Global ETD Search

41	Hipersuperfícies mínimas e completas de espaços simétricos / Complete minimal hipersurfaces in symmetric spaces Orjuela Chamorro, Jaime Leonardo 02 July 2012 (has links) No presente trabalho construímos novos exemplos de hipersuperfícies mínimas, completas e H-equivariantes de espaços simétricos. Para tal, usamos o método da geometria diferencial equivariante (Hsiang-Lawson). Dividimos nosso estudo em duas partes, a saber, espaços simétricos G/K de tipo não compacto e compacto. No primeiro caso são estudadas ações polares de subgrupos H adaptados à decomposição de Iwasawa G=KAN. No segundo caso usamos a classificação (Podesta-Thobergsson) dos subgrupos H de Spin(9) que atuam com cohomogeneidade dois sobre o plano projetivo octoniônico F_4/Spin(9). / In the present work we construct new examples of complete minimal H-equivariant hypersurfaces of symmetric spaces G/K. For that, we use the equivariant differential geometry method (Hsiang-Lawson). We divide our research in two parts, namely, symmetric spaces of non-compact and compact type. In the first case we study polar actions of subgroups H adapted to the Iwasawa decomposition G=KAN. In the second case we use the classification (Podesta-Thobergsson) of the subgroups H of Spin(9) which act with cohomogeneity two on the octonionc projective plane F_4/Spin(9). Ações polares Equivariant differential geometry Espaços simétricos Geometria diferencial equivariante Hipersuperfícies mímimas Minimal hypersurfaces Polar actions Symmetric spaces
42	Semigrupos gerados por classes laterais e funções caracteristicas de semigrupos / Semigroups generated by cosets and characteristics functions of semigroups Santos, Laercio Jose dos 28 June 2007 (has links) Orientador: Luiz Antonio Barrera San Martin / Tese (doutorado) - Universidade Estadual de Campinas, Instituto de Matemática, Estatística e Computação Científica / Made available in DSpace on 2018-08-10T09:55:18Z (GMT). No. of bitstreams: 1 Santos_LaercioJosedos_D.pdf: 632399 bytes, checksum: 25069afc192f7633f7f8cd6bdce8e96e (MD5) Previous issue date: 2007 / Resumo: Este trabalho divide-se em duas partes. Na primeira parte, obtemos condições necessárias e suficientes para que uma família de classes laterais de um subgrupo de Lie gere um subsemigrupo com interior não vazio. Aplicamos essas condições aos pares simétricos, onde o grupo é semi-simples. Como consequência, mostramos que o subgrupo dos pontos fixos de vários automorfismos involutivos é maximal como semigrupo. Na segunda parte, definimos a função característica de um subsemigrupo de um grupo de Lie semi-simples e, encontramos um subconjunto do domínio de definição dessa função. Fizemos isto usando a teoria geral de semigrupos em grupos semi-simples. Usamos a função característica de um semigrupo, com algumas hipóteses adicionais, para introduzir uma métrica Riemanniana nas órbitas do subgrupo das unidades do semigrupo. Com essa métrica, obtemos uma condição necessária para que um subgrupo possa ser imerso em um semigrupo próprio com interior não vazio / Abstract: This work is made of two parts. In the first one, we gave necessary and sufficient conditions for a family of cosets of a Lie subgroup to generate a subsemigroup with nonempty interior. We apply these conditions to symmetric pairs where the group is semi-simple. As a consequence we prove that for several involutive automorphisms the fixed points subgroup is a maximal semigroup. In the second part, we define a characteristic function of a subsemigroup of a semi- simple Lie group and we find a subset where the function is defined. This is made through general theory of semigroups in semi-simple groups. The characteristic function is used, together with some additional hypothesis, for to create a Riemannian metric in the orbits of the unity subgroup of the semigroup. With this metric we gave a necessary condition for a subgroup be embedded in a proper semigroup with nonempty interior / Doutorado / Teoria de Lie / Doutor em Matemática Lie, Grupos de Lie, Álgebra de Semigrupos Espaços homogêneos Espaços simetricos Lie groups Lie algebras Semigroups Homogeneous spaces Symmetric spaces
43	Hipersuperfícies mínimas e completas de espaços simétricos / Complete minimal hipersurfaces in symmetric spaces Jaime Leonardo Orjuela Chamorro 02 July 2012 (has links) No presente trabalho construímos novos exemplos de hipersuperfícies mínimas, completas e H-equivariantes de espaços simétricos. Para tal, usamos o método da geometria diferencial equivariante (Hsiang-Lawson). Dividimos nosso estudo em duas partes, a saber, espaços simétricos G/K de tipo não compacto e compacto. No primeiro caso são estudadas ações polares de subgrupos H adaptados à decomposição de Iwasawa G=KAN. No segundo caso usamos a classificação (Podesta-Thobergsson) dos subgrupos H de Spin(9) que atuam com cohomogeneidade dois sobre o plano projetivo octoniônico F_4/Spin(9). / In the present work we construct new examples of complete minimal H-equivariant hypersurfaces of symmetric spaces G/K. For that, we use the equivariant differential geometry method (Hsiang-Lawson). We divide our research in two parts, namely, symmetric spaces of non-compact and compact type. In the first case we study polar actions of subgroups H adapted to the Iwasawa decomposition G=KAN. In the second case we use the classification (Podesta-Thobergsson) of the subgroups H of Spin(9) which act with cohomogeneity two on the octonionc projective plane F_4/Spin(9). Ações polares Espaços simétricos Geometria diferencial equivariante Hipersuperfícies mímimas Equivariant differential geometry Minimal hypersurfaces Polar actions Symmetric spaces
44	Benjamini-Schramm convergence of locally symmetric spaces / Convergence de Benjamini-Schramm des espaces localement symétriques Frączyk, Mikołaj 31 August 2017 (has links) Le sujet principal de ce mémoire est le comportement asymptotique de la géométrie et topologie des variétés localement symétriques Gamma\ X quand le volume tend vers l’infini. Notre premier résultat porte sur la convergence Benjamini-Schramm des 2 ou 3-variétés hyperboliques arithmétiques. Une suite d'espaces localement symétriques (Gamma_n\ X) converge Benjamini-Schramm vers l'espace symétrique X si pour chaque R>0 la limite de \Vol((\Gamma\X)_{<R})/Vol(\Gamma\bs X). On montre qu'il existe une constante réelle C=C_R satisfaisant la propriété suivante: pour chaque réseau arithmétique de congruence Gamma de \PGL(2,R) ou PGL(2,C) sans torsion on a Vol ((Gamma\ X)_{<R})<= C_R \ Vol (Gamma\ X)^0.986. Il n'y a qu'un nombre fini de réseaux arithmétiques de covolume borné par une constante donc ce résultat implique la convergence Benjamini-Schramm pour des variétés arithmétiques de congruence. On donne aussi une version de (\ref{AbsFr1}) un peu plus faible qui reste vraie pour des réseaux arithmétiques qui ne sont pas de congruence. Les majorations de volume de la partie $R$-mince sont déduites d'une version forte de la propriété de la multiplicité limite satisfaite par les réseaux arithmétiques de PGL(2,R) et PGL(2,C). En utilisant nos résultats on confirme la conjecture de Gelander pour des 3-variétés arithmétiques hyperboliques: pour chaque telle variété M on construit un complexe simplicial N homotope à M dont le nombre des simplexes est O(Vol(M)) et le degré des nœuds est uniformément borné par une constante absolue. Dans la deuxième partie on s'intéresse aux espaces localement symétriques Gamma\X où X est de rang supérieur ou égal à 2. Notre résultat principal affirme que la dimension du premier groupe d'homologie à coefficients dans F_2 (corps avec 2 éléments) est sous-linéaire en le volume. Ce résultat est à comparer avec des travaux de Calegari et Emerton sur la cohomologie mod-p dans les tours p-adiques des 3-variétés et les résultats d'Abert, Gelander et Nikolov sur le rang des sous-groupes d'un réseau de rang supérieur à angles droits. Le point fort de notre approche est qu'il n'y a pas besoin de travailler dans une seule classe de commensurabilité. La troisième partie est indépendante des deux premières. Elle porte sur une extension du théorème de Kesten. Le théorème de Kesten affirme que si Gamma est un groupe engendré par un ensemble fini symétrique S, N est un sous-groupe normal de Gamma alors N est moyennable si et seulement si les rayons spectraux du graphe de Cayley Cay(Gamma,S) et du graphe de Scheier Sch(Gamma/N,S) coïncident. En utilisant les techniques de Abert, Glasner et Virag on généralise le theorème de Kesten aux N-uniformément récurrents. / The main theme of this work is the study of geometry and topology of locally symmetric spaces Gamma\ X as ther volume Vol(\Gamma\ X) tends to infinity. Our first main result concerns the Benjamini-Schramm convergence for arithmetic hyperbolic 2 or 3-manifolds. A sequence of locally symmetric spaces (Gamma_n\ X) converges Benjamini-Schramm to X if and only if for every radius R>0 the limit Vol((Gamma\ X)_{<R}/Vol (Gamma\ X) as n goes to infinity is 0, where (\Gamma\X)_{<R} stands for the R-thin part of Gamma\ X. We prove that there exists a positive constant C=C_R with the following property: for every torsion free, uniform, congruence arithmetic lattice Gamma in PGL(2,R) or PGL(2,C) Vol ((Gamma\ X)_{<R})<= C Vol (Gamma\X))^0.986. There is only finitely many arithmetic lattices of covolume bounded by a constant so the result above implies the Benjamini-Schramm convergence for any sequence of congruence arithmetic hyperbolic 3-manifolds. We also prove a similar but slightly weaker inequality for non-congruence subgroups. Our results are deduced form a strong form of the limit multiplicity property that holds for arithmetic lattices in PGL(2,R) of PGL(2,C). As an application of our bounds we confirm Gelander's conjecture on the triangulations of arithmetic hyperbolic 3-manifolds: we show that every arithmetic hyperbolic 3-manifold M admits a triangulation with O(Vol(M)) simplices and degrees of vertices bounded uniformly by an absolute constant. Next, we move to the setting of higher rank locally symmetric spaces. Let M_n=Gamma_n\ X be a sequence of pairwise distinct locally symmetric spaces modeled after a higher rank symmetric space X. We show that the dimension of the first homology group with coefficients in F_2 is sublinear in volume. This can be compared with the results of Calegari and Emerton on mod-p homology growth in p-adic analytic towers of 3-manifolds as well as the results of Abert, Gelander and Nikolov on the rank gradient of right-angled lattices in higher rank Lie groups.The main strength of our theorem is that we do not need to assume that the manifolds in question are commensurable. Our third result is independent of the first two. Kesten theorem asserts that if Gamma is group generated by a finite symmetric set S and N is a normal subgroup of Gamma then N is amenable if and only if the spectral radii of the Cayley graphs Cay(Gamma, S) and the Schreier graph Sch(Gamma/N,S) are equal. Building on the work of Abert, Glasner and Virag we extend Kesten's theorem to uniformly recurrent subgroups. Espaces localement symétriques Groupes arithmétiques Théorie des représentations Marches aléatoires Locally symmetric spaces Arithmetic groups Representation theory Random walks
45	Strings, Branes and Non-trivial Space-times Björnsson, Jonas January 2008 (has links) <p>This thesis deals with different aspects of string and /p/-brane theories. One of the motivations for string theory is to unify the forces in nature and produce a quantum theory of gravity. /p/-branes and related objects arise in string theory and are related to a non-perturbative definition of the theory. The results of this thesis might help in understanding string theory better. The first part of the thesis introduces and discusses relevant topics for the second part of the thesis which consists of five papers.</p><p>In the three first papers we develop and treat a perturbative approach to relativistic /p/-branes around stretched geometries. The unperturbed theory is described by a string- or particle-like theory. The theory is solved, within perturbation theory, by constructing successive canonical transformations which map the theory to the unperturbed one order by order. The result is used to define a quantum theory which requires for consistency d = 25 + p dimensions for the bosonic /p/-branes and d = 11 for the supermembrane. This is one of the first quantum results for extended objects beyond string theory and is a confirmation of the expectation of an eleven-dimensional quantum membrane.</p><p>The two last papers deal with a gauged WZNW-approach to strings moving on non-trivial space-times. The groups used in the formulation of these models are connected to Hermitian symmetric spaces of non-compact type. We have found that the GKO-construction does not yield a unitary spectrum. We will show that there exists, however, a different approach, the BRST approach, which gives unitarity under certain conditions. This is the first example of a difference between the GKO- and BRST construction. This is one of the first proofs of unitarity of a string theory in a non-trivial non-compact space-time. Furthermore, new critical string theories in dimensions less then 26 or 10 is found for the bosonic and supersymmetric string, respectively.</p> String theory Membranes BRST /p/-branes /p/-branes Non-compact backgrounds WZNW-model No-ghost theorem Unitarity Hermitian symmetric spaces CFT Physics Fysik
46	Dualisation Of Supergravity Theories Yilmaz, Nejat Tevfik 01 February 2004 (has links) (PDF) By using the Kaluza-Klein reduction, the derivation of the maximal supergravities from the D=11 supergravity theory, as well as the Abelian Yang-Mills supergravities from the D=10 type I supergravity theory are discussed. After a thorough review of the symmetric spaces the symmetric space sigma model is studied in detail. The first-order formulation of both the pure and the matter coupled symmetric space sigma model is presented in a general formalism. The dualisation of the non-gravitational Bosonic sectors of the D=11, IIB and the maximal supergravities are also reviewed in a concise but a self-contained formulation. As an example of the dualisation of the matter coupled supergravities, the doubled formalism is constructed for the D=8 Salam-Sezgin supergravity. QC Elementary Particle Physics 793-793.5
47	Strings, Branes and Non-trivial Space-times Björnsson, Jonas January 2008 (has links) This thesis deals with different aspects of string and /p/-brane theories. One of the motivations for string theory is to unify the forces in nature and produce a quantum theory of gravity. /p/-branes and related objects arise in string theory and are related to a non-perturbative definition of the theory. The results of this thesis might help in understanding string theory better. The first part of the thesis introduces and discusses relevant topics for the second part of the thesis which consists of five papers. In the three first papers we develop and treat a perturbative approach to relativistic /p/-branes around stretched geometries. The unperturbed theory is described by a string- or particle-like theory. The theory is solved, within perturbation theory, by constructing successive canonical transformations which map the theory to the unperturbed one order by order. The result is used to define a quantum theory which requires for consistency d = 25 + p dimensions for the bosonic /p/-branes and d = 11 for the supermembrane. This is one of the first quantum results for extended objects beyond string theory and is a confirmation of the expectation of an eleven-dimensional quantum membrane. The two last papers deal with a gauged WZNW-approach to strings moving on non-trivial space-times. The groups used in the formulation of these models are connected to Hermitian symmetric spaces of non-compact type. We have found that the GKO-construction does not yield a unitary spectrum. We will show that there exists, however, a different approach, the BRST approach, which gives unitarity under certain conditions. This is the first example of a difference between the GKO- and BRST construction. This is one of the first proofs of unitarity of a string theory in a non-trivial non-compact space-time. Furthermore, new critical string theories in dimensions less then 26 or 10 is found for the bosonic and supersymmetric string, respectively. String theory Membranes BRST /p/-branes /p/-branes Non-compact backgrounds WZNW-model No-ghost theorem Unitarity Hermitian symmetric spaces CFT Physics Fysik
48	Products of diagonalizable matrices Khoury, Maroun Clive 00 December 1900 (has links) Chapter 1 reviews better-known factorization theorems of a square matrix. For example, a square matrix over a field can be expressed as a product of two symmetric matrices; thus square matrices over real numbers can be factorized into two diagonalizable matrices. Factorizing matrices over complex num hers into Hermitian matrices is discussed. The chapter concludes with theorems that enable one to prescribe the eigenvalues of the factors of a square matrix, with some degree of freedom. Chapter 2 proves that a square matrix over arbitrary fields (with one exception) can be expressed as a product of two diagona lizab le matrices. The next two chapters consider decomposition of singular matrices into Idempotent matrices, and of nonsingutar matrices into Involutions. Chapter 5 studies factorization of a comp 1 ex matrix into Positive-( semi )definite matrices, emphasizing the least number of such factors required / Mathematical Sciences / M.Sc. (MATHEMATICS) Diagonalizable factorization of matrices Hermitian factorization of matrices Idempotent factorization of matrices 512.9434 Matrices Hermitian symmetric spaces Positive-definite functions
49	Products of diagonalizable matrices Khoury, Maroun Clive 09 1900 (has links) Chapter 1 reviews better-known factorization theorems of a square matrix. For example, a square matrix over a field can be expressed as a product of two symmetric matrices; thus square matrices over real numbers can be factorized into two diagonalizable matrices. Factorizing matrices over complex numbers into Hermitian matrices is discussed. The chapter concludes with theorems that enable one to prescribe the eigenvalues of the factors of a square matrix, with some degree of freedom. Chapter 2 proves that a square matrix over arbitrary fields (with one exception) can be expressed as a product of two diagonalizable matrices. The next two chapters consider decomposition of singular matrices into Idempotent matrices, and of nonsingular matrices into Involutions. Chapter 5 studies factorization of a complex matrix into Positive-(semi)definite matrices, emphasizing the least number of such factors required. / Mathematical Sciences / M. Sc. (Mathematics) Diagonalizable factorization of matrices Hermitian factorization of matrices Idempotent factorization of matrices 512.9434 Matrices Hermitian symmetric spaces Positive-definite functions
50	O tensor de Ricci e campos de killing de espaços simétricos / The Ricci tensor and symmetric space killing fields Vasconcelos, Rosa Tayane de 13 September 2017 (has links) VASCONCELOS, Rosa Tayane de. O tensor de Ricci e campos de killing de espaços simétricos. 2017. 81 f. Dissertação (Mestrado em Matemática)- Centro de Ciências, Universidade Federal do Ceará, Fortaleza, 2017. / Submitted by Andrea Dantas (pgmat@mat.ufc.br) on 2017-09-18T13:45:50Z No. of bitstreams: 1 2017_dis_rtvasconcelos.pdf: 555452 bytes, checksum: 4ff6c8fb7950682913acabed03e9d3d7 (MD5) / Rejected by Rocilda Sales (rocilda@ufc.br), reason: Boa tarde, A Dissertação de ROSA TAYANE DE VASCONCELOS apresenta a alguns erros que devem corrigidos, os mesmos seguem listados abaixo: 1- EPÍGRAFE (coloque o nome do autor da epígrafe todo em letra maiúscula) 2- RESUMO/ ABSTRACT (retire o recuo dos parágrafos do resumo e do abstract) 3- PALAVRAS-CHAVE/ KEYWORDS (coloque a letra inicial do primeiro elemento das palavras- -chave e das Keywords em maiúscula) 4- CITAÇÕES (as citações a autores, que aparecem em todo o trabalho, não estão no padrão ABNT: se for apenas uma referência geral a uma obra, deve se colocar o último sobrenome do autor em letra maiúscula e o ano da publicação, ex.: EBERLEIN (2005). Caso seja a citação de um trecho particular da obra deve acrescentar o número da página, ex.: EBERLEIN (2005, p. 30). OBS.: as citações não devem estar entre colchetes. 5- TÍTULOS DOS CAPÍTULOS E SEÇÕES (coloque os títulos dos capítulos e seções em negrito) 6- REFERÊNCIAS (as referências bibliográficas não estão no padrão ABNT: apenas o último sobrenome do autor, que inicia a referência, deve estar em letra maiúscula, o restante do nome deve estar em letra minúscula. EX.: BROCKER, Theodor; TOM DIECK, Tammo. Representations of compact Lie groups, v. 98. Springer Science & Business Media, 2013. Atenciosamente, on 2017-09-18T15:04:06Z (GMT) / Submitted by Andrea Dantas (pgmat@mat.ufc.br) on 2017-09-19T13:33:40Z No. of bitstreams: 1 2017_dis_rtvasconcelos.pdf: 522079 bytes, checksum: ff99004fbe22e922f704a6a87365d3b6 (MD5) / Approved for entry into archive by Rocilda Sales (rocilda@ufc.br) on 2017-09-21T12:18:22Z (GMT) No. of bitstreams: 1 2017_dis_rtvasconcelos.pdf: 522079 bytes, checksum: ff99004fbe22e922f704a6a87365d3b6 (MD5) / Made available in DSpace on 2017-09-21T12:18:22Z (GMT). No. of bitstreams: 1 2017_dis_rtvasconcelos.pdf: 522079 bytes, checksum: ff99004fbe22e922f704a6a87365d3b6 (MD5) Previous issue date: 2017-09-13 / This work brings a smooth and self-contained introduction to the study of the most basic aspects of symmetric spaces, having as its nal goal the characterization of the Killing vector fields and of the Ricci tensor of such riemannian manifolds. Several of the results presented in the initial chapter are not easily found, in the Diferential Geometry literature, in a way as accessible and self-contained as here. This being said, we believe that this work embodies some didactic relevance, for it others students interested in symmetric spaces a relatively smooth first contact. We shall generally look at symmetric spaces as homogeneous manifolds G=H, where G is a Lie group and H is a closed Lie subgroup of G, such that the natural mapping : G ! G=H is a riemannian submersion. Ultimately, this map allows us to describe the relationships between the curvature, the Ricci tensor and the geodesics of G and G=H. For our purposes, the crucial remark is that, under appropriate circumstances, one guarantees the existence, in G=H, of a metric for which left translations are isometries. Hence, a one-parameter family of such isometries gives rise to a Killing vector field, which turn into a Jacobi vector eld when restricted to a geodesic. We present explicit expressions for such Jacobi vector elds, showing that they only depend on the eigenvalues of the linear operator TX : g ! g given by TX = (adX)2, for certain vector elds X 2 g. / Este trabalho traz uma introdução suave e autocontida ao estudo dos aspectos mais básicos de espaços simétricos, tendo como objetivo final a caracterização dos campos de Killing e do tensor de Ricci de tais variedades riemannianas. Vários dos resultados obtidos nos capítulos iniciais não são encontrados, na literatura de Geometria Diferencial, de maneira tão acessível e autocontida como apresentados aqui. Com isso, acreditamos que o trabalho reveste-se de alguma relevância didática, por oferecer aos alunos interessados no estudo de espaços simétricos um primeiro contato relativamente suave. Em linhas gerais, veremos espaços simétricos como variedades homogêneas G=H, onde G e um grupo de Lie e H um subgrupo de Lie fechado de G, tais que a aplicação natural: G ! G=H seja uma submersão riemanniana. Através dela, descrevemos relações entre a curvatura, o tensor de Ricci e as geodésicas de G e G=H. Para nossos propósitos, a observação crucial e que, sob certas hipóteses, garantimos a existência, em G=H, de uma métrica cujas translações a esquerda são isometrias. Portanto, uma família a um parâmetro de tais isometrias d a origem a um campo de Killing que, por sua vez, restrito a geodésicas torna-se um campo de Jacobi. Apresentamos expressões para esses campos de Jacobi, mostrando que os mesmos só dependem dos autovalores do operador linear TX : g ! g dado por TX = (adX)2, para certos campos X 2 g. Espaços simétricos Ações de grupo transitivas Campos de Killing Variedades quociente Submersões riemannianas Espaços homogêneos Métricas G-invariantes Symmetric spaces Transitive group actions Killing fields Coset manifolds Riemannian submersions Homogeneous spaces G-invariant metrics

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