussi appelée “homologie à support compact”, possède des propriétés assez différentes comparée avec l’homologie singulière. Dans cette thèse on étudiera quelques généralisations et applications de cette théorie dans les catégories triangulées de motifs.La thèse est composée de deux parties. Dans la première partie on définit l'homologie motivique de Borel-Moore dans les catégories triangulées de motifs mixtes définies par Cisinski et Déglise et étudie ses diverses propriétés fonctorielles, tout particulièrement une fonctorialité analogue au morphisme de Gysin raffiné défini par Fulton. Ces résultats nous serviront ensuite à identifier le coeur de la structure de poids de Chow définie par Hébert et Bondarko: il se trouve que le coeur, autrement dit la catégorie des éléments de poids zéro, est équivalente à une version relative des motifs purs de Chow sur une base définie par Corti et Hanamura.Dans la deuxième partie on démontre la représentabilité de la G-théorie de Quillen, sous la reformulation de Thomason, dans un premier temps dans la catégorie A1-homotopique des schémas de Morel-Voevodsky, mais aussi dans la catégorie homotopique stable construite par Jardine. On établit une identification de celle-ci comme la théorie de Borel-Moore associée à la K-théorie algébrique, en utilisant le formalisme des six foncteurs établi par Ayoub et Cisinski-Déglise. / The theme of this thesis is different aspects of Borel-Moore theory in the world of motives. Classically, over the field of complex numbers, Borel-Moore homology, also called “homology with compact support”, has some properties quite different from singular homology. In this thesis we study some generalizations and applications of this theory in triangulated categories of motives.The thesis is composed of two parts. In the first part we define Borel-Moore motivic homology in the triangulated categories of mixed motives defined by Cisinski and Déglise and study its various functorial properties, especially a functoriality similar to the refined Gysin morphism defined by Fulton. These results are then used to identify the heart of the Chow weight structure defined by Hébert and Bondarko: it turns out that the heart, namely the category of elements of weight zero, is equivalent to a relative version of pure Chow motives over a base defined by Corti and Hanamura.In the second part we show the representability of Quillen’s G-theory, reformulated by Thomason, firstly in the A1-homotopy category of schemes of Morel-Voevodsky, but also in the stable homotopy category constructed by Jardine. We establish an identification of G-theory as the Borel-Moore theory associated to algebraic K-theory, by using the six functors formalism settled by Ayoub and Cisinski-Déglise. Homologie de Borel-Moore Motifs mixtes Motifs de Chow Théorie de l’homotopie motivique K-théorie de Quillen et K’-théorie Morphisme de Gysin raffiné Structure de poids Formalisme des six foncteurs Borel-Moore homology Mixeds motives Chow motives Motivic homotopy theory Quillen's K-Theory and K'Theory Refined Gysin morphism Weight structure Six funtors formalism

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