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  • About
  • The Global ETD Search service is a free service for researchers to find electronic theses and dissertations. This service is provided by the Networked Digital Library of Theses and Dissertations.
    Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
1

Analytic representation of quantum systems

Eissa, Hend Abdelgader January 2016 (has links)
Finite quantum systems with d-dimension Hilbert space, where position x and momentum p take values in Zd(the integers modulo d) are studied. An analytic representation of finite quantum systems, using Theta function is considered. The analytic function has exactly d zeros. The d paths of these zeros on the torus describe the time evolution of the systems. The calculation of these paths of zeros, is studied. The concepts of path multiplicity, and path winding number, are introduced. Special cases where two paths join together, are also considered. A periodic system which has the displacement operator to real power t, as time evolution is also studied. The Bargmann analytic representation for infinite dimension systems, with variables in R, is also studied. Mittag-Leffler function are used as examples of Bargmann function with arbitrary order of growth. The zeros of polynomial approximations of the Mittag-Leffler function are studied.
2

Analytic representation of quantum systems

Eissa, Hend A. January 2016 (has links)
Finite quantum systems with d-dimension Hilbert space, where position x and momentum p take values in Zd(the integers modulo d) are studied. An analytic representation of finite quantum systems, using Theta function is considered. The analytic function has exactly d zeros. The d paths of these zeros on the torus describe the time evolution of the systems. The calculation of these paths of zeros, is studied. The concepts of path multiplicity, and path winding number, are introduced. Special cases where two paths join together, are also considered. A periodic system which has the displacement operator to real power t, as time evolution is also studied. The Bargmann analytic representation for infinite dimension systems, with variables in R, is also studied. Mittag-Leffler function are used as examples of Bargmann function with arbitrary order of growth. The zeros of polynomial approximations of the Mittag-Leffler function are studied. / Libyan Cultural Affairs
3

Analytic representations with theta functions for systems on ℤ(d) and on 𝕊.

Evangelides, Pavlos, Lei, Ci, Vourdas, Apostolos 13 July 2015 (has links)
Yes / An analytic representation with Theta functions on a torus, for systems with variables in ℤ(d), is considered. Another analytic representation with Theta functions on a strip, for systems with positions in a circle S and momenta in Z, is also considered. The reproducing kernel formalism for these two systems is studied. Wigner and Weyl functions in this language, are also studied.
4

Analyse p-adique et complétés unitaires universels pour GL₂(F) / p-adic analysis and universal unitary completion for GL₂(F)

De Ieso, Marco 11 December 2012 (has links)
Soit p un nombre premier. Les résultats de cette thèse s'inscrivent dans le cadre du programme de Langlands p-adique. Lorsque V est une représentation p-adique de dimension 2 du groupe Gal(\bar{Qp}/Qp), on sait lui associer une représentation p-adique continue B(V) de GL₂(Qp). Si F est une extension finie non triviale de Qp, la question d'associer des représentations p-adiques de GL₂(F) aux représentations p-adiques de dimension 2 de Gal(\bar{Qp}/F) dans l'esprit d'une correspondance locale à la Langlands s'annonce beaucoup plus délicate. Dans ce texte, nous considérons des espaces de Banach p-adiques, munis d'une action linéaire continue de GL₂(F), qui sont des complétions unitaires universelles de certaines représentations localement Qp-analytiques de GL₂(F). Celles-ci sont susceptibles de jouer un rôle important dans une éventuelle correspondance de Langlands locale p-adique pour GL₂(F). Le résultat principal de cette thèse est démontré dans le Chapitre 3 et généralise des résultats antérieurs de Berger et Breuil. Il consiste en une description explicite de ces complétés unitaires universels à l'aide des fonctions continues sur F d'un certain type. Pour ce faire, nous introduisons dans le Chapitre 2 des espaces de Banach de fonctions de classe C^r, où r est un nombre rationnel positif, et leurs espaces duaux de distributions d'ordre r. Nous construisons une base de Banach et nous donnons un critère de prolongement des formes linéaires définies sur un espace de fonctions localement Qp-polynomiales en distributions d'ordre r. Ce faisant, nous généralisons des résultats classiques dus à Amice-Vélu et Vishik. Dans le Chapitre 4, nous exhibons des cas de non nullité pour les complétions unitaires universelles considérées par construction explicite de réseaux invariants. Cela donne de nouveaux cas de la conjecture proposée par Breuil et Schneider sur l'équivalence entre l'existence de normes invariantes sur certaines représentations localement algébriques de GL_d(F) et l'existence de certaines représentations de de Rham de Gal(\bar{Qp}/F). / Let p be a prime. The subject of this thesis is the p-adic Langlands correspondence. If V is a p-adic representation of dimension 2 of the group Gal(\bar{Qp}/Qp), it is known how to associate to it a continuous p-adic representation B(V) of GL₂(Qp). If F is a non-trivial finite extension of Qp, the issue of associating p-adic representations of GL₂(F) to p-adic representations of dimension 2 of Gal(\bar{Qp}/F) in the spirit of a local Langlands correspondence appears much more delicate. In this text we consider a class of p-adic Banach spaces, endowed with a continuous linear action of GL₂(F), which are obtained as universal unitary completions of certain locally Qp-analytic representations of GL₂(F). Such representations are likely to play an important role in a future local p-adic Langlands correspondence for GL₂(F). The main result of this thesis is proved in Chapter 3 and generalizes some previous results of Berger and Breuil. It consists in an explicit description of these universal unitary completions by means of a certain class of continuous functions on F. In order to do this, we introduce in Chapter 2 a class of Banach spaces of functions of class C^r, where r is a positive rational number, as well as their dual spaces of distributions of order r. We build a Banach base and we give a criterion for telling when a linear form defined on a space of locally Qp-polynomial functions extends to a distribution of order r. As a consequence, we generalize some classical results due to Amice-Vélu and Vishik. In Chapter 4 we exhibit cases of non-nullity for these universal unitary completions, by an explicit construction of invariant lattices. This also provides new instances of the Breuil-Schneider conjecture about the equivalence between the existence of invariant norms on certain locally algebraic representations of GL_d(F) and the existence of certain De Rham representations of Gal(\bar{Qp}/F).
5

Formes modulaires p-adiques sur les courbes de Shimura unitaires et compatibilité local-global / P-adic modular forms over unitary Shimura curves and local-global compatibility

Ding, Yiwen 19 March 2015 (has links)
Cette thèse s'inscrit dans le cadre du programme de Langlands local p-adique. Soient L une extension finie de Q_p, \rho_L une représentation p-adique de dimension 2 du groupe de Galois Gal(\overline{Q_p}/L) de L, lorsque \rho_L provient d'une représentation \rho globale et modulaire (i.e. \rho apparaît dans la cohomologie étale des courbes de Shimura), on sait associer à \rho une représentation de Banach admissible de \GL_2(L), notée \widehat{\Pi}(\rho), en utilisant la théorie de la cohomologie étale complétée d'Emerton. Localement, lorsque \rho_L est cristalline (et assez générique), d'après Breuil, on sait associer à \rho_L une représentation localement analytique de \GL_2(L), notée \Pi(\rho_L). Dans cette thèse, on montre divers résultats sur la compatibilité entre les représentations \widehat{\Pi}(\rho) et \Pi(\rho_L), qui s'appelle la compatibilité local-global, dans la cas des courbes de Shimura unitaires. Par la théorie des représentations localement analytiques de \GL_2(L), le problème de compatibilité local-global se ramène à l'étude des variétés de Hecke X construites à partir du H^1-complété des courbes de Shimura unitaires. On montre des résultats sur la compatibilité local-global dans le cas non-critique en utilisant la théorie de la triangulation globale. On étudie ainsi les formes modulaires p-adiques sur les courbes de Shimura unitaires, à partir desquelles on peut construire des sous-espaces rigides de X à la manière de Coleman-Mazur. On montre l'existence des formes compagnons surconvergentes sur les courbes de Shimura unitaires en utilisant les théorèmes de comparaison p-adique, d'où on déduit des résultats sur la compatibilité local-global dans le cas critique. / The subject of this thesis is in the p-adic Langlands programme. Let L be a finite extension of \Q_p, \rho_L a 2-dimensional p-adic representation of the Galois group \Gal(\overline{\Q_p}/L) of L, if \rho_L is the restriction of a global modular Galois representation \rho (i.e. \rho appears in the étale cohomology of Shimura curves), one can associate to \rho an admissible Banach representation \widehat{\Pi}(\rho) of \GL_2(L) by using Emerton's completed cohomology theory. Locally, if \rho_L is crystalline (and sufficiently generic), following Breuil, one can associate to \rho_L a locally analytic representation \Pi(\rho_L) of \GL_2(L). In this thesis, we prove results on the compatibility of \widehat{\Pi}(\rho) and \Pi(\rho_L), called local-global compatibility, in the unitary Shimura curves case. By locally analytic representations theory (for \GL_2(L)), the problem of local-global compatibility can be reduced to the study of eigenvarieties X constructed from the completed H^1 of unitary Shimura curves. We prove results on local-global compatibility in non-critical case by using global triangulation theory. We also study the p-adic modular forms over unitary Shimura curves, from which we construct some closed rigid subspaces of X by Coleman-Mazur's method. We prove the existence of overconvergent companion forms (over unitary Shimura curves) by using p-adic comparison theorems, from which we deduce some results on local-global compatibility in critical case.

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