Generalized EMP and Nonlinear Schrodinger-type Reformulations of Some Scaler Field Cosmological Models

D'Ambroise, Jennie

01 May 2010

We show that Einstein’s gravitational field equations for the Friedmann- Robertson-Lemaître-Walker (FRLW) and for two conformal versions of the Bianchi I and Bianchi V perfect fluid scalar field cosmological models, can be equivalently reformulated in terms of a single equation of either generalized Ermakov-Milne- Pinney (EMP) or (non)linear Schrödinger (NLS) type. This work generalizes or presents an alternative to similar reformulations published by the authors who inspired this thesis: R. Hawkins, J. Lidsey, T. Christodoulakis, T. Grammenos, C. Helias, P. Kevrekidis, G. Papadopoulos and F.Williams. In particular we cast much of these authors’ works into a single framework via straightforward derivations of the EMP and NLS equations from a simple linear combination of the relevant Einstein equations. By rewriting the resulting expression in terms of the volume expansion factor and performing a change of variables, we obtain an uncoupled EMP or NLS equation that is independent of the imposition of additional conservation equations. Since the correspondences shown here present an alternative route for obtaining exact solutions to Einstein’s equations, we reconstruct many known exact solutions via their EMP or NLS counterparts and show by numerical analysis the stability properties of many solutions.

Bianchi I and V

Einstein field equations

Ermakov-Milne-Pinney equation

Friedmann-Lemaitre-Robertson-Walker

Perfect fluid

Schrodinger equation

Mathematics

Statistics and Probability

Nonlinear waves in weakly-coupled lattices

Sakovich, Anton

04 1900

<p>We consider existence and stability of breather solutions to discrete nonlinear Schrodinger (dNLS) and discrete Klein-Gordon (dKG) equations near the anti-continuum limit, the limit of the zero coupling constant. For sufficiently small coupling, discrete breathers can be uniquely extended from the anti-continuum limit where they consist of periodic oscillations on excited sites separated by "holes" (sites at rest).</p> <p>In the anti-continuum limit, the dNLS equation linearized about its discrete breather has a spectrum consisting of the zero eigenvalue of finite multiplicity and purely imaginary eigenvalues of infinite multiplicities. Splitting of the zero eigenvalue into stable and unstable eigenvalues near the anti-continuum limit was examined in the literature earlier. The eigenvalues of infinite multiplicity split into bands of continuous spectrum, which, as observed in numerical experiments, may in turn produce internal modes, additional eigenvalues on the imaginary axis. Using resolvent analysis and perturbation methods, we prove that no internal modes bifurcate from the continuous spectrum of the dNLS equation with small coupling.</p> <p>Linear stability of small-amplitude discrete breathers in the weakly-coupled KG lattice was considered in a number of papers. Most of these papers, however, do not consider stability of discrete breathers which have "holes" in the anti-continuum limit. We use perturbation methods for Floquet multipliers and analysis of tail-to-tail interactions between excited sites to develop a general criterion on linear stability of multi-site breathers in the KG lattice near the anti-continuum limit. Our criterion is not restricted to small-amplitude oscillations and it allows discrete breathers to have "holes" in the anti-continuum limit.</p> / Doctor of Philosophy (PhD)

nonliner lattices

discrete nonlinear Schrodinger equation

Klein-Gordon lattice

nonlinear waves

discrete breathers

discrete solitons

Non-linear Dynamics

Partial Differential Equations

Non-linear Dynamics

The Calderón problem for connections

Cekić, Mihajlo

January 2017

This thesis is concerned with the inverse problem of determining a unitary connection $A$ on a Hermitian vector bundle $E$ of rank $m$ over a compact Riemannian manifold $(M, g)$ from the Dirichlet-to-Neumann (DN) map $\Lambda_A$ of the associated connection Laplacian $d_A^*d_A$. The connection is to be determined up to a unitary gauge equivalence equal to the identity at the boundary. In our first approach to the problem, we restrict our attention to conformally transversally anisotropic (cylindrical) manifolds $M \Subset \mathbb{R}\times M_0$. Our strategy can be described as follows: we construct the special Complex Geometric Optics solutions oscillating in the vertical direction, that concentrate near geodesics and use their density in an integral identity to reduce the problem to a suitable $X$-ray transform on $M_0$. The construction is based on our proof of existence of Gaussian Beams on $M_0$, which are a family of smooth approximate solutions to $d_A^*d_Au = 0$ depending on a parameter $\tau \in \mathbb{R}$, bounded in $L^2$ norm and concentrating in measure along geodesics when $\tau \to \infty$, whereas the small remainder (that makes the solution exact) can be shown to exist by using suitable Carleman estimates. In the case $m = 1$, we prove the recovery of the connection given the injectivity of the $X$-ray transform on $0$ and $1$-forms on $M_0$. For $m > 1$ and $M_0$ simple we reduce the problem to a certain two dimensional $\textit{new non-abelian ray transform}$. In our second approach, we assume that the connection $A$ is a $\textit{Yang-Mills connection}$ and no additional assumption on $M$. We construct a global gauge for $A$ (possibly singular at some points) that ties well with the DN map and in which the Yang-Mills equations become elliptic. By using the unique continuation property for elliptic systems and the fact that the singular set is suitably small, we are able to propagate the gauges globally. For the case $m = 1$ we are able to reconstruct the connection, whereas for $m > 1$ we are forced to make the technical assumption that $(M, g)$ is analytic in order to prove the recovery. Finally, in both approaches we are using the vital fact that is proved in this work: $\Lambda_A$ is a pseudodifferential operator of order $1$ acting on sections of $E|_{\partial M}$, whose full symbol determines the full Taylor expansion of $A$ at the boundary.

515

Erwin Schrödinger: a compreensão do mundo infinitesimal através de uma realidade ondulatória

Schmidt, Douglas Guilherme

15 September 2008

Made available in DSpace on 2016-04-28T14:16:34Z (GMT). No. of bitstreams: 1 Douglas Guilherme Schmidt.pdf: 995968 bytes, checksum: 1a8192151fc433a54ec422f421249ac4 (MD5) Previous issue date: 2008-09-15 / Secretaria da Educação do Estado de São Paulo / This historical research analyses the initial period of construction of wave mechanics, as propounded by the Austrian physicist Erwin Schrödinger (1887- 1961), emphasizing his work from December 1925 to February 1926. During these months Schrödinger created the basis of his quantum theory and wrote his two earlier papers on this subject. They were published in the Annalen der Physik. The present dissertation analyses those two papers, and some of their precedents and immediate consequences. Special attention is given to the influence of the theory of matter waves of the French physicist Louis de Broglie (1892-1987) upon the development of Schrödinger s theory, as well as other works and relevant circumstances that contributed to the creation of wave mechanics. The dissertation also discusses the interpretation given by Schrödinger to his own theory, comparing it to the approach of other physicists of that time / O presente trabalho histórico investiga a fase inicial da construção da mecânica ondulatória formulada pelo físico austríaco Erwin Schrödinger (1887- 1961), dando especial atenção aos trabalhos por ele realizados de dezembro de 1925 até fevereiro de 1926. Nesse período, Schrödinger concebeu as bases de sua teoria quântica e redigiu os dois primeiros artigos sobre o assunto, publicados na revista Annalen der Physik. Esta dissertação analisa esses dois artigos, bem como alguns de seus precedentes e repercussões. É analisada em especial a influência da teoria de ondas de matéria do físico francês Louis de Broglie (1892- 1987) no desenvolvimento da teoria de Schrödinger, bem como outros trabalhos e circunstâncias importantes que contribuíram para a elaboração da mecânica ondulatória. Discute-se também a interpretação que o próprio Schrödinger deu à sua teoria, comparando-a com o enfoque adotado por outros físicos da época

Mecânica ondulatória

Equação de onda de Schrödinger

Quantização

Função de onda

Física quântica

Ondas mecanicas

Mecanica quantica

Wave mechanics

Schrödinger wave equation

Quantization

Wave function

Quantum physics

Quantum mechanics

Simulation moléculaire et effets d'environnement. Une perspective mathématique et numérique

Cancès, Eric

07 December 1998

CETTE THESE RASSEMBLE DIVERSES CONTRIBUTIONS MATHEMATIQUES ET NUMERIQUES A LA CHIMIE QUANTIQUE. LE CHAPITRE 1 EST CONSACRE A UNE PRESENTATION DE L'ESPRIT ET DES MODELES DE LA CHIMIE QUANTIQUE. LE CHAPITRE 2 TRAITE DE LA CONVERGENCE D'ALGORITHMES POUR LA RESOLUTION DES EQUATIONS DE HARTREE-FOCK. LES CHAPITRES SUIVANTS PORTENT SUR DES PROBLEMES SPECIFIQUES AUX SYSTEMES MOLECULAIRES IN SITU, C'EST-A-DIRE EN INTERACTION AVEC UN ENVIRONNEMENT EXTERIEUR. UNE PREMIERE APPROCHE POUR SIMULER LES EFFETS D'ENVIRONNEMENT CONSISTE A TRAITER L'INTERACTION ENTRE LE SYSTEME MOLECULAIRE ET LE MILIEU EXTERIEUR COMME UNE PERTURBATION. AU CHAPITRE 3, ON ETEND LA THEORIE DES PERTURBATIONS DES OPERATEURS LINEAIRES AU CADRE NON LINEAIRE DU MODELE DE HARTREE-FOCK. L'INTERACTION D'UN SYSTEME MOLECULAIRE AVEC UN ENVIRONNEMENT EST SOUVENT UN PROCESSUS DYNAMIQUE. C'EST LE CAS BIEN EVIDEMMENT DES QU'ON ETUDIE UNE REACTION CHIMIQUE. LE CHAPITRE 4 CONSISTE EN L'ANALYSE MATHEMATIQUE D'UNE DES APPROXIMATIONS DE L'EQUATION DE SCHODINGER DEPENDANT DU TEMPS QUI DECRIT LA DYNAMIQUE DU SYSTEME : LE MODELE DE HARTREE-FOCK NON ADIABATIQUE. LA QUASI-TOTALITE DES REACTIONS CHIMIQUES INTERESSANT L'INDUSTRIE OU LES SCIENCES DE LA VIE SE DEROULENT EN PHASE LIQUIDE, OU LES EFFETS DE SOLVANTS JOUENT UN ROLE DETERMINANT. LES CHAPITRES 5, 6 ET 7 CONCERNENT LA RESOLUTION NUMERIQUE DES MODELES DE CONTINUUM QUI SONT LES MODELES DE SOLVATATION OFFRANT A L'HEURE ACTUELLE LE MEILLEUR COMPROMIS ENTRE QUALITE DES RESULTATS ET TEMPS DE CALCUL.

[MATH] Mathematics

[SDV] Life Sciences

physique

physique atomique

physique moléculaire

étude théorique

méthode numérique

chimie quantique

calcul Hartree fock

équation Schrodinger

continuum

force intermoléculaire

solvatation

technique perturbation

méthode intégrale

convergence méthode numérique

Electron Dynamics in Finite Quantum Systems

McDonald, Christopher

12 September 2013

The multiconfiguration time-dependent Hartree-Fock (MCTDHF) and multiconfiguration time-dependent Hartree (MCTDH) methods are employed to investigate nonperturbative multielectron dynamics in finite quantum systems. MCTDHF is a powerful tool that allows for the investigation of multielectron dynamics in strongly perturbed quantum systems. We have developed an MCTDHF code that is capable of treating problems involving three dimensional (3D) atoms and molecules exposed to strong laser fields. This code will allow for the theoretical treatment of multielectron phenomena in attosecond science that were previously inaccessible. These problems include complex ionization processes in pump-probe experiments on noble gas atoms, the nonlinear effects that have been observed in Ne atoms in the presence of an x-ray free-electron laser (XFEL) and the molecular rearrangement of cations after ionization. An implementation of MCTDH that is optimized for two electrons, each moving in two dimensions (2D), is also presented. This implementation of MCTDH allows for the efficient treatment of 2D spin-free systems involving two electrons; however, it does not scale well to 3D or to systems containing more that two electrons. Both MCTDHF and MCTDH were used to treat 2D problems in nanophysics and attosecond science. MCTDHF is used to investigate plasmon dynamics and the quantum breathing mode for several electrons in finite lateral quantum dots. MCTDHF is also used to study the effects of manipulating the potential of a double lateral quantum dot containing two electrons; applications to quantum computing are discussed. MCTDH is used to examine a diatomic model molecular system exposed to a strong laser field; nonsequential double ionization and high harmonic generation are studied and new processes identified and explained. An implementation of MCTDHF is developed for nonuniform tensor product grids; this will allow for the full 3D implementation of MCTDHF and will provide a means to investigate a wide variety of problems that cannot be currently treated by any other method. Finally, the time it takes for an electron to tunnel from a bound state is investigated; a definition of the tunnel time is established and the Keldysh time is connected to the wavefunction dynamics.

Electron dynamics

Nonsequential double ionization

high harmonic generation

quantum dots

Time-dependent Schrodinger equation

multielectron systems

nonperturbative dynamics

Tunnel time

MCTDHF

Multiconfiguation time-dependent Hartree

MCTDH

Information Transmission using the Nonlinear Fourier Transform

Isvand Yousefi, Mansoor

20 March 2013

The central objective of this thesis is to suggest and develop one simple, unified method for communication over optical fiber networks, valid for all values of dispersion and nonlinearity parameters, and for a single-user channel or a multiple-user network. The method is based on the nonlinear Fourier transform (NFT), a powerful tool in soliton theory and exactly solvable models for solving integrable partial differential equations governing wave propagation in certain nonlinear media. The NFT decorrelates signal degrees of freedom in such models, in much the same way that the Fourier transform does for linear systems. In this thesis, this observation is exploited for data transmission over integrable channels such as optical fibers, where pulse propagation is governed by the nonlinear Schr\"odinger (NLS) equation. In this transmission scheme, which can be viewed as a nonlinear analogue of orthogonal frequency-division multiplexing commonly used in linear channels, information is encoded in the nonlinear spectrum of the signal. Just as the (ordinary) Fourier transform converts a linear convolutional channel into a number of parallel scalar channels, the nonlinear Fourier transform converts a nonlinear dispersive channel described by a \emph{Lax convolution} into a number of parallel scalar channels. Since, in the spectral coordinates the NLS equation is multiplicative, users of a network can operate in independent nonlinear frequency bands with no deterministic inter-channel interference. Unlike most other fiber-optic transmission schemes, this technique deals with both dispersion and nonlinearity directly and unconditionally without the need for dispersion or nonlinearity compensation methods. This thesis lays the foundations of such a nonlinear frequency-division multiplexing system.

Communication theory

Information theory

Optical fiber communication

Nonlinear dispersive waves

Nonlinear Fourier transform

Integrable systems

Channel capacity

Solitons

Nonlinear Schrodinger equation

Interference channel

Fiber-optic

0544

Information Transmission using the Nonlinear Fourier Transform

Isvand Yousefi, Mansoor

20 March 2013

The central objective of this thesis is to suggest and develop one simple, unified method for communication over optical fiber networks, valid for all values of dispersion and nonlinearity parameters, and for a single-user channel or a multiple-user network. The method is based on the nonlinear Fourier transform (NFT), a powerful tool in soliton theory and exactly solvable models for solving integrable partial differential equations governing wave propagation in certain nonlinear media. The NFT decorrelates signal degrees of freedom in such models, in much the same way that the Fourier transform does for linear systems. In this thesis, this observation is exploited for data transmission over integrable channels such as optical fibers, where pulse propagation is governed by the nonlinear Schr\"odinger (NLS) equation. In this transmission scheme, which can be viewed as a nonlinear analogue of orthogonal frequency-division multiplexing commonly used in linear channels, information is encoded in the nonlinear spectrum of the signal. Just as the (ordinary) Fourier transform converts a linear convolutional channel into a number of parallel scalar channels, the nonlinear Fourier transform converts a nonlinear dispersive channel described by a \emph{Lax convolution} into a number of parallel scalar channels. Since, in the spectral coordinates the NLS equation is multiplicative, users of a network can operate in independent nonlinear frequency bands with no deterministic inter-channel interference. Unlike most other fiber-optic transmission schemes, this technique deals with both dispersion and nonlinearity directly and unconditionally without the need for dispersion or nonlinearity compensation methods. This thesis lays the foundations of such a nonlinear frequency-division multiplexing system.

Communication theory

Information theory

Optical fiber communication

Nonlinear dispersive waves

Nonlinear Fourier transform

Integrable systems

Channel capacity

Solitons

Nonlinear Schrodinger equation

Interference channel

Fiber-optic

0544

[en] QUASIPERIODICITY AND THE POSITIVITY OF LYAPUNOV EXPONENTS / [pt] QUASE PERIODICIDADE E A POSITIVIDADE DOS EXPOENTES DE LYAPUNOV

LUCAS BARBOSA GAMA

11 January 2019

[pt] O teorema de Benedicks e Carleson afirma que para a família quadrática existe um conjunto de parâmetros, com medida positiva, para os quais o expoente de Lyapunov é positivo no ponto crítico. Nesta dissertação apresentamos uma demonstração rigorosa e detalhada desse célebre resultado. Uma parte importante da demonstração é o estudo do comportamento quase periódico de um conjunto de órbitas. Além disso, um argumento de grandes desvios é utilizado para mostrar que os parâmetros que não satisfazem a propriedade desejada formam um conjunto pequeno. Tais técnicas apresentam um interesse intrínseco, já que têm se mostrado muito proveitosas para o estudo de outros problemas em sistemas dinâmicos. Combinando o teorema de Benedicks e Carleson ao teorema de Singer, conclui-se que para um conjunto de parâmetros com medida positiva, a função quadrática correspondente não admite atratores periódicos, indicando um comportamento caótico. Neste trabalho, também são estudados critérios para a positividade do expoente de Lyapunov de cociclos quase periódicos de Schrodinger, como o teorema de Herman. O estudo de cociclos de Schrodinger representa um importante tópico na área de física matemática. Mais ainda, algumas das generalizações de tais critérios utilizam as técnicas de Benedicks-Carleson. / [en] The Benedicks and Carleson theorem states that for the quadratic family there exists a set of parameters, with positive measure, for which the Lyapunov exponent is positive at the critical point. In this dissertation we present a rigorous and detailed proof of this famous result. An important part of the proof is the study of the quasi periodic behavior of a set of orbits. In addition, a large deviation argument is used to show that parameters which do not satisfy the desired property form a small set. Such techniques have an intrinsic interest, as they have proven fruitful in the study of other problems in dynamical systems. Combining Benedicks-Carlesons theorem with Singers theorem, we conclude that for a set of parameters with positive measure, the corresponding quadratic function does not admit periodic attractors, indicating its chaotic behavior. In this work we also study criteria for the positivity of the Lyapunov exponent of quasi-periodic Schrodinger cocycles, such as Hermans theorem. The study of the Schrodinger cocycles represents an important topic in mathematical physics. Moreover, some of the generalizations of such criteria use the techniques of Benedicks-Carleson.

[pt] A FAMILIA QUADRATICA

[en] THE QUADRATIC FAMILY

[pt] O TEOREMA DE SINGER

[en] SINGER S THEOREM

[pt] O TEOREMA DE BENEDICKS-CARLESON

[en] BENEDICKS-CARLESON S THEOREM

[pt] EXPOENTES DE LYAPUNOV

[en] LYAPUNOV EXPONENTS

[pt] GRANDES DESVIOS

[en] LARGE DEVIATIONS

[en] QUASI-PERIODIC SCHRUDINGER COCYCLES

Propriedades estáticas e dinâmicas de sistemas fortemente correlacionados

Ramos, Flávia Braga

17 February 2017

FAPEMIG - Fundação de Amparo a Pesquisa do Estado de Minas Gerais / Neste trabalho, investigamos propriedades estáticas e dinâmicas de sistemas fortemente correlacionados quase-unidimensionais. A principal técnica utilizada no estudo de tais sistemas foi o grupo de renormalização da matriz de densidade. Neste contexto, um dos sistemas que consideramos foram as escadas de Heisenberg de N pernas com spin-s. Para estas escadas, investigamos propriedades estáticas, tais como energia por sítio no limite termodinâmico e gap de spin. Em particular, verificamos a validade da conjectura de Haldane-Sénéchal-Sierra para o comportamento do gap de spin das escadas de Heisenberg. Ainda para sistemas com geometria de escadas, outro problema que analisamos foi a entropia de emaranhamento de escadas quânticas críticas. Neste caso, propusemos uma conjectura para o comportamento de escala desta entropia. A fim de verificar nossa conjectura, consideramos as escadas férmions livres, de Heisenberg e escadas de Ising quânticas. Por fim, investigamos o comportamento das correlações dinâmicas de sistemas fortemente correlacionados unidimensionais. Para este caso, apresentamos um estudo detalhado do comportamento assintótico das autocorrelações de spin dinâmicas no bulk e na borda de tais sistemas. / In this work, we investigated static and dynamical properties of quasi-one-dimensional strongly correlated systems. The main technique used in the study of such systems was the density matrix renormalization group. In this context, one of the systems that we considered were the spin-s N-leg Heisenberg ladders. For these ladders, we investigated static properties, such as the energy per site in the thermodynamic limit and the spin gap. In particular, we checked the validity of the Haldane-Sénéchal-Sierra's conjecture for the spin gap behavior of the Heisenberg ladders. Also for systems with ladders geometry, another problem that we analyzed was the entanglement entropy of quantum critical ladders. In this case, we proposed a conjecture for the scaling behavior of this entropy. In order to check our conjecture, we consider free fermions, Heisenberg ladders and quantum Ising ladders. Finally, we investigated the behavior of the dynamical correlations in one-dimensional strongly correlated systems. For this case, we presented a detailed study of the asymptotic behavior of the dynamical spin autocorrelations at the bulk and the boundary of such systems. / Tese (Doutorado)

CNPQ::CIENCIAS EXATAS E DA TERRA::FISICA

Física

Mecânica quântica

Schrodinger, Equação de

Sistemas abertos (Física)

Sistemas fortemente correlacionados

DMRG

Escadas quânticas

Entropia de emaranhamento

Correlações dinâmicas

Strongly correlated systems

DMRG

Quantum ladders

Entanglement entropy

Dynamical correlations