Global ETD Search

31	Normal Spectrum of a Subnormal Operator Kumar, Sumit January 2013 (has links) (PDF) Let H be a separable Hilbert space over the complex field. The class S := {N\|M : N is normal on H and M is an invariant subspace for Ng of subnormal operators. This notion was introduced by Halmos. The minimal normal extension Ň of a subnormal operator S was introduced by σ (S) and then Bram proved that Halmos. Halmos proved that σ(Ň) (S) is obtained by filling certain number of holes in the spectrum (Ň) of the minimal normal extension Ň of a subnormal operator S. Let σ (S) := σ (Ň) be the spectrum of the minimal normal extension Ň of S; which is called the normal spectrum of a subnormal operator S: This notion is due to Abrahamse and Douglas. We give several well-known characterization of subnormality. Let C* (S1) and C* (S2) be the C- algebras generated by S1 and S2 respectively, where S1 and S2 are bounded operators on H: Next we give a characterization for subnormality which is purely C - algebraic. We also establish an intrinsic characterization of the normal spectrum for a subnormal operator, which enables us to answer the fol-lowing two questions. Let II be a - representation from C* (S1) onto C* (S2) such that II(S1) = S2. If S1 is subnormal, then does it follow that S2 is subnormal? What is the relation between σ (S1) and σ (S2)? The first question was asked by Bram and second was asked by Abrahamse and Douglas. Answers to these questions were given by Bunce and Deddens. Hilbert Spaces Subnormal Operators Linear Operators Operator Theory Subnormal Operators - Normal Spectrum Quasinormal Operator Subnormality Inequalities C*-algebra Mathematics
32	Forte et fausse libertés asymptotiques de grandes matrices aléatoires / Strong and false asymptotic freeness of large random matrices Male, Camille 05 December 2011 (has links) Cette thèse s'inscrit dans la théorie des matrices aléatoires, à l'intersection avec la théorie des probabilités libres et des algèbres d'opérateurs. Elle s'insère dans une démarche générale qui a fait ses preuves ces dernières décennies : importer les techniques et les concepts de la théorie des probabilités non commutatives pour l'étude du spectre de grandes matrices aléatoires. On s'intéresse ici à des généralisations du théorème de liberté asymptotique de Voiculescu. Dans les Chapitres 1 et 2, nous montrons des résultats de liberté asymptotique forte pour des matrices gaussiennes, unitaires aléatoires et déterministes. Dans les Chapitres 3 et 4, nous introduisons la notion de fausse liberté asymptotique pour des matrices déterministes et certaines matrices hermitiennes à entrées sous diagonales indépendantes, interpolant les modèles de matrices de Wigner et de Lévy. / The thesis fits into the random matrix theory, in intersection with free probability and operator algebra. It is part of a general approach which is common since the last decades: using tools and concepts of non commutative probability in order to get general results about the spectrum of large random matrices. Where are interested here in generalization of Voiculescu's asymptotic freeness theorem. In Chapter 1 and 2, we show some results of strong asymptotic freeness for gaussian, random unitary and deterministic matrices. In Chapter 3 and 4, we introduce the notion of asymptotic false freeness for deterministic matrices and certain random matrices, Hermitian with independent sub-diagonal entries, interpolating Wigner and Lévy models. Théorie des matrices aléatoires Probabilités libres Liberté asymptotique C-* algèbre Théorie spectrale des graphes Graphes aléatoires Random matrix theory Free probability Asymptotic freeness C-* algebra Random matrix theory Spectral graph theory
33	Twisted K-theory with coefficients in a C-algebra and obstructions against positive scalar curvature metrics / Getwistete K-Theorie mit Koeffizienten in einer C-Algebra und Obstruktionen gegen positive skalare Krümmung Pennig, Ulrich 31 August 2009 (has links) No description available. 510 Mathematik Mathematics and Computer Science getwistete K-Theorie Indextheorie positive Skalarkrümmung C-Algebra Hilbert C-Moduln twisted K-theory index theory positive scalar curvature C* algebra Hilbert C* modules 31.61 EDCQ 100: Positive curvature manifolds
34	A classification of localizing subcategories by relative homological algebra Nadareishvili, George 16 October 2015 (has links) No description available. 510 C-algebra Kasparov category homological algebra triangulated category non-commutative topology filtrations of C-algebras C*-algebras over a topological space localizing subcategory localising subcategory Bivariant K-theory Filtrated K-theory relative homological algebra bootstrap class KK-theory ring of upper triangular matrices Mathematics (PPN61756535X)
35	Die lokale Struktur von T-Dualitätstripeln / The Local Structure of T-Duality Triples Schneider, Ansgar 05 November 2007 (has links) No description available. 510 Mathematik Mathematics and Computer Science T-Dualität T-Dualitätstripel C-Algebren C-dynamische Systeme verschränkte Produkte T-duality T-duality triples C-algebras C-dynamical systems crossed products 31.35 31.69 EEGL 890: Other &#34 noncommutative&#34

Page generated in 0.0245 seconds