Global ETD Search

11	Matrizes aleatórias no ensemble / Random matrices in the B Ensemble Gabriel Marinello de Souza Santos 14 August 2014 (has links) O estudo de matrizes aleatórias na física tradicionalmente ocorre no contexto dos modelos de Wigner e na estatística por modelos de Wishart, que se conectam através do threefold way de Dyson para matrizes aleatórias reais, complexas e de quaternios indexadas respectivamente pelo índice B = 1; 2; 4 de Dyson. Estudos recentes mostraram o caminho para que estes modelos fossem generalizados para valores reais de B, permitindo o estudo de ensembles com índice arbitrário. Neste trabalho, estudamos as propriedades estatísticas destes sistemas e exploramos a física subjacente nos modelos de Wigner e Wishart e investigamos, através de cálculos numéricos, os efeitos de localização nos modelos de geral. Também introduzimos quebras na simetria desta nova forma e estudamos numericamente os resultados da estatística dos sistemas perturbados. / The study of random matrices in physics has traditionally occurred in the context of Wigner models and in statistics by Wishart models, which are connected through Dyson\'s threefold way for real, complex and quaternion random matrices index by the Dyson _ = 1; 2; 4 index, respectively. Recent studies have shown the way by which these models are generalized for real values of _, allowing for the study the ensembles with arbitrary index. In this work, we study the statistical properties of these systems and explore the underlying physics in Wigner\'s and Wishart\'s models through and investigate through numerical calculations the e_ects of localization in general _ models. We also introduce symmetry breaks in this new form and study numerically the results of the statistics of the disturbed systems. Estítica de níveis Mecânica estatística quântica Mecânica quântica Teoria de matrizes aleatórias Termodinâmica Level statistics Quantum mechanics Quantum statistical mechanics Random matrix theory Thermodynamics
12	Efeitos da aperiodicidade sobre as transições quânticas em cadeias XY / Effects of aperiodicity on the quantum transitions in XY chains Fleury Jose de Oliveira Filho 08 April 2011 (has links) Neste trabalho realizo uma adaptação do método de Ma, Dasgupta e Hu para o estudo e caracterização das transições de fase quânticas, induzidas por um campo transverso, em cadeias XY de spins 1/2, unidimensionais e aperiódicas, no espírito da adaptação correspondente para cadeias XXZ. O presente trabalho determina de forma analítica uma série de expoentes críticos associados às transições ferro-paramagnéticas do sistema, e dá pistas quanto à natureza das estruturas presentes no estado fundamental. Os resultados são então testados pelo emprego da técnica de férmions livres, da análise de nite size scaling e, no limite de Ising, de resultados extraídos do mapeamento do problema em uma caminhada aleatória. / We employ an adaptation of the Ma, Dasgupta, Hu method in order to analyze the quantum phase transition, induced by a transversal magnetic eld, at spin-1/2 aperiodic XY chains, in analogy to the corresponding adaptation for XXZ chains. We derive analytical expressions for some cri tical exponents related with the ferro-paramagnetic transitions, and shed light onto the nature of the ground state structures. The main results obtained by this approach were tested by the free-fermion method, nite-size scaling analyses and, at the Ising limit of the model, by using results derived from a mapping to a random-walk problem. 1. Mecânica Estatística Quântica 2. Modelo XY 3. Sistemas Aperiódicos 4. Transições de Fase Quânticas. 1. Quantum Statistical Mechanics 2. XY Model 3. Aperiodic Systems 4. Quantum Phase Transitions.
13	Sólitons a temperatura finita: correções quânticas e térmicas à massa / Solitons at finite temperature: quantum and thermal corrections to the mass. Luana Perez França 03 September 2014 (has links) Sólitons são soluções clássicas de equações de campos não lineares, que possuem energia finita e densidade de energia localizada. Eles constituem pacotes de energia que se movem de maneira uniforme e não dispersiva, assemelhando-se a partículas estendidas. Quando se estuda um sistema à temperatura finita é possível tecer um paralelo entre a teoria quântica de campos e a mecânica estatística. Neste trabalho calculamos, na aproximação de um laço, a correção quântica à massa do kink do modelo 4 acoplado a um campo fermiônico. As contribuições bosônica e fermiônica são calculadas à temperatura zero e o comportamento das flutuações a temperatura finita também é analisado. / Solitons are classical solutions of non-linear field equations, that have finite energy and localised energy density. They constitute non-dispersive localised packages of energy moving uniformly, resembling extended particles. When studying a system at finite temperature one can make an analogy between quantum field theory and statistical mechanics. In this work we calculate, in one loop approximation, the quantum correction to the mass of the kink of the model 4 coupled to a fermionic field. The bosonic and fermionic contributions are calculated at zero temperature and the behavior of the finite temperature fluctuations are also analysed.
14	Isothermal quantum dynamics: Investigations for the harmonic oscillator Mentrup, Detlef 26 May 2003 (has links) Thermostated time evolutions are on a firm ground and widely used in classical molecular dynamics (MD) simulations. Hamilton´s equations of motion are supplemented by time-dependent pseudofriction terms that convert the microcanonical isoenergetic time evolution into a canonical isothermal time evolution, thus permitting the calculation of canonical ensemble averages by time averaging. However, similar methods for quantum MD schemes are still lacking. Given the rich dynamical behavior of ultracold trapped quantum gases depending on the value of the s-wave scattering length, it is timely to investigate how classical thermostating methods can be combined with powerful approximate quantum dynamics schemes to deal with interacting quantum systems at finite temperature. In this work, the popular method of Nose and Hoover to create canonically distributed positions and momenta in classical MD simulations is generalized to a genuine quantum system of infinite dimensionality. We show that for the quantum harmonic oscillator, the equations of motion in terms of coherent states may be modified in a Nose-Hoover manner to mimic the coupling of the system to a thermal bath and create a quantum canonical ensemble. The method is developed initially for a single particle and then generalized to the case of an arbitrary number of identical quantum particles, involving entangled distribution functions. The resulting isothermal equations of motion for bosons and fermions contain additional terms leading to Bose-attraction and Pauli-blocking, respectively. Questions of ergodicity are discussed for different coupling schemes. In the many-particle case, the superiority of the Nose-Hoover technique to a Langevin approach is demonstrated. In addition, the work contains an investigation of the Grilli-Tosatti thermostating method applied to the harmonic oscillator, and calculations for quantum wavefunctions moving with a time-invariant shape in a harmonic potential. Quantum statistics Canonical ensemble Ergodic behaviour Nose-Hoover Thermostat Quantum Molecular Dynamics Mixed quantum-classical system 29 - Physik, Astronomie 05.30.-d - Quantum statistical mechanics 05.30.Ch - Quantum ensemble theory ddc:540
15	Application of Projection Operator Techniques to Transport Investigations in Closed Quantum Systems Steinigeweg, Robin 28 August 2008 (has links) The work at hand presents a novel approach to transport in closed quantum systems. To this end a method is introduced which is essentially based on projection operator techniques, in particular on the time-convolutionless (TCL) technique. The projection onto local densities of quantities such as energy, magnetization, particles, etc. yields the reduced dynamics of the respective quantities in terms of a systematic perturbation expansion. Especially, the lowest order contribution of this expansion is used as a strategy for the analysis of transport in "modular" quantum systems. The term modular basically corresponds to (quasi-) one-dimensional structures consisting of identical or at least similar many-level subunits. Modular quantum systems are demonstrated to represent many physical situations and several examples are given. In the context of these quantum systems lowest order TCL is shown as an efficient tool which also allows to investigate the dependence of transport on the considered length scale. In addition an estimation for the validity range of lowest order TCL is derived. As a first application a "design" model is considered for which a complete characterization of all available transport types as well as the transitions to each other is possible. For this model the relationship to quantum chaos and the validity of the Kubo formula is further discussed. As an example for a "real" system the Anderson model is finally analyzed. The results are partially verified by the numerical solution of the full time-dependent Schroedinger equation which is obtained by exact diagonalization or approximative integrators. quantum transport diffusion projection operator techniques quantum chaos Kubo formula Anderson model 29 - Physik, Astronomie 05.60.Gg - Quantum transport 05.30.-d - Quantum statistical mechanics 72.15.Rn - Localization effects ddc:530

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