Global ETD Search

21	Espectro essencial de uma classe de variedades riemannianas / Essential spectrum of a class of Riemannian manifolds Luiz AntÃnio Caetano Monte 21 November 2012 (has links) Conselho Nacional de Desenvolvimento CientÃfico e TecnolÃgico / CoordenaÃÃo de AperfeiÃoamento de Pessoal de NÃvel Superior / Neste trabalho, provaremos alguns resultados sobre espectro essencial de uma classe de variedades Riemannianas, nÃo necessariamente completas, com condiÃÃes de curvatura na vizinhanÃa de um raio. Sobre essas condiÃÃes obtemos que o espectro essencial do operador de Laplace contÃm um intervalo. Como aplicaÃÃo, obteremos o espectro do operador de Laplace de regiÃes ilimitadas dos espaÃos formas, tais como a horobola do espaÃo hiperbÃlico e cones do espaÃo Euclidiano. Construiremos tambÃm um exemplo que indica a necessidade das condiÃÃes globais sobre o supremo das curvaturas seccionais fora de uma bola para que a variedade nÃo tenha espectro essencial. / In this thesis we consider a family of Riemannian manifolds, not necessarily complete, with curvature conditions in a neighborhood of a ray. Under these conditions we obtain that the essential spectrum of the Laplace operator contains an interval. The results presented in this thesis allow to determine the spectrum of the Laplace operator on unlimited regions of space forms, such as horoball in hyperbolic space and cones in Euclidean space. Also construct an example that shows the need of global conditions on the supreme sectional curvature outside a ball, so that the variety has no essential spectrum. operador laplaciano cones euclidianos horobola do espaÃo hiperbÃlico curvatura mÃdia das esferas geodÃsicas Laplacian operator Euclidean cones horobola of hyperbolic space mean curvature of geodesic spheres ANALISE
22	Quasi-isometries between hyperbolic metric spaces, quantitative aspects Shchur, Vladimir 08 July 2013 (has links) (PDF) In this thesis we discuss possible ways to give quantitative measurement for two spaces not being quasi-isometric. From this quantitative point of view, we reconsider the definition of quasi-isometries and propose a notion of ''quasi-isometric distortion growth'' between two metric spaces. We revise our article [32] where an optimal upper-bound for Morse Lemma is given, together with the dual variant which we call Anti-Morse Lemma, and their applications.Next, we focus on lower bounds on quasi-isometric distortion growth for hyperbolic metric spaces. In this class, $L^p$-cohomology spaces provides useful quasi-isometry invariants and Poincaré constants of balls are their quantitative incarnation. We study how Poincaré constants are transported by quasi-isometries. For this, we introduce the notion of a cross-kernel. We calculate Poincaré constants for locally homogeneous metrics of the form $dt^2+\sum_ie^{2\mu_it}dx_i^2$, and give a lower bound on quasi-isometric distortion growth among such spaces.This allows us to give examples of different quasi-isometric distortion growths, including a sublinear one (logarithmic). Hyperbolic space Quasi-isometrie Quasi-geodesic Morse Lemma Poincaré inequality Poincaré constant Quasi-isometric distortion growth
23	Hipersuperfícies no espaço hiperbólico associadas à equação da curvatura escalar constante / Hypersurfaces in hyperbolic space associated with a conformai scalar curvature equation Machado, Cid Dias Ferraz 07 March 2014 (has links) Submitted by Luciana Ferreira (lucgeral@gmail.com) on 2015-01-13T11:21:20Z No. of bitstreams: 2 license_rdf: 23148 bytes, checksum: 9da0b6dfac957114c6a7714714b86306 (MD5) Dissertação - Cid Dias Ferraz Machado - 2014.pdf: 1785087 bytes, checksum: 2f0dd6f0844c3aa992b9eaf248f40ed4 (MD5) / Approved for entry into archive by Luciana Ferreira (lucgeral@gmail.com) on 2015-01-13T11:22:09Z (GMT) No. of bitstreams: 2 license_rdf: 23148 bytes, checksum: 9da0b6dfac957114c6a7714714b86306 (MD5) Dissertação - Cid Dias Ferraz Machado - 2014.pdf: 1785087 bytes, checksum: 2f0dd6f0844c3aa992b9eaf248f40ed4 (MD5) / Made available in DSpace on 2015-01-13T11:22:10Z (GMT). No. of bitstreams: 2 license_rdf: 23148 bytes, checksum: 9da0b6dfac957114c6a7714714b86306 (MD5) Dissertação - Cid Dias Ferraz Machado - 2014.pdf: 1785087 bytes, checksum: 2f0dd6f0844c3aa992b9eaf248f40ed4 (MD5) Previous issue date: 2014-03-07 / Conselho Nacional de Pesquisa e Desenvolvimento Científico e Tecnológico - CNPq / In this work we present a study of a class of oriented hypersurfaces in hyperbolic space satisfying a special linear relation between the rth mean curvatures which is based on a Walterson Ferreira and Pedro Roitman’s article, where this class is characterized by a harmonic map derived from the two hyperbolic Gauss maps.We also show the relation of such hypersufaces with solutions of the equation Du+kun+2 n􀀀2 = 0, where k 2 f􀀀1;0;1g. / Neste trabalho apresentamos um estudo de uma classe de hipersuperfícies orientadas no espaço hiperbólico satisfazendo uma relação linear especial entre as r-ésimas curvaturas médias, baseado no trabalho de Walterson Ferreira e Pedro Roitman, onde esta classe é caracterizada por uma aplicação harmônica derivada das duas aplicações hiperbólicas de Gauss. Também mostramos a relação de tais hipersuperfícies com as soluções da equação Du+kun+2 n􀀀2 = 0, onde k 2 f􀀀1;0;1g. Métricas conformemente plana Curvatura escalar constante C-Weingarten Hypersurfaces in hyperbolic space Conformally flat metrics Constant scalar curvature C-Weingarten CIENCIAS EXATAS E DA TERRA::MATEMATICA
24	Superfícies isocurvadas no semiespaço Euclidiano tridimensional / Isocurved surfaces in Euclidean three-dimensional half-space García, Hector Andrés Rosero 31 March 2017 (has links) Submitted by Erika Demachki (erikademachki@gmail.com) on 2017-04-24T22:03:45Z No. of bitstreams: 2 Dissertação - Hector Andrés Rosero García - 2017.pdf: 4670148 bytes, checksum: 8bc0d1f8d189cce09af8bc129ec5edcd (MD5) license_rdf: 0 bytes, checksum: d41d8cd98f00b204e9800998ecf8427e (MD5) / Approved for entry into archive by Luciana Ferreira (lucgeral@gmail.com) on 2017-04-25T15:46:02Z (GMT) No. of bitstreams: 2 Dissertação - Hector Andrés Rosero García - 2017.pdf: 4670148 bytes, checksum: 8bc0d1f8d189cce09af8bc129ec5edcd (MD5) license_rdf: 0 bytes, checksum: d41d8cd98f00b204e9800998ecf8427e (MD5) / Made available in DSpace on 2017-04-25T15:46:02Z (GMT). No. of bitstreams: 2 Dissertação - Hector Andrés Rosero García - 2017.pdf: 4670148 bytes, checksum: 8bc0d1f8d189cce09af8bc129ec5edcd (MD5) license_rdf: 0 bytes, checksum: d41d8cd98f00b204e9800998ecf8427e (MD5) Previous issue date: 2017-03-31 / Conselho Nacional de Pesquisa e Desenvolvimento Científico e Tecnológico - CNPq / In this work we develop the basics of the concept of Isocurved Surface, introduced in [2] by Barroso and Roitman, that is, a surface immersed in a 3-dimensional manifold M and which have the same Gaussian curvature induced by two different metrics. Later on, we show a geometric method to generate non-trivial examples of elliptic and hyperbolic isocurved surfaces for the particular case of M = R3+ and the Euclidean and hyperbolic metrics induced on it. We also exhibit some examples coming from the geometric method above. / Neste trabalho, desenvolvemos as bases do conceito de Superfície Isocurvada, introduzido em [2] por Barroso e Roitman, isto é, uma superfície imersa numa variedade 3-dimensional M a qual tem a mesma curvatura Gaussiana induzida por duas métricas diferentes em M. Segundo isso, mostramos um método geométrico para a geração de exemplos não triviais de superfícies isocurvadas elípticas e hiperbólicas no caso particular de M = R^3_+ com as métricas conformes Euclidiana e hiperbólica. Também exibimos alguns exemplos subjacentes ao método acima. Curvatura Gaussiana Métricas conformes Espaço hiperbólico Superfícies mínimas Congruência de geodésicas Gaussian curvature Conformal metrics Hyperbolic space Minimal surfaces Congruence of geodesics MATEMATICA::GEOMETRIA E TOPOLOGIA
25	Semi-groupes de matrices et applications / Matrix semigroups and applications Mercat, Paul 11 December 2012 (has links) Nous étudions les semi-groupes de matrices avec des points de vue variés qui se re-coupent. Le point de vue de la croissance s’avère relié à un point de vue géométrique : nous avons partiellement généralisé aux semi-groupes un théorème de Patterson-Sullivan-Paulin sur les groupes, qui donne l’égalité entre exposant critique et dimension de Hausdorff de l’ensemble limite. Nous obtenons cela dans le cadre général des semi-groupes d’isométries d’un espace Gromov-hyperbolique, et notre preuve nous a permis d’obtenir également d’autres résultats nouveaux. Le point de vue informatique s’avère également relié à la croissance, puisque la notion de semi-groupe fortement automatique, que nous avons introduit, permet de calculer les exposants critiques exactes de semi-groupes de développement en base β. Et ce point de vue donne également beaucoup d’autres informations sur ces semi-groupes. Cette notion de croissance s’avère aussi reliée à des conjectures sur les fractions continues telles que celle de Zaremba. Et c’est en étudiant certains semi-groupes de matrices que nous avons pu démontrer des résultats sur les fractions continues périodiques bornées qui permettent de petites avancées dans la résolution d'une conjecture de McMullen. / We study matrix semigroups with different point of view that overlaps. The growth point of view seems to be related with the geometric point of view : we partially generalize to the semigroups a theorem on groups of Patterson-Sullivan-Paulin, that give the equality between the critical exponent and the Hausdorff dimension of the limit set. We obtain this in the general framework of isometries of a Gromov-hyperbolic space, and our proof give also others new results. The computer science point of view is also related to the growth, since we obtain a way to calculate exact values of critical exponents of somes β-adic development semigroups, from a notion of automatic semigroups that we introduce. Furthermore this point of view give a lot of information on these semigroups. This notion of growth shows to be also related to conjectures on continued fractions like Zaremba’s one. And by studing some matrix semigroups we were able to prove some results on bounded periodic continued fractions, doing a little step in the resolution of a conjecture of McMullen. Semi-groupes Isométries Espace hyperbolique Exposant critique Dimension de Hausdorff Ensemble limite Développements β-adiques Automate Langage rationnel Décidabilité Fraction continue Semigroups Isometries Hyperbolic space Critical exponant Hausdorff dimension Limit set Β-adics developpements Automata Regular langage Decidability Continued fraction
26	Quasi-isometries between hyperbolic metric spaces, quantitative aspects / Quasi-isométries entre espaces métriques hyperboliques, aspects quantitatifs Shchur, Vladimir 08 July 2013 (has links) Dans cette thèse, nous considérons les chemins possibles pour donner une mesure quantitative du fait que deux espaces ne sont pas quasi-isométriques. De ce point de vue quantitatif, on reprend la définition de quasi-isométrie et on propose une notion de “croissance de distorsion quasi-isométrique” entre deux espaces métriques. Nous révisons notre article [32] où une borne supérieure optimale pour le lemme de Morse est donnée, avec la variante duale que nous appelons Anti-Morse Lemma, et leurs applications.Ensuite, nous nous concentrons sur des bornes inférieures sur la croissance de distorsion quasi-isométrique pour des espaces métriques hyperboliques. Dans cette classe, les espaces de $L^p$-cohomologie fournissent des invariants de quasi-isométrie utiles et les constantes de Poincaré des boules sont leur incarnation quantitative. Nous étudions comment les constantes de Poincaré sont transportées par quasi-isométries. Dans ce but, nous introduisons la notion de transnoyau. Nous calculons les constantes de Poincaré pour les métriques localement homogènes de la forme $dt^2+\sum_ie^{2\mu_it}dx_i^2$, et donnons une borne inférieure sur la croissance de distorsion quasi-isométrique entre ces espaces.Cela nous permet de donner des exemples présentant différents type de croissance de distorsion quasi-isométrique, y compris un exemple sous-linéaire (logarithmique). / In this thesis we discuss possible ways to give quantitative measurement for two spaces not being quasi-isometric. From this quantitative point of view, we reconsider the definition of quasi-isometries and propose a notion of ``quasi-isometric distortion growth'' between two metric spaces. We revise our article [32] where an optimal upper-bound for Morse Lemma is given, together with the dual variant which we call Anti-Morse Lemma, and their applications.Next, we focus on lower bounds on quasi-isometric distortion growth for hyperbolic metric spaces. In this class, $L^p$-cohomology spaces provides useful quasi-isometry invariants and Poincar\'e constants of balls are their quantitative incarnation. We study how Poincar\'e constants are transported by quasi-isometries. For this, we introduce the notion of a cross-kernel. We calculate Poincar\'e constants for locally homogeneous metrics of the form $dt^2+\sum_ie^dx_i^2$, and give a lower bound on quasi-isometric distortion growth among such spaces.This allows us to give examples of different quasi-isometric distortion growths, including a sublinear one (logarithmic). Espaces hyperbolique Quasi-isométrie Quasi-géodésique Lemme de Morse Inégalité de Poincaré Constante de Poincaré Hyperbolic space Quasi-isometrie Quasi-geodesic Morse Lemma Poincaré inequality Poincaré constant Quasi-isometric distortion growth
27	Surfaces de Cauchy polyédrales des espaces temps plats singuliers / Polyhedral Cauchy-surfaces of flat space-times Brunswic, Léo 22 December 2017 (has links) L'étude des espaces-temps plats singuliers munis d'une surface de Cauchy polyédrale est motivée par leur rôle de model jouet de gravité quantique proposé par Deser, Jackiw et 'T Hooft. Cette thèse porte sur les paramétrisations de certaines classes d'espaces-temps plat singuliers : les espaces-temps plats avec particules massives et BTZ Cauchy-compacts maximaux. Deux paramétrisations sont proposées, l'une reposant sur une extension du théorème de Mess aux espaces-temps plats avec BTZ et la surface de Penner-Epstein, l'autre reposant sur une généralisation du théorème d'Alexandrov aux espaces-temps plats avec particules massives et BTZ. Ce travail propose également une amorce de cadre théorique permettant de considérer des espaces-temps singuliers plus généraux. / The study of singular flat spacetimes with polyhedral Cauchy-surfaces is motivated by the quantum gravity toy model role they play in the seminal work of Deser, Jackiw and 'T Hooft. This thesis study parametrisations of classes of singular flat spacetimes : Cauchy-compact maximal flat spacetimes with massive and BTZ-like singularities. Two parametrisations are constructed. The first is based on an extension of Mess theorem to flat spacetimes with BTZ and Penner-Epstein convex hull construction. The second is based on a generalisation of Alexandrov polyhedron theorem to radiant Cauchy-compact flat spacetimes with massive and BTZ-like singularities. This work also initiate a wider theoretical background that encompass singular spacetimes. Géométrie de Minkowski Espace de Minkowsk Surfaces Espace de Teichmüller Singularité conique Géométrie de Minkowski Espace-temps globalement hyperboliques Polyèdre Minkowski Geometry Minkowski space Surfaces Teichmüller Spaces Conical singularity Minkowski Geometry Globally hyperbolic space-Time Polyhedra
28	Teoremas de Rigidez no espaço hiperbólico. / Theorems of Stiffness in hyperbolic space. ROCHA, Jamilly Lourêdo. 09 August 2018 (has links) Submitted by Johnny Rodrigues (johnnyrodrigues@ufcg.edu.br) on 2018-08-09T17:38:25Z No. of bitstreams: 1 JAMILLY LOURÊDO ROCHA - DISSERTAÇÃO PPGMAT 2014..pdf: 5707925 bytes, checksum: 8010cd451ac64c8a7fccc36a2f8313f6 (MD5) / Made available in DSpace on 2018-08-09T17:38:25Z (GMT). No. of bitstreams: 1 JAMILLY LOURÊDO ROCHA - DISSERTAÇÃO PPGMAT 2014..pdf: 5707925 bytes, checksum: 8010cd451ac64c8a7fccc36a2f8313f6 (MD5) Previous issue date: 2014-08 / Capes / Com uma aplicação adequada do conhecido princípio do máximo generalizado de Omori-Yau, obtemos resultados de rigidez com relação a hipersuperfícies imersas completascomcurvaturamédiadelimitadanoespaçohiperbólicoHn+1 (n+1)-dimensional. Em nossa abordagem exploramos a existência de uma dualidade natural entreHn+1 e a metade Hn+1 do espaço de SitterSn+11 , cujo modelo é chamado de steady state space. / As a suitable application of the well known generalized maximum principle of Omori-Yau, we obtain rigidity results concerning to a complete hypersurface immersed with bounded mean curvature in the (n+1)-dimensional hyperbolic spaceHn+1. In our approach, we explore the existence of a natural duality betweenHn+1 and the half Hn+1 of the de Sitter spaceSn+11 , which models the so-called steady state space. Teoremas de Rigidez Espaço hiperbólico hipersuperfícies completas Curvatura média Aplicação de Gauss Hyperbolic space Complete Hypersurfaces Mean curvature Gauss map Imersões isométricas Variedades semi-Riemannianas Métricas semi-Reimannianas Conexão de Levi-Civita Hipersuperfícies totalmente umbílicas Produtos warped semi-Riemannianas
29	Teoremas de comparação em variedades Käler e aplicações / Laplacian comparison of theorems for Käler manifolds and applications Santos, Adina Rocha dos 25 March 2011 (has links) In this work we present the proofs of the Laplacian comparison theorems for Kähler manifolds Mm of complex dimension m with holomorphic bisectional curvature bounded from below by −1, 1, and 0. The manifolds being compared are the complex hyperbolic space CHm, the complex projective space CPm, and the complex Euclidean space Cm, which holomorphic bisectional curvatures are −1, 1, and 0, respectively. Moreover, as applications of the Laplacian comparison theorems, we describe the proof of the Bishop- Gromov comparison theorem for Kähler manifolds and obtain an estimate for the first eigenvalue λ1(M) of the Laplacian operator, that is, λ1(M) ≤ m2 = λ1(CHm), and show that the volume of Kähler manifolds with holomorphic bisectional curvature bounded from below by 1 is bounded by the volume of CPm. The results cited above have been proved in 2005 by Li and Wang, in an article Comparison theorem for Kähler Manifolds and Positivity of Spectrum , published in the Journal of Differential Geometry. / Conselho Nacional de Desenvolvimento Científico e Tecnológico / Nesta dissertação, apresentamos as demonstrações dos teoremas de comparação do Laplaciano para variedades Kähler completas Mm de dimensão complexa m com curvatura bisseccional holomorfa limitada inferiormente por −1, 1 e 0. As variedades a serem comparadas são o espaço hiperbólico complexo CHm, o espaço projetivo complexo CPm e o espaço Euclidiano complexo Cm, cujas curvaturas bisseccionais holomorfas são −1, 1 e 0, respectivamente. Além disso, como aplicação dos teoremas de comparação do Laplaciano, descrevemos a prova do Teorema de Comparação de Bishop-Gromov para variedades Kähler; obtemos uma estimativa para o primeiro autovalor λ1(M) do Laplaciano, isto é, λ1(M) ≤ m2 = λ1(CHm); e mostramos que o volume de variedades Kähler, com curvatura bisseccional limitada inferiormente por 1, é limitado pelo volume de CPm. Os resultados citados acima foram provados em 2005 por Li e Wang no artigo Comparison Theorem for Kähler Manifolds and Positivity of Spectrum , publicado no Journal of Differential Geometry. Geometria de variedades Variedade Käler Curvatura bisseccional holomorfa Espaço hiperbólico complexo Espaço projetivo complexo Laplaciano - Autovalor Geometry of manifolds Käler manifold Holomorphic bisectional curvature Complex hyperbolic space Complex projective space Laplacian - Eigenvalue
30	Resultados do tipo Calabi-Bernstein em −R × Hn. / Calabi-Bernstein type results in -R × Hn. LIMA JÚNIOR, Eraldo Almeida. 25 July 2018 (has links) Submitted by Johnny Rodrigues (johnnyrodrigues@ufcg.edu.br) on 2018-07-25T19:25:58Z No. of bitstreams: 1 ERALDO ALMEIDA LIMA JÚNIOR - DISSERTAÇÃO PPGMAT 2011..pdf: 415901 bytes, checksum: 427abfdae7c5a546735d4a6b14f72bfe (MD5) / Made available in DSpace on 2018-07-25T19:25:58Z (GMT). No. of bitstreams: 1 ERALDO ALMEIDA LIMA JÚNIOR - DISSERTAÇÃO PPGMAT 2011..pdf: 415901 bytes, checksum: 427abfdae7c5a546735d4a6b14f72bfe (MD5) Previous issue date: 2011-07 / Neste trabalho, apresentamos um estudo das hipersuperfícies tipo-espaço imersas no ambiente −R × Hn, exibindo condições para que tais hipersuperfícies sejam slices {t0}×Hn. Para uma melhor compreensão das demonstrações e dos resultados, inserimos processos de diferenciação, cálculos de gradientes e Laplacianos que, juntamente com o princípio do máximo de Omori-Yau, foram cruciais no desenvolvimento dos resultados que, em sua maioria são do tipo Bernstein. Também incluímos um resultado do tipo Calabi. / In this work we present a study of the spacelike hypersurfaces immersed in the manifold −R × Hn providing suﬃcient conditions for such hypersurfaces be slices, {t0}×Hn. For a better understanding of the proofs and results, we have added differentiation processes, gradient computations and Laplacians which jointly with the Omori-Yau Maximum Principle were crucial in the developing of the results whose are mostly Bernstein-type. In the elapsing we also included Calabi-type results. Matemática Variedades Lorentzianas Hipersuperfícies tipo-espaço Curvatura média Gráficos inteiros Espaço hiperbólico Lorentzian manifolds Spacelike hypersurfaces Mean curvature Entire graphs Hyperbolic space Variedades semi-Riemannianas Métricas em variedades diferenciáveis

Search results