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171	Phase space methods in finite quantum systems. Hadhrami, Hilal Al January 2009 (has links) Quantum systems with finite Hilbert space where position x and momentum p take values in Z(d) (integers modulo d) are considered. Symplectic tranformations S(2¿,Z(p)) in ¿-partite finite quantum systems are studied and constructed explicitly. Examples of applying such simple method is given for the case of bi-partite and tri-partite systems. The quantum correlations between the sub-systems after applying these transformations are discussed and quantified using various methods. An extended phase-space x¿p¿X¿P where X, P ¿ Z(d) are position increment and momentum increment, is introduced. In this phase space the extended Wigner and Weyl functions are defined and their marginal properties are studied. The fourth order interference in the extended phase space is studied and verified using the extended Wigner function. It is seen that for both pure and mixed states the fourth order interference can be obtained. / Ministry of Higher Education, Sultanate of Oman Phase space methods Finite quantum systems Finite Hilbert space Symplectic tranformations Bi-partite and tri-partite systems Wigner function
172	L'invariant de Gromov-Witten Liu, Qing Zhe 02 1900 (has links) Ce mémoire revient sur l'invariant de Gromov-Witten dans le contexte de topologie symplectique. D'abord, on présente un survol des notions nécessaires de la topologie symplectique, qui inclut les espaces vectoriels symplectiques, les variétés symplectiques, les structures presque complexes et la première classe de Chern. Ensuite, on présente une définition de l'invariant de Gromov-Witten, qui utilise les courbes pseudoholomorphes, les espaces de modules ainsi que les applications d'évaluation. Finalement, on donne quelques exemples de calcul d'invariant à la fin de ce mémoire. / The present work reviews the Gromov-Witten invariant in the context of symplectic topology. First, we showcase the basic concepts required for the understanding of the matter, which includes symplectic vector spaces, symplectic manifolds, almost complex structures and the first Chern class. Then, we provide a definition of the Gromov-Witten invariant, after studying pseudoholomorphic curves, moduli spaces and evaluation maps. In the end, we present some examples of Gromov-Witten invariant calculations. Gromov-Witten invariant Gromov invariant Symplectic topology Topology Invariant de Gromov-Witten Invariant de Gromov Topologie symplectique Topologie
173	Towards Discretization by Piecewise Pseudoholomorphic Curves / Zur Diskretisierung durch stückweise pseudoholomorphe Kurven Bauer, David 27 January 2014 (has links) (PDF) This thesis comprises the study of two moduli spaces of piecewise J-holomorphic curves. The main scheme is to consider a subdivision of the 2-sphere into a collection of small domains and to study collections of J-holomorphic maps into a symplectic manifold. These maps are coupled by Lagrangian boundary conditions. The work can be seen as finding a 2-dimensional analogue of the finite-dimensional path space approximation by piecewise geodesics on a Riemannian manifold (Q,g). For a nice class of target manifolds we consider tangent bundles of Riemannian manifolds and symplectizations of unit tangent bundles. Via polarization they provide a rich set of Lagrangians which can be used to define appropriate boundary value problems for the J-holomorphic pieces. The work focuses on existence theory as a pre-stage to global questions such as combinatorial refinement and the quality of the approximation. The first moduli space of lifted type is defined on a triangulation of the 2-sphere and consists of disks in the tangent bundle whose boundary projects onto geodesic triangles. The second moduli space of punctured type is defined on a circle packing domain and consists of boundary punctured disks in the symplectization of the unit tangent bundle. Their boundary components map into single fibers and at punctures the disks converge to geodesics. The coupling boundary conditions are chosen such that the piecewise problem always is Fredholm of index zero and both moduli spaces only depend on discrete data. For both spaces existence results are established for the J-holomorphic pieces which hold true on a small scale. Each proof employs a version of the implicit function theorem in a different setting. Here the argument for the moduli space of punctured type is more subtle. It rests on a connection to tropical geometry discovered by T. Ekholm for 1-jet spaces. The boundary punctured disks are constructed in the vicinity of explicit Morse flow trees which correspond to the limiting objects under degeneration of the boundary condition. Pseudoholomorphe Kurven Symplektische Geometrie Tangentialbündel Endlich-dimensionale Approximation Diskretisierung Pseudoholomorphic Curves Symplectic Geometry Tangent Bundle Finite-dimensional approximation Discretization ddc:515 ddc:516
174	Aspects géométriques et intégrables des modèles de matrices aléatoires Marchal, Olivier 12 1900 (has links) Travail réalisé en cotutelle avec l'université Paris-Diderot et le Commissariat à l'Energie Atomique sous la direction de John Harnad et Bertrand Eynard. / Cette thèse traite des aspects géométriques et d'intégrabilité associés aux modèles de matrices aléatoires. Son but est de présenter diverses applications des modèles de matrices aléatoires allant de la géométrie algébrique aux équations aux dérivées partielles des systèmes intégrables. Ces différentes applications permettent en particulier de montrer en quoi les modèles de matrices possèdent une grande richesse d'un point de vue mathématique. Ainsi, cette thèse abordera d'abord l'étude de la jonction de deux intervalles du support de la densité des valeurs propres au voisinage d'un point singulier. On montrera plus précisément en quoi ce régime limite particulier aboutit aux équations universelles de la hiérarchie de Painlevé II des systèmes intégrables. Ensuite, l'approche des polynômes (bi)-orthogonaux, introduite par Mehta pour le calcul des fonctions de partition, permettra d'énoncer des problèmes de Riemann-Hilbert et d'isomonodromies associés aux modèles de matrices, faisant ainsi le lien avec la théorie de Jimbo-Miwa-Ueno. On montrera en particulier que le cas des modèles à deux matrices hermitiens se transpose à un cas dégénéré de la théorie isomonodromique de Jimbo-Miwa-Ueno qui sera alors généralisé. La méthode des équations de boucles avec ses notions centrales de courbe spectrale et de développement topologique permettra quant à elle de faire le lien avec les invariants symplectiques de géométrie algébrique introduits récemment par Eynard et Orantin. Ce dernier point fera également l'objet d'une généralisation aux modèles de matrices non-hermitien (beta quelconque) ouvrant ainsi la voie à la ``géométrie algébrique quantique'' et à la généralisation de ces invariants symplectiques pour des courbes ``quantiques''. Enfin, une dernière partie sera consacrée aux liens étroits entre les modèles de matrices et les problèmes de combinatoire. En particulier, l'accent sera mis sur les aspects géométriques de la théorie des cordes topologiques avec la construction explicite d'un modèle de matrices aléatoires donnant le dénombrement des invariants de Gromov-Witten pour les variétés de Calabi-Yau toriques de dimension complexe trois utilisées en théorie des cordes topologiques. L'étendue des domaines abordés étant très vaste, l'objectif de la thèse est de présenter de façon la plus simple possible chacun des domaines mentionnés précédemment et d'analyser en quoi les modèles de matrices peuvent apporter une aide précieuse dans leur résolution. Le fil conducteur étant les modèles matriciels, chaque partie a été conçue pour être abordable pour un spécialiste des modèles de matrices ne connaissant pas forcément tous les domaines d'application présentés ici. / This thesis deals with the geometric and integrable aspects associated with random matrix models. Its purpose is to provide various applications of random matrix theory, from algebraic geometry to partial differential equations of integrable systems. The variety of these applications shows why matrix models are important from a mathematical point of view. First, the thesis will focus on the study of the merging of two intervals of the eigenvalues density near a singular point. Specifically, we will show why this special limit gives universal equations from the Painlevé II hierarchy of integrable systems theory. Then, following the approach of (bi) orthogonal polynomials introduced by Mehta to compute partition functions, we will find Riemann-Hilbert and isomonodromic problems connected to matrix models, making the link with the theory of Jimbo, Miwa and Ueno. In particular, we will describe how the hermitian two-matrix models provide a degenerate case of Jimbo-Miwa-Ueno's theory that we will generalize in this context. Furthermore, the loop equations method, with its central notions of spectral curve and topological expansion, will lead to the symplectic invariants of algebraic geometry recently proposed by Eynard and Orantin. This last point will be generalized to the case of non-hermitian matrix models (arbitrary beta) paving the way to ``quantum algebraic geometry'' and to the generalization of symplectic invariants to ``quantum curves''. Finally, this set up will be applied to combinatorics in the context of topological string theory, with the explicit computation of an hermitian random matrix model enumerating the Gromov-Witten invariants of a toric Calabi-Yau threefold. Since the range of the applications encountered is large, we try to present every domain in a simple way and explain how random matrix models can bring new insights to those fields. The common element of the thesis being matrix models, each part has been written so that readers unfamiliar with the domains of application but familiar with matrix models should be able to understand it. géométrie algébrique algebraic geometry équations de boucles loop equations invariants symplectiques symplectic invariants théorie des cordes topologiques topological string theory isomonodromie isomonodromy polynomes orthogonaux orthogonal polynomials
175	Rabinowitz-Floer homology on Brieskorn manifolds Fauck, Alexander 19 May 2016 (has links) In dieser Dissertation werden Kontaktstrukturen auf beliebigen differenzierbaren Mannigfaltigkeiten ungerader Dimension untersucht. Dies geschiet vermöge der Rabinowitz-Floer-Homologie (RFH), welche 2009 von Cieliebak und Frauenfelder eingeführt wurde. Ein großer Teil der Arbeit widmet sich den technischen Problemen bei der Definition von RFH. Insbesondere wird die Transversalität für die benötigten Modulräume gezeigt. In einem weiteren Abschnitt wird bewiesen, dass RFH im wesentlichen invariant unter subkrittischer Henkelanklebung ist. Schließlich enthält die Arbeit die Berechnung von RFH für einige Brieskorn-Mannigfaltigkeiten. Die dabei gewonnenen Resultate werden dazu verwendet zu zeigen, dass es auf jeder Mannigfaltigkeit, welche füllbare Kontaktstukturen zulässt, entweder unendlich viele verschiedene füllbare Kontaktstrukturen gibt, oder eine Kontaktstruktur mit unendlich vielen verschiedenen Füllungen oder das für alle füllbaren Kontaktstrukturen die RFH von unendlicher Dimension ist für alle Grade. / This thesis considers fillable contact structures on odd-dimensional manifolds. For that purpose, Rabinowitz-Floer homology (RFH) is used which was introduced by Cieliebak and Frauenfelder in 2009. A major part of the thesis is devoted to technical problems in the definition of RFH. In particular, it is shown that the moduli spaces involved are cut out transversally. Moreover, it is proved that RFH is essentially invariant under subcritical handle attachment. Finally, RFH is calculated for some Brieskorn manifolds. The obtained results are then used to show for every manifold, which supports fillable contact structures, that there exist either infinitely many different fillable contact structures, or one contact structure with infinitely many different fillings or for every fillable contact structure holds that RFH is infinite dimensional in every degree. dynamische Systeme Kontaktgeometrie symplektische Geometrie Floer Homologie dynamical systems contact geometry symplectic geometry Floer homology 510 Mathematik 27 Mathematik SK 370 ddc:510
176	Mapas simpléticos com correntes reversas em tokamaks / Symplectic maps in tokamaks with reversed current Bartoloni, Bruno Figueiredo 19 October 2016 (has links) Desenvolvemos um modelo na forma de um mapeamento bidimensional simplético (conservativo) para estudar a evolução das linhas de campo magnético de um plasma confinado no interior de um tokamak. Na primeira parte, consideramos dois perfis estudados na literatura para a densidade de corrente no plasma: um monotônico e um não-monotônico, que dão origem a diferentes perfis analíticos do fator de segurança. Nas simulações, consideramos inicialmente o sistema no equilíbrio, onde observamos, nas seções de Poincaré, apenas linhas invariantes. Em seguida, adicionamos uma perturbação (corrente externa), onde observamos cadeias de ilhas e caos no sistema. Na segunda parte consideramos um perfil também não-monotônico, mas com uma região na qual a densidade de corrente no plasma torna-se negativa, estudo ainda em aberto na literatura, que causa uma divergência no perfil do fator de segurança. Mesmo considerando o sistema apenas no equilíbrio, surgiram cadeias de ilhas muito pequenas em torno de curvas sem shear e caos localizado no sistema, característica não verificada para os outros perfis estudados no equilíbrio. Variando parâmetros relacionados à expressão da densidade de corrente, conseguimos controlar o aparecimento de regiões com cadeias de ilhas em torno de curvas sem shear e regiões caóticas. Para comprovar os resultados, aplicamos o perfil considerado a um outro mapa simplético da literatura (tokamap). Na parte final, consideramos a configuração do perfil do fator de segurança na forma de um divertor. Nessa configuração também temos uma divergência na expressão do perfil do fator de segurança. Observamos características similares (cadeias de ilhas em torno de curvas sem shear e caos) quando consideramos o perfil não-monotônico com densidade de corrente reversa. / We develop a symplectic (conservative) bidimensional map to study the evolution of magnetic field lines of a confined plasma in a tokamak. First, we considered two profiles for the plasma current density, studied in the literature: monotonic and non-monotonic, which give rise to different profiles for the poloidal magnetic field and different analytical profiles for the safety factor. In our simulations, we consider the system initially at equilibrium, where we observe, in Poincaré sections, only invariant lines. Then, we add a perturbation (external current), where we observe island chains and chaos in the system. In the second part, we consider a non-monotonic profile, but with a region which the current density becomes negative, which causes a divergence in the safety factor profile. Even considering only the sistem at equilibrium, very small island chains appeared around the shearless curves, and localized chaos. This feature was not observed for the other profiles at equilibrium. We can control the appearance of the regions with island chaind around the shearless curves and chaotic regions, by variation of parameters related to the density current expression. To comprove our results, we aplly the same profile to the other symplectic map. Finally, we consider a safety factor profile in a divertor configuration. We also have a divergence on in the safety factor profile. We observe similar features (island chains around shearless curves and localized chaos) when we consider a non-monotonic safety factor profile with a reversed density current. cadeias de ilhas caos. chaos curvas sem shear densidade de corrente reversa fator de segurança island chains mapas simpléticos reversed current density safety factor shearless curves symplectic maps
177	Quelques propriétés symplectiques des variétés Kählériennes / Some symplectic properties of Kähler manifolds Vérine, Alexandre 28 September 2018 (has links) La géométrie symplectique et la géométrie complexe sont intimement liées, en particulier par les techniques asymptotiquement holomorphes de Donaldson et Auroux d'une part et par les travaux d’Eliashberget et Cieliebak sur la pseudoconvexité d'autre part. Les travaux présentés dans cette thèse sont motivés par ces deux liens. On donne d’abord la caractérisation symplectique suivante des constantes de Seshadri. Dans une variété complexe, la constante de Seshadri d’une classe de Kähler entière en un point est la borne supérieure des capacités de boules standard admettant, pour une certaine forme de Kähler dans cette classe, un plongement holomorphe et iso-Kähler de codimension 0 centré en ce point. Ce critère était connu de Eckl en 2014 ; on en donne une preuve différente. La deuxième partie est motivée par la question suivante de Donaldson : <<Toute sphère lagrangienne d'une variété projective complexe est-elle un cycle évanescent d'une déformation complexe vers une variété à singularité conique ?>> D'une part, on présente toute sous-variété lagrangienne close d’une variété symplectique/kählérienne close dont les périodes relatives sont entières comme lieu des minima d’une exhaustion <<convexe>> définie sur le complémentaire d'une section hyperplane symplectique/complexe. Dans le cadre kählérien, <<convexe>> signifie strictement plurisousharmonique tandis que dans le cadre symplectique, cela signifie de Lyapounov pour un champ de Liouville. D'autre part, on montre que toute sphère lagrangienne d'un domaine de Stein qui est le lieu des minima d’une fonction <<convexe>> est un cycle évanescent d'une déformation complexe sur le disque vers un domaine à singularité conique. / Symplectic geometry and complex geometry are closely related, in particular by Donaldson and Auroux’s asymptotically holomorphic techniques and by Eliashberg and Cieliebak’s work on pseudoconvexity. The work presented in this thesis is motivated by these two connections. We first give the following symplectic characterisation of Seshadri constants. In a complex manifold, the Seshadri constant of an integral Kähler class at a point is the upper bound on the capacities of standard balls admitting, for some Kähler form in this class, a codimension 0 holomorphic and iso-Kähler embedding centered at this point. This criterion was known by Eckl in 2014; we give a different proof of it. The second part is motivated by Donaldon’s following question: ‘Is every Lagrangian sphere of a complex projective manifold a vanishing cycle of a complex deformation to a variety with a conical singularity?’ On the one hand, we present every closed Lagrangian submanifold of a closed symplectic/Kähler manifold whose relative periods are integers as the lowest level set of a ‘convex’ exhaustion defined on the complement of a symplectic/complex hyperplane section. In the Kähler setting ‘complex’ means strictly plurisubharmonic while in the symplectic setting it refers to the existence of a Liouville pseudogradient. On the other hand, we prove that any Lagrangian sphere of a Stein domain which is the lowest level-set of a ‘convex’ function is a vanishing cycle of some complex deformation over the disc to a variety with a conical singularity. Fonctions plurisousharmoniques Domaines de Stein Cycles évanescents Cobordismes de Weinstein Sections hyperplanes Constantes de Seshadri Variétés symplectiques Plurisubharmonic functions Vanishing cycles Stein domains Weinstein cobordisms Hyperplane sections Seshadri constants Symplectic manifolds
178	Singularité et théorie de Lie / Singularity and Lie Theory Caradot, Antoine 14 June 2017 (has links) Soit Γ un sous-groupe fini de SU2(ℂ). Alors le quotient ℂ2/Γ peut être plongé dans ℂ3 sous la forme d'une surface munie d'une singularité isolée. Le quotient ℂ2/Γ est appelé singularité de Klein, d'après F. Klein qui fut le premier à les décrire en 1884. A travers leurs résolutions minimales, ces singularités ont un lien étroit avec les diagrammes de Dynkin simplement lacés de types Ar, Dr et Er. Dans les années 1970, E. Brieskorn et P. Slodowy ont tiré profit de cette connection pour décrire les résolutions et les déformations de ces singularités à l'aide de la théorie de Lie. En 1998 P. Slodowy et H. Cassens ont construit les déformations semiuniverselles des ℂ2/Γ à l'aide de la théorie des carquois ainsi que des travaux de P.B. Kronheimer en géométrie symplectique datant de 1989. En théorie de Lie, la classification des algèbres de Lie simples divisent ces dernières en deux classes: les algèbres de Lie de types Ar, Dr et Er qui sont simplement lacées, et celles de types Br, Cr, F4 et G2 appelées non-homogènes. A l'aide d'un second sous-groupe fini Γ' de SU2(ℂ) tel que Γ ⊲ Γ', P. Slodowy a étendu en 1978 la notion de singularité de Klein aux algèbres de Lie non-homogènes en ajoutant à ℂ2/Γ le groupe d'automorphismes Ω= Γ'/Γ du diagramme de Dynkin associé à la singularité. L'objectif de cette thèse est de généraliser la construction de H. Cassens et P. Slodowy à ces singularités de types Br, Cr, F4 et G2. Il en résultera des constructions explicites des déformations semiuniverselles de types inhomogènes sur les fibres desquelles le groupe Ω agit. Le passage au quotient d'une telle application révèle alors une déformation d'une singularité de type ℂ2/Γ' / Let Γ be a finite subgroup of SU2(ℂ). Then the quotient ℂ2/Γ can be embedded in ℂ3 as a surface with an isolated singularity. The quotient ℂ2/Γ is called a Kleinian singularity, after F. Klein who studied them first in 1884. Through their minimal resolutions, these singularities have a deep connection with simply-laced Dynkin diagrams of types Ar, Dr and Er. In the 1970's E. Brieskorn and P. Slodowy took advantage of this connection to describe the resolutions and deformations of these singularities in terms of Lie theory. In 1998 P. Slodowy and H. Cassens constructed the semiuniversal deformations of the Kleinian singularities using quiver theory and work from 1989 by P.B. Kronheimer on symplectic geometry. In Lie theory, the classification of simple Lie algebras allows for a separation in two classes: those simply-laced of types Ar, Dr and Er, and those of types Br, Cr, F4 and G2 called inhomogeneous. With the use of a second finite subgroup Γ’ of SU2(ℂ) such that Γ ⊲ Γ’, P. Slodowy extended in 1978 the definition of a Kleinian singularity to the inhomogeneous types by adding to ℂ2/Γ the group of automorphisms Ω= Γ’/Γ of the Dynkin diagram associated to the singularity. The purpose of this thesis is to generalize H. Cassens' and P. Slodowy's construction to the singularities of types Br, Cr, F4 and G2. It will lead to explicit semiuniversal deformations of inhomogeneous types on the fibers of which the group Ω acts. By quotienting such a map we obtain a deformation of a singularity ℂ2/Γ’ Systèmes de racines Folding Singularité simple Réduction symplectique Carquois Déformations de singularités Root systems Folding Simple singularity Symplectic reduction Quiver Deformations of singularities 512
179	[en] DELZANT S CONSTRUCTION FOR TORIC SYMPLECTIC MANIFOLDS / [pt] A CONSTRUÇÃO DE DELZANT PARA VARIEDADES TÓRICAS SIMPLÉTICAS SIMONE DE FREITAS DE SOUZA 04 February 2019 (has links) [pt] Em 1988, Delzant classificou as variedades compactas tóricas simpléticas por meio da imagem associada da aplicação momento. Como estabelecido pelo Teorema de Convexidade [Atiyah, Guillemin-Sternberg, 1983], a imagem pela aplicação momento de uma variedade compacta tórica simplética é um polítopo convexo. A construção de Delzant proporciona uma receita para formar, dado um polítopo de Delzant, uma variedade compacta tórica simplética. Nesta dissertação revisamos essa construção e estudamos alguns exemplos. / [en] In 1988, Delzant proved a classification Theorem of compact toric symplectic manifolds by means of their moment image. By the convexity Theorem [Atiyah, Guillemin-Sternberg, 1983] the moment image of a compact toric symplectic manifold is a convex polytope. Delzant s construction gives a recipe to construct, given a Delzant polytope, the corresponding compact toric symplectic manifold. This thesis describes this construction and studies in detail some examples. [pt] VARIEDADES TORICAS SIMPLETICAS [en] TORIC SYMPLECTIC MANIFOLDS [pt] CONSTRUCAO DE DELZANT [en] [pt] APLICACAO MOMENTO [en] MOMENT MAP [pt] POLITOPO DE DELZANT [en] DELZANT POLYTOPE [pt] TEOREMA DE CONVEXIDADE [en] CONVEXITY THEOREM
180	Application of Symplectic Integration on a Dynamical System Frazier, William 01 May 2017 (has links) Molecular Dynamics (MD) is the numerical simulation of a large system of interacting molecules, and one of the key components of a MD simulation is the numerical estimation of the solutions to a system of nonlinear differential equations. Such systems are very sensitive to discretization and round-off error, and correspondingly, standard techniques such as Runge-Kutta methods can lead to poor results. However, MD systems are conservative, which means that we can use Hamiltonian mechanics and symplectic transformations (also known as canonical transformations) in analyzing and approximating solutions. This is standard in MD applications, leading to numerical techniques known as symplectic integrators, and often, these techniques are developed for well-understood Hamiltonian systems such as Hill’s lunar equation. In this presentation, we explore how well symplectic techniques developed for well-understood systems (specifically, Hill’s Lunar equation) address discretization errors in MD systems which fail for one or more reasons. Lie algebra Lie group symplectic integration molecular dynamics Algebra Dynamic Systems Non-linear Dynamics Numerical Analysis and Computation

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