Global ETD Search

41	Groupoids in categories with partial covers Arabidze, Giorgi 15 October 2018 (has links) No description available. 510 Mathematik (PPN61756535X)
42	Introdução à cohomologia de De Rham / Introduction to De Rham Cohomology Silva, Junior Soares da 27 July 2017 (has links) Começamos definindo a cohomologia clássica de De Rham e provamos alguns resultados que nos permitem calcular tal cohomologia de algumas variedades diferenciáveis. Com o intuito de provar o Teorema de De Rham, escolhemos fazer a demonstração utilizando a noção de feixes, que se mostra como uma generalização da ideia de cohomologia. Como a cohomologia de De Rham não é a única que se pode definir numa variedade, a questão da unicidade dá origem a teoria axiomática de feixes, que nos dará uma cohomologia para cada feixe dado. Mostraremos que a partir da teoria axiomática de feixes obtemos cohomologias, além das cohomologias clássicas de De Rham, a cohomologia clássica singular e a cohomologia clássica de Cech e mostraremos que essas cohomologias obtidas a partir da noção axiomática são isomorfas as definições clássicas. Concluiremos que se nos restringirmos a apenas variedades diferenciáveis, essas cohomologias são unicamente isomorfas e este será o teorema de De Rham. / We begin by defining De Rhams classical cohomology and we prove some results that allow us a calculation of the cohomology of some differentiable manifolds. In order to prove De Rhams Theorem, we chose to make a demonstration using a notion of sheaves, which is a generalization of the idea of cohomology. Since De Rhams cohomology is not a only one that can be made into a variety, the question of unicity gives rise to axiomatic theory of sheaves, which give us a cohomology for each sheaf given. We will show that from the axiomatic theory of sheaves we obtain cohomologies, besides the classical cohomologies of De Rham, a singular classical cohomology and a classical cohomology of Cech and we will show that cohomologies are obtained from the axiomatic notion are classic definitions. We will conclude that if we restrict ourselves to only differentiable manifolds, these cohomologies are uniquely isomorphic and this will be De Rhams theorem. Axiomatic sheaf theory Cech cohomology Cohomologia de Cech Cohomologia de DeRham Cohomologia singular De Rham cohomology De Rham theorem Feixes Sheaves Singular cohomology Teorema de De Rham Teoria axiomática de feixes
43	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
44	Introdução à cohomologia de De Rham / Introduction to De Rham Cohomology Junior Soares da Silva 27 July 2017 (has links) Começamos definindo a cohomologia clássica de De Rham e provamos alguns resultados que nos permitem calcular tal cohomologia de algumas variedades diferenciáveis. Com o intuito de provar o Teorema de De Rham, escolhemos fazer a demonstração utilizando a noção de feixes, que se mostra como uma generalização da ideia de cohomologia. Como a cohomologia de De Rham não é a única que se pode definir numa variedade, a questão da unicidade dá origem a teoria axiomática de feixes, que nos dará uma cohomologia para cada feixe dado. Mostraremos que a partir da teoria axiomática de feixes obtemos cohomologias, além das cohomologias clássicas de De Rham, a cohomologia clássica singular e a cohomologia clássica de Cech e mostraremos que essas cohomologias obtidas a partir da noção axiomática são isomorfas as definições clássicas. Concluiremos que se nos restringirmos a apenas variedades diferenciáveis, essas cohomologias são unicamente isomorfas e este será o teorema de De Rham. / We begin by defining De Rhams classical cohomology and we prove some results that allow us a calculation of the cohomology of some differentiable manifolds. In order to prove De Rhams Theorem, we chose to make a demonstration using a notion of sheaves, which is a generalization of the idea of cohomology. Since De Rhams cohomology is not a only one that can be made into a variety, the question of unicity gives rise to axiomatic theory of sheaves, which give us a cohomology for each sheaf given. We will show that from the axiomatic theory of sheaves we obtain cohomologies, besides the classical cohomologies of De Rham, a singular classical cohomology and a classical cohomology of Cech and we will show that cohomologies are obtained from the axiomatic notion are classic definitions. We will conclude that if we restrict ourselves to only differentiable manifolds, these cohomologies are uniquely isomorphic and this will be De Rhams theorem. Cohomologia de Cech Cohomologia de DeRham Cohomologia singular Feixes Teorema de De Rham Teoria axiomática de feixes Axiomatic sheaf theory Cech cohomology De Rham cohomology De Rham theorem Sheaves Singular cohomology
45	Ideal Closures and Sheaf Stability Steinbuch, Jonathan 20 January 2021 (has links) The two main parts of this doctoral thesis are a theorem that tight closure is contained in continuous closure via axes closure on the one hand and an algorithm to decide semistability of sheaves (or geometric vector bundles) via reduction to a linear algebra problem on the other hand. The sheaf stability algorithm was explicitly implemented by the author. sheaf stability ideal closures computer algebra tight closure stable vector bundles 31.51 - Algebraische Geometrie 31.23 - Ideale, Ringe, Moduln, Algebren ddc:510
46	Le théorème de Borel-Weil-Bott Ascah-Coallier, Isabelle January 2008 (has links) Mémoire numérisé par la Division de la gestion de documents et des archives de l'Université de Montréal. Groupes réductifs Reductive groups Sous-groupe de Borel Borel subgroups Tore maximal Maximal torus Fibrés en droite Line bundles Cohomologie de faisceaux Sheaf cohomology Caractères Characters Racines Roots Modules irréductibles Irreductible modules
47	Faisceau automorphe unipotent pour G₂, nombres de Franel, et stratification de Thom-Boardman / Unipotent automorphic sheaf for G₂, Franel numbers, and Thom-Boardman stratification Ye, Lizao 27 September 2019 (has links) Dans cette thèse, d’une part, nous généralisons au cas équivariant un résultat de J. Denef et F. Loeser sur les sommes trigonométriques sur un tore ; d’autre part, nous étudions la stratification de Thom-Boardman associée à la multiplication des sections globales des fibrés en droites sur une courbe. Nous montrons une inégalité subtile sur les dimensions de ces strates. Notre motivation vient du programme de Langlands géométrique. En s’appuyant sur les travaux de W. T. Gan, N. Gurevich, D. Jiang et de S. Lysenko, nous proposons, pour le groupe réductif G de type G2, une construction conjecturale du faisceau automorphe dont le paramètre d’Arthur est unipotent et sous-régulier. En utilisant nos deux résultats ci-dessus, nous déterminons les rangs génériques de toutes les composantes isotypiques d’un faisceau S₃-équivariant qui apparaît dans notre conjecture, ce S₃ étant le centralisateur du SL2 sous-régulier dans le groupe dual de Langlands de G. / In this thesis, on the one hand, we generalise to the equivariant case a result of J. Denef and F. Loeser about trigonometric sums on tori ; on the other hand, we study the Thom-Boardman stratification associated to the multiplication of global sections of line bundles on a curve. We prove a subtle inequaliity about the dimensions of these strata. Our motivation comes from the geometric Langlands program. Based on works of W. T. Gan, N. Gurevich, D. Jiang and S. Lysenko, we propose, for the reductive group G of type G2, a conjectural construction of the automorphic sheaf whose Arthur parameter is unipotent and sub-regular. Using our two results above, we determine the generic ranks of all isotypic components of an S3-equivaraint sheaf which appears in our conjecture, this S3 being the centraliser of the sub-regular SL2 inside the Langlands dual group of G. Programme de Langlands géométrique Faisceau automorphe Orbite unipotente sous-régulière Sommes trigonométriques équivariantes Complexe de Rham logarithmique Variétés toriques Geometric Langlands program Automorphic sheaf Subregular unipotent orbit Equivariant trigonometric sums Logarithmic de Rham complex Toric varieties 512.74 514
48	Azumaya-Algebren und Oktavenalgebren auf algebraischen Varietäten / Azumaya algebras and octonion algebras on algebraic varieties Stroth, Kristin 23 October 2013 (has links) Wir behandeln nichtkommutative Algebren über Ringen und auf algebraischen Varietäten. Im ersten Teil beschreiben wir ein Kriterium, das angibt, ob und wie weit sich eine gegebene Azumaya-Algebra über dem Funktionenkörper einer algebraischen Varietät als Garbe von Azumaya-Algebren auf die Varietät ausdehnen lässt. Außerdem untersuchen wir die lokale Struktur von Azumaya-Algebren oder allgemeiner von Maximalordnungen, die mit Hilfe des Cyclic-Covering-Tricks von Chan konstruiert werden. Mit dieser Methode lassen sich Maximalordnungen auf algebraischen Flächen konstruieren, die zudem genau über einer gewählten Kurve verzweigen. Im zweiten Teil betrachten wir die nichtassoziativen Oktavenalgebren und allgemeiner auch Kompositionsalgebren über Ringen. Dabei übertragen wir die bekannten Aussagen von Kompositionsalgebren über Körpern auf die Situation von Algebren über Ringen. Wir untersuchen Oktavenalgebren und Maximalordnungen über diskreten Bewertungsringen und verallgemeinern ein Resultat von van der Blij und Springer über die lokale Natur von Maximalordnungen über den rationalen Zahlen und über algebraischen Zahlkörpern auf den Fall von beliebigen noetherschen, ganzabgeschlossenen Integritätsbereichen. Abschließend führen wir eine Definition von Garben von Oktavenalgebren und Garben von Maximalordnungen in Oktavenalgebren über algebraischen Varietäten ein. 510 Mathematics (PPN61756535X)
49	Le théorème de Borel-Weil-Bott Ascah-Coallier, Isabelle January 2008 (has links) Mémoire numérisé par la Division de la gestion de documents et des archives de l'Université de Montréal Groupes réductifs Reductive groups Sous-groupe de Borel Borel subgroups Tore maximal Maximal torus Fibrés en droite Line bundles Cohomologie de faisceaux Sheaf cohomology Caractères Characters Racines Roots Modules irréductibles Irreductible modules
50	Cohomologies on sympletic quotients of locally Euclidean Frolicher spaces Tshilombo, Mukinayi Hermenegilde 08 1900 (has links) This thesis deals with cohomologies on the symplectic quotient of a Frölicher space which is locally diffeomorphic to a Euclidean Frölicher subspace of Rn of constant dimension equal to n. The symplectic reduction under consideration in this thesis is an extension of the Marsden-Weinstein quotient (also called, the reduced space) well-known from the finite-dimensional smooth manifold case. That is, starting with a proper and free action of a Frölicher-Lie-group on a locally Euclidean Frölicher space of finite constant dimension, we study the smooth structure and the topology induced on a small subspace of the orbit space. It is on this topological space that we will construct selected cohomologies such as : sheaf cohomology, Alexander-Spanier cohomology, singular cohomology, ~Cech cohomology and de Rham cohomology. Some natural questions that will be investigated are for instance: the impact of the symplectic structure on these di erent cohomologies; the cohomology that will give a good description of the topology on the objects of category of Frölicher spaces; the extension of the de Rham cohomology theorem in order to establish an isomorphism between the five cohomologies. Beside the algebraic, topological and geometric study of these new objects, the thesis contains a modern formalism of Hamiltonian mechanics on the reduced space under symplectic and Poisson structures. / Mathematical Sciences / D. Phil. (Mathematics) Constant dimension Locally Euclidean Frolicher spaces Symplectic structure Symplectic geometry Symplectic quotient or reduced space Exterior algebra Ringed Frolicher space Smooth Gelfand representation Sheaf cohomology Alexander-Spanier cohomology Singular cohomology Cech cohomology and de Rham cohomology Vector fields and mechanics 514.224 Homology theory Symplectic manifolds Topological spaces Sheaf theory Geometry, Differential Hamiltonian graph theory Algebraic spaces

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