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31	Transformation de Aluthge et vecteurs extrémaux / Aluthge Transform and Extremal Vectors Verliat, Jérôme 21 December 2010 (has links) Cette thèse s'articule autour de deux thèmes : une transformation de B(H) introduite par Aluthge et la méthode d'Ansari-Enflo. La première partie fait l'objet de l'étude de la transformation d’Aluthge qui a eu un impact important ces dernières années en théorie des opérateurs. Des résultats optimaux sur la stabilité d'un certain nombre de classes d'opérateurs, telles que la classe des isométries partielles et les classes associées au comportement asymptotique d'un opérateur, sont fournis. Nous étudions également l'évolution d'invariants opératoriels, tels que le polynôme minimal, la fonction minimum, l'ascente et la descente, sous l'action de la transformation ; nous comparons plus précisément les suites des noyaux et images relatives aux itérés d'un opérateur et de sa transformée de Aluthge. La deuxième partie est l'occasion d'étudier la théorie d'Ansari-Enflo, qui a permis de gros progrès pour le problème du sous-espace hyper-invariant. Nous développons plus particulièrement la notion fondatrice de la méthode, celle de vecteur extrémal. La localisation et une nouvelle caractérisation de ces vecteurs sont données. Leur régularité et leur robustesse, au regard de différents paramètres, sont éprouvées. Enfin, nous comparons les vecteurs extrémaux d'un shift à poids et ceux associés à sa transformée d’Aluthge. Cette étude aboutit à la construction d'une suite de vecteurs extrémaux associés aux itérés de la transformation d’Aluthge, pour laquelle certaines propriétés sont mises en évidence. / This thesis is based on two topics : a transformation of B(H) introduced by Aluthge and the Ansari-Enflo method. In the first part, we study the Aluthge transformation which really had an impact on operator theory in the past ten years. Some optimal results about stability for several operators classes, such as isometries class and classes of operators defined by their asymptotic behaviour, are given. We also study changes generated by Aluthge transform about some usual tools in operator theory like minimum polynomial, minimum function, ascent and descent ; precisely, we compare iterated kernels and iterated ranges sequences related to an operator and to its Aluthge transform. The second part is devoted to the study of the Ansari-Enflo theory, which allowed to make progress in the hyper-invariant subspace problem. We develop the notion of extremal vectors which is the fundamental point of the theory. We clarify their spatial localization and a new caracterisation for these vectors is given. Regularity and robustness with regard to different parameters are tried and tested. Finally, we compare extremal vectors associated with weighted shifts and the one corresponding to their Aluthge transform. This study leads to build a sequence of extremal vectors associated with the iterated Aluthge transform, for which we highlight several properties. Transformation de Aluthge Méthode d'Ansari-Enflo Vecteur extrêmal Vecteur minimal Shift à poids Isométrie partielle Co-isométrie Opérateur stable C0, C1, Ascente Descente Polynôme minimal Fonction minimum Pseudoinverse de Moore-Penrose Aluthge transform Extremal vector Minimal vector Weighted shift Partial isometry Co-isometry Stable operator C0, Asymptotically non-vanishing C1, Ascent Descent Minimal polynomial Minimum function Moore-Penrose pseudo-inverse 510
32	Rough Isometries of Order Lattices and Groups / Grobe Isometrien von Ordnungsverbänden und Gruppen Lochmann, Andreas 06 August 2009 (has links) No description available. 510 Mathematik Mathematics and Computer Science grobe Isometrie metrischer Verband Kommensurabilität Quasi-Isometrie Lipschitzfunktion rough isometry metric lattice commensurability quasi-isometry Lipschitz function 31.59 31.11 31.21 EAGB 990: None of the above EAGC 100: Semimodular lattices complemented lattices}
33	On some results of analysis in metric spaces and fuzzy metric spaces Aphane, Maggie 12 1900 (has links) The notion of a fuzzy metric space due to George and Veeramani has many advantages in analysis since many notions and results from classical metric space theory can be extended and generalized to the setting of fuzzy metric spaces, for instance: the notion of completeness, completion of spaces as well as extension of maps. The layout of the dissertation is as follows: Chapter 1 provide the necessary background in the context of metric spaces, while chapter 2 presents some concepts and results from classical metric spaces in the setting of fuzzy metric spaces. In chapter 3 we continue with the study of fuzzy metric spaces, among others we show that: the product of two complete fuzzy metric spaces is also a complete fuzzy metric space. Our main contribution is in chapter 4. We introduce the concept of a standard fuzzy pseudo metric space and present some results on fuzzy metric identification. Furthermore, we discuss some properties of t-nonexpansive maps. / Mathematical Sciences / M. Sc. (Mathematics) Metric space Cauchy sequence Compactness Precompactness Completeness Continuity Uniform continuity Isometry Uniform convergence Seperable Nested Closed sets Diameter Pseudo metric space Fuzzy metric space Standard fuzzy metric space Fuzzy pseudo metric space Metric identification Fuzzy metric identification Nonexpansive map t-nonexpansive map t-uniformly continuous map t-isometry map Quotient map Quotient topology Quotient space Natural map Topological space 514.325 Metric spaces Fuzzy topology
34	Contributions to the geometry of Lorentzian manifolds with special holonomy Schliebner, Daniel 02 April 2015 (has links) In dieser Arbeit studieren wir Lorentz-Mannigfaltigkeiten mit spezieller Holonomie, d.h. ihre Holonomiedarstellung wirkt schwach-irreduzibel aber nicht irreduzibel. Aufgrund der schwachen Irreduzibilität lässt die Darstellung einen ausgearteten Unterraum invariant und damit also auch eine lichtartige Linie. Geometrisch hat dies zur Folge, dass wir zwei parallele Unterbündel (die Linie und ihr orthogonales Komplement) des Tangentialbündels erhalten. Diese Arbeit nutzt diese und weitere Objekte um zu beweisen, dass kompakte Lorentzmannigfaltigkeiten mit Abelscher Holonomie geodätisch vollständig sind. Zudem werden Lorentzmannigfaltigkeiten mit spezieller Holonomie und nicht-negativer Ricci-Krümung auf den Blättern der Blätterung, induziert durch das orthogonale Komplement der parellelen Linie, und maximaler erster Bettizahl untersucht. Schließlich werden vollständige Ricci-flache Lorentzmannigfaltigkeiten mit vorgegebener voller Holonomie konstruiert. / In the present thesis we study dimensional Lorentzian manifolds with special holonomy, i.e. such that their holonomy representation acts indecomposably but non-irreducibly. Being indecomposable, their holonomy group leaves invariant a degenerate subspace and thus a light-like line. Geometrically, this means that, since being holonomy invariant, this line gives rise to parallel subbundles of the tangent bundle. The thesis uses these and other objects to prove that Lorentian manifolds with Abelian holonomy are geodesically complete. Moreover, we study Lorentzian manifolds with special holonomy and non-negative Ricci curvature on the leaves of the foliation induced by the orthogonal complement of the parallel light-like line whose first Betti number is maximal. Finally, we provide examples of geodesically complete and Ricci-flat Lorentzian manifolds with special holonomy and prescribed full holonomy group. Holonomie Lorentz-Mannigfaltigkeiten Betti Zahlen geodätische Vollständigkeit spezielle Holonomie pp-Wellen Ricci-Flachheit Isometriegruppen Bochner-Technik Lorentzian manifolds holonomy groups Betti number geodesic completeness special holonomy pp-waves Ricci-flatness isometry group Bochner technique 510 Mathematik 27 Mathematik ddc:510
35	Versões não-lineares do teorema clássico de Banach-Stone / Coarse versions of the classical Banach-Stone theorem Silva, André Luis Porto da 20 February 2015 (has links) No presente trabalho apresentamos dois teoremas obtidos por Gorak em 2011, que são generalizações para o Teorema de Banach-Stone, envolvendo uma classe de funções não-necessariamente lineares, denominadas quasi-isometrias. / In this work we present two theorems proved by Gorak in 2011. These results are generalizations of the Banach-Stone Theorem envolving a class of not-necessarily linear functions, called quasi-isometries. Banach-Stone theorem C_0(X) spaces Distância-malha Espaços C_0(X) Net distance Nonlinear geometry of Banach spaces Quasi isometry. Quasi-isometria Teorema de Banach-Stone
36	Versões não-lineares do teorema clássico de Banach-Stone / Coarse versions of the classical Banach-Stone theorem André Luis Porto da Silva 20 February 2015 (has links) No presente trabalho apresentamos dois teoremas obtidos por Gorak em 2011, que são generalizações para o Teorema de Banach-Stone, envolvendo uma classe de funções não-necessariamente lineares, denominadas quasi-isometrias. / In this work we present two theorems proved by Gorak in 2011. These results are generalizations of the Banach-Stone Theorem envolving a class of not-necessarily linear functions, called quasi-isometries. Distância-malha Espaços C_0(X) Quasi-isometria Teorema de Banach-Stone Banach-Stone theorem C_0(X) spaces Net distance Nonlinear geometry of Banach spaces Quasi isometry.
37	Généralisations du Théorème d'Extension de MacWilliams / Generalizations of the MacWilliams Extension Theorem Dyshko, Serhii 15 December 2016 (has links) Le fameux Théorème d’Extension de MacWilliams affirme que, pour les codes classiques, toute isométrie deHamming linéaire d'un code linéaire se prolonge en une application monomiale. Cependant, pour les codeslinéaires sur les alphabets de module, l'existence d'un analogue du théorème d'extension n'est pas garantie.Autrement dit, il existe des codes linéaires sur certains alphabets de module dont les isométries de Hammingne sont pas toujours extensibles. Il en est de même pour un contexte plus général d'un alphabet de module munid'une fonction de poids arbitraire. Dans la présente thèse, nous prouvons des analogues du théorèmed'extension pour des codes construits sur des alphabets et fonctions de poids arbitraires. La propriétéd'extension est analysée notamment pour les codes de petite longueur sur un alphabet de module de matrices,les codes MDS généraux, ou encore les codes sur un alphabet de module muni de la composition de poidssymétrisée. Indépendamment de ce sujet, une classification des deux groupes des isométries des codescombinatoires est donnée. Les techniques développées dans la thèse sont prolongées aux cas des codesstabilisateurs quantiques et aux codes de Gabidulin dans le cadre de la métrique rang. / The famous MacWilliams Extension Theorem states that for classical codes each linear Hamming isometry ofa linear code extends to a monomial map. However, for linear codes over module alphabets an analogue of theextension theorem does not always exist. That is, there may exists a linear code over a module alphabet with anunextendable Hamming isometry. The same holds in a more general context of a module alphabet equippedwith a general weight function. Analogues of the extension theorem for different classes of codes, alphabetsand weights are proven in the present thesis. For instance, extension properties of the following codes arestudied: short codes over a matrix module alphabet, maximum distance separable codes, codes over a modulealphabet equipped with the symmetrized weight composition. As a separate result, a classification of twoisometry groups of combinatorial codes is given. The thesis also contains applications of the developedtechniques to quantum stabilizer codes and Gabidulin codes. Théorème d'extension de MacWilliams Isométrie de Hamming Codes sur alphabets de module Fonction de poids arbitraire Application monomiale Code additif Code quantique MacWilliams Extension Theorem Hamming isometry Code over a module alphabet General weights Monomial map Additive code Quantum code
38	Grundläggande hyperbolisk geometri / Elements of Hyperbolic Geometry Persson, Anna January 2006 (has links) <p>I denna uppsats presenteras grundläggande delar av hyperbolisk geometri. Uppsatsen är indelad i två kapitel. I första kapitlet studeras Möbiusavbildningar på Riemannsfären. Andra kapitlet presenterar modellen av hyperbolisk geometri i övre halvplanet H, skapad av Poincaré på 1880-talet.</p><p>Huvudresultatet i uppsatsen är Gauss – Bonnét´s sats för hyperboliska trianglar.</p> / <p>In this thesis we present fundamental concepts in hyperbolic geometry. The thesis is divided into two chapters. In the first chapter we study Möbiustransformations on the Riemann sphere. The second part of the thesis deal with hyperbolic geometry in the upper half-plane. This model of hyperbolic geometry was created by Poincaré in 1880.</p><p>The main result of the thesis is Gauss – Bonnét´s theorem for hyperbolic triangles.</p> Hyperbolic Geometry Möbius transformation Gauss-Bonnét Geodetic line isometry rotation translation cross-ratio hyperbolic arclength Hyperbolisk geometri Möbiusavbildningar Gauss-Bonnét geodetisk linje isometri rotation translation anharmoniskt förhållande hyperbolisk båglängd MATHEMATICS MATEMATIK
39	Grundläggande hyperbolisk geometri / Elements of Hyperbolic Geometry Persson, Anna January 2006 (has links) I denna uppsats presenteras grundläggande delar av hyperbolisk geometri. Uppsatsen är indelad i två kapitel. I första kapitlet studeras Möbiusavbildningar på Riemannsfären. Andra kapitlet presenterar modellen av hyperbolisk geometri i övre halvplanet H, skapad av Poincaré på 1880-talet. Huvudresultatet i uppsatsen är Gauss – Bonnét´s sats för hyperboliska trianglar. / In this thesis we present fundamental concepts in hyperbolic geometry. The thesis is divided into two chapters. In the first chapter we study Möbiustransformations on the Riemann sphere. The second part of the thesis deal with hyperbolic geometry in the upper half-plane. This model of hyperbolic geometry was created by Poincaré in 1880. The main result of the thesis is Gauss – Bonnét´s theorem for hyperbolic triangles. Hyperbolic Geometry Möbius transformation Gauss-Bonnét Geodetic line isometry rotation translation cross-ratio hyperbolic arclength Hyperbolisk geometri Möbiusavbildningar Gauss-Bonnét geodetisk linje isometri rotation translation anharmoniskt förhållande hyperbolisk båglängd MATHEMATICS MATEMATIK
40	Constrained measurement systems of low-dimensional signals Yap, Han Lun 20 December 2012 (has links) The object of this thesis is the study of constrained measurement systems of signals having low-dimensional structure using analytic tools from Compressed Sensing (CS). Realistic measurement systems usually have architectural constraints that make them differ from their idealized, well-studied counterparts. Nonetheless, these measurement systems can exploit structure in the signals that they measure. Signals considered in this research have low-dimensional structure and can be broken down into two types: static or dynamic. Static signals are either sparse in a specified basis or lying on a low-dimensional manifold (called manifold-modeled signals). Dynamic signals, exemplified as states of a dynamical system, either lie on a low-dimensional manifold or have converged onto a low-dimensional attractor. In CS, the Restricted Isometry Property (RIP) of a measurement system ensures that distances between all signals of a certain sparsity are preserved. This stable embedding ensures that sparse signals can be distinguished one from another by their measurements and therefore be robustly recovered. Moreover, signal-processing and data-inference algorithms can be performed directly on the measurements instead of requiring a prior signal recovery step. Taking inspiration from the RIP, this research analyzes conditions on realistic, constrained measurement systems (of the signals described above) such that they are stable embeddings of the signals that they measure. Specifically, this thesis focuses on four different types of measurement systems. First, we study the concentration of measure and the RIP of random block diagonal matrices that represent measurement systems constrained to make local measurements. Second, we study the stable embedding of manifold-modeled signals by existing CS matrices. The third part of this thesis deals with measurement systems of dynamical systems that produce time series observations. While Takens' embedding result ensures that this time series output can be an embedding of the dynamical systems' states, our research establishes that a stronger stable embedding result is possible under certain conditions. The final part of this thesis is the application of CS ideas to the study of the short-term memory of neural networks. In particular, we show that the nodes of a recurrent neural network can be a stable embedding of sparse input sequences. Compressed sensing Manifold embeddings Stable embeddings Concentration of measure Restricted isometry property Recurrent neural networks Short-term memory Takens' embedding Signal processing Mathematical optimization Detectors Remote sensing Data compression (Computer science)

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