Um estudo sobre feixes intensos e não-contínuos de partículas carregadas / A study of intense bunched charged particle beams

Silva, Thales Marques Corrêa da

January 2016

Nesta tese, estudamos feixes intensos não-contínuos de partículas carregadas. Na primeira parte, analisamos um feixe com simetria esférica e a sua relaxação para um estado quase-estacionário. Por ser um sistema com interação de longo alcance, a evolução do feixe e dominado pela dinâmica de Vlasov-Maxwell. Mostramos que o mecanismo de relaxação e a ressonância entre o movimento coletivo e o individual de algumas partículas. Fazemos uma analogia entre a dinâmica de Vlasov e um gás de férmions para modelar o estado quase estacionário. Os parâmetros do modelo são calculados usando princípios básicos, como os de conservação de energia e de partículas no transporte. Os resultados quando comparados com simulação mostram uma boa concordância. Na segunda parte, verificamos a estabilidade do modo de oscilação simétrico para um feixe esférico. Argumentamos que, quando esse modo for estável, o modelo para o estado quase-estacionário pode descrever feixes levemente anisotrópicos, o que e uma situação mais realista em experimentos. Constatamos que, num regime de interesse prático, esse modo e sempre estável. Por fim, estudamos um caso em que as forças focalizadoras externas são anisotrópicas, e o feixe tem simetria elipsoidal. Mostramos que, para certos valores dos parâmetros, há um forte acoplamento entre a dinâmica não-linear dos envelopes, o que causa uma troca de energia entre os graus de liberdade. Os resultados quando comparados com dinâmica molecular mostraram uma boa concordância. / In this thesis, we study intense bunched charged particle beams. In the rst part, we analyze a beam with spherical symmetry and its relaxation to a stationary state. The beam evolution follows the Vlasov-Maxwell dynamics since it is a system of long range interaction. We show that the main mechanism for the beam relaxation is a resonance between the collective beam motion and individual particle motion. We make an analogy between Vlasov dynamics and a Fermi gas to model the beam quasistationary state. The parameters of the model are calculated using basic principles, such as energy and particle conservation in the beam transport. The results compared with simulation showed a good agreement. In the second part, we verify the symmetric oscillation mode stability for a spherical beam. We argue that when this mode is stable, our model for the quasistationary state can also describe slightly anisotropic beams, a situation more realistic in experiments. We nd out that in situations of practical interest the mode is always stable. Finally, we study a situation in which the external focusing forces are anisotropic, and the beam has ellipsoidal symmetry. We show that, for certain values of the parameters, there is a strong coupling between the nonlinear envelopes dynamics, which causes exchange of energy between the degrees of freedom. The results compared with molecular dynamics showed a good agreement.

Equacao de vlasov

Feixes de particulas

Campos magnéticos

Estabilidade de feixes

Intense bunched beams

Quasistationary state

Vlasov-Maxwell dynamics

Symmetric oscillation mode

Molecular dynamics

Development of analytical solutions for quasistationary electromagnetic fields for conducting spheroids in the proximity of current-carrying turns.

Jayasekara, Nandaka

04 January 2013

Exact analytical solutions for the quasistationary electromagnetic fields in the presence of conducting objects require the field solutions both internal and external to the conductors. Such solutions are limited for certain canonically shaped objects but are useful in testing the accuracy of various approximate models and numerical methods developed to solve complex problems related to real world conducting objects and in calibrating instruments designed to measure various field quantities. Theoretical investigations of quasistationary electromagnetic fields also aid in improving the understanding of the physical phenomena of electromagnetic induction. This thesis presents rigorous analytical expressions derived as benchmark solutions for the quasistationary field quantities both inside and outside, Joule losses and the electromagnetic forces acting upon a conducting spheroid placed in the proximity of a non-uniform field produced by current-carrying turns. These expressions are used to generate numerous numerical results of specified accuracy and selected results are presented in a normalized form for extended ranges of the spheroid axial ratio, the ratio of the depth of penetration to the semi-minor axis and the position of the inducing turns relative to the spheroids. They are intended to constitute reference data to be employed for comprehensive comparisons of results from approximate numerical methods or from boundary impedance models used for real world conductors. Approximate boundary conditions such as the simpler perfect electric conductor model or the Leontovich surface impedance boundary condition model can be used to obtain approximate solutions by only analyzing the field external to the conducting object. The range of validity of these impedance boundary condition models for the analysis of axisymmetric eddy-current problems is thoroughly investigated. While the simpler PEC model can be employed only when the electromagnetic depth of penetration is much smaller than the smallest local radius of curvature, the results obtained using the surface impedance boundary condition model for conducting prolate and oblate spheroids of various axial ratios are in good agreement with the exact results for skin depths of about 1/5 of the semi-minor axis when calculating electromagnetic forces and for skin depths less than 1/20 of the semi-minor axis when calculating Joule losses.

quasistationary electromagnetic fields

eddy currents

electromagnetic forces

Joule losses

perfect electric conductor

surface impedance boundary condition

skin depth

spheroidal wave functions

Development of analytical solutions for quasistationary electromagnetic fields for conducting spheroids in the proximity of current-carrying turns.

Jayasekara, Nandaka

04 January 2013

Exact analytical solutions for the quasistationary electromagnetic fields in the presence of conducting objects require the field solutions both internal and external to the conductors. Such solutions are limited for certain canonically shaped objects but are useful in testing the accuracy of various approximate models and numerical methods developed to solve complex problems related to real world conducting objects and in calibrating instruments designed to measure various field quantities. Theoretical investigations of quasistationary electromagnetic fields also aid in improving the understanding of the physical phenomena of electromagnetic induction. This thesis presents rigorous analytical expressions derived as benchmark solutions for the quasistationary field quantities both inside and outside, Joule losses and the electromagnetic forces acting upon a conducting spheroid placed in the proximity of a non-uniform field produced by current-carrying turns. These expressions are used to generate numerous numerical results of specified accuracy and selected results are presented in a normalized form for extended ranges of the spheroid axial ratio, the ratio of the depth of penetration to the semi-minor axis and the position of the inducing turns relative to the spheroids. They are intended to constitute reference data to be employed for comprehensive comparisons of results from approximate numerical methods or from boundary impedance models used for real world conductors. Approximate boundary conditions such as the simpler perfect electric conductor model or the Leontovich surface impedance boundary condition model can be used to obtain approximate solutions by only analyzing the field external to the conducting object. The range of validity of these impedance boundary condition models for the analysis of axisymmetric eddy-current problems is thoroughly investigated. While the simpler PEC model can be employed only when the electromagnetic depth of penetration is much smaller than the smallest local radius of curvature, the results obtained using the surface impedance boundary condition model for conducting prolate and oblate spheroids of various axial ratios are in good agreement with the exact results for skin depths of about 1/5 of the semi-minor axis when calculating electromagnetic forces and for skin depths less than 1/20 of the semi-minor axis when calculating Joule losses.

quasistationary electromagnetic fields

eddy currents

electromagnetic forces

Joule losses

perfect electric conductor

surface impedance boundary condition

skin depth

spheroidal wave functions

Um estudo sobre feixes intensos e não-contínuos de partículas carregadas / A study of intense bunched charged particle beams

Silva, Thales Marques Corrêa da

January 2016

Nesta tese, estudamos feixes intensos não-contínuos de partículas carregadas. Na primeira parte, analisamos um feixe com simetria esférica e a sua relaxação para um estado quase-estacionário. Por ser um sistema com interação de longo alcance, a evolução do feixe e dominado pela dinâmica de Vlasov-Maxwell. Mostramos que o mecanismo de relaxação e a ressonância entre o movimento coletivo e o individual de algumas partículas. Fazemos uma analogia entre a dinâmica de Vlasov e um gás de férmions para modelar o estado quase estacionário. Os parâmetros do modelo são calculados usando princípios básicos, como os de conservação de energia e de partículas no transporte. Os resultados quando comparados com simulação mostram uma boa concordância. Na segunda parte, verificamos a estabilidade do modo de oscilação simétrico para um feixe esférico. Argumentamos que, quando esse modo for estável, o modelo para o estado quase-estacionário pode descrever feixes levemente anisotrópicos, o que e uma situação mais realista em experimentos. Constatamos que, num regime de interesse prático, esse modo e sempre estável. Por fim, estudamos um caso em que as forças focalizadoras externas são anisotrópicas, e o feixe tem simetria elipsoidal. Mostramos que, para certos valores dos parâmetros, há um forte acoplamento entre a dinâmica não-linear dos envelopes, o que causa uma troca de energia entre os graus de liberdade. Os resultados quando comparados com dinâmica molecular mostraram uma boa concordância. / In this thesis, we study intense bunched charged particle beams. In the rst part, we analyze a beam with spherical symmetry and its relaxation to a stationary state. The beam evolution follows the Vlasov-Maxwell dynamics since it is a system of long range interaction. We show that the main mechanism for the beam relaxation is a resonance between the collective beam motion and individual particle motion. We make an analogy between Vlasov dynamics and a Fermi gas to model the beam quasistationary state. The parameters of the model are calculated using basic principles, such as energy and particle conservation in the beam transport. The results compared with simulation showed a good agreement. In the second part, we verify the symmetric oscillation mode stability for a spherical beam. We argue that when this mode is stable, our model for the quasistationary state can also describe slightly anisotropic beams, a situation more realistic in experiments. We nd out that in situations of practical interest the mode is always stable. Finally, we study a situation in which the external focusing forces are anisotropic, and the beam has ellipsoidal symmetry. We show that, for certain values of the parameters, there is a strong coupling between the nonlinear envelopes dynamics, which causes exchange of energy between the degrees of freedom. The results compared with molecular dynamics showed a good agreement.

Equacao de vlasov

Feixes de particulas

Campos magnéticos

Estabilidade de feixes

Intense bunched beams

Quasistationary state

Vlasov-Maxwell dynamics

Symmetric oscillation mode

Molecular dynamics

Um estudo sobre feixes intensos e não-contínuos de partículas carregadas / A study of intense bunched charged particle beams

Silva, Thales Marques Corrêa da

January 2016

Nesta tese, estudamos feixes intensos não-contínuos de partículas carregadas. Na primeira parte, analisamos um feixe com simetria esférica e a sua relaxação para um estado quase-estacionário. Por ser um sistema com interação de longo alcance, a evolução do feixe e dominado pela dinâmica de Vlasov-Maxwell. Mostramos que o mecanismo de relaxação e a ressonância entre o movimento coletivo e o individual de algumas partículas. Fazemos uma analogia entre a dinâmica de Vlasov e um gás de férmions para modelar o estado quase estacionário. Os parâmetros do modelo são calculados usando princípios básicos, como os de conservação de energia e de partículas no transporte. Os resultados quando comparados com simulação mostram uma boa concordância. Na segunda parte, verificamos a estabilidade do modo de oscilação simétrico para um feixe esférico. Argumentamos que, quando esse modo for estável, o modelo para o estado quase-estacionário pode descrever feixes levemente anisotrópicos, o que e uma situação mais realista em experimentos. Constatamos que, num regime de interesse prático, esse modo e sempre estável. Por fim, estudamos um caso em que as forças focalizadoras externas são anisotrópicas, e o feixe tem simetria elipsoidal. Mostramos que, para certos valores dos parâmetros, há um forte acoplamento entre a dinâmica não-linear dos envelopes, o que causa uma troca de energia entre os graus de liberdade. Os resultados quando comparados com dinâmica molecular mostraram uma boa concordância. / In this thesis, we study intense bunched charged particle beams. In the rst part, we analyze a beam with spherical symmetry and its relaxation to a stationary state. The beam evolution follows the Vlasov-Maxwell dynamics since it is a system of long range interaction. We show that the main mechanism for the beam relaxation is a resonance between the collective beam motion and individual particle motion. We make an analogy between Vlasov dynamics and a Fermi gas to model the beam quasistationary state. The parameters of the model are calculated using basic principles, such as energy and particle conservation in the beam transport. The results compared with simulation showed a good agreement. In the second part, we verify the symmetric oscillation mode stability for a spherical beam. We argue that when this mode is stable, our model for the quasistationary state can also describe slightly anisotropic beams, a situation more realistic in experiments. We nd out that in situations of practical interest the mode is always stable. Finally, we study a situation in which the external focusing forces are anisotropic, and the beam has ellipsoidal symmetry. We show that, for certain values of the parameters, there is a strong coupling between the nonlinear envelopes dynamics, which causes exchange of energy between the degrees of freedom. The results compared with molecular dynamics showed a good agreement.

Equacao de vlasov

Feixes de particulas

Campos magnéticos

Estabilidade de feixes

Intense bunched beams

Quasistationary state

Vlasov-Maxwell dynamics

Symmetric oscillation mode

Molecular dynamics

Estudo das propriedades cr?ticas do processo epid?mico por par com difus?o de pares

Santos, Frederico Lemos dos

27 October 2010

Made available in DSpace on 2014-12-17T14:10:19Z (GMT). No. of bitstreams: 1 FredericoLS_DISSERT.pdf: 1177174 bytes, checksum: efe72b5694aaae13f9be30ff705ec1c9 (MD5) Previous issue date: 2010-10-27 / The pair contact process - PCP is a nonequilibrium stochastic model which, like the basic contact process - CP, exhibits a phase transition to an absorbing state. While the absorbing state CP corresponds to a unique configuration (empty lattice), the PCP process infinitely many. Numerical and theoretical studies, nevertheless, indicate that the PCP belongs to the same universality class as the CP (direct percolation class), but with anomalies in the critical spreading dynamics. An infinite number of absorbing configurations arise in the PCP because all process (creation and annihilation) require a nearest-neighbor pair of particles. The diffusive pair contact process - PCPD) was proposed by Grassberger in 1982. But the interest in the problem follows its rediscovery by the Langevin description. On the basis of numerical results and renormalization group arguments, Carlon, Henkel and Schollw?ck (2001), suggested that certain critical exponents in the PCPD had values similar to those of the party-conserving - PC class. On the other hand, Hinrichsen (2001), reported simulation results inconsistent with the PC class, and proposed that the PCPD belongs to a new universality class. The controversy regarding the universality of the PCPD remains unresolved. In the PCPD, a nearest-neighbor pair of particles is necessary for the process of creation and annihilation, but the particles to diffuse individually. In this work we study the PCPD with diffusion of pair, in which isolated particles cannot move; a nearest-neighbor pair diffuses as a unit. Using quasistationary simulation, we determined with good precision the critical point and critical exponents for three values of the diffusive probability: D=0.5 and D=0.1. For D=0.5: PC=0.89007(3), β/v=0.252(9), z=1.573(1), =1.10(2), m=1.1758(24). For D=0.1: PC=0.9172(1), β/v=0.252(9), z=1.579(11), =1.11(4), m=1.173(4) / O processo de contato por par -PCP ? um modelo estoc?stico de n?o equil?brio que se inspira no processo de contato simples -PC e que exibe uma transi??o de fase para um estado absorvente. Embora que o estado absorvente para o PC corresponda a uma ?nica configura??o (estado vazio), o PCP possui infinitas configura??es. No entanto, estudos num?ricos e te?ricos indicam que o PCP pertence a mesma classe de universalidade do PC (classe da percola??o direcionada), mas apresenta uma anomalia na din?mica de propaga??o. Um n?mero infinito de configura??es de estados absorventes surge no PCP, devido a todos os processos de cria??o e aniquila??o que requererem um par de part?culas de vizinhos mais pr?ximos. O processo de contato por par difusivo - PCPD foi proposto por Grassberger em 1982. Por?m, o interesse neste problema segue com a redescoberta por Howard; T?uber (1997), que questionaram a validade da descri??o de Langevin. Com base nos resultados num?ricos e em grupo de renormaliza??o, Carlon; Henkel ; Schollw?ck, (2001), observaram que alguns expoentes cr?ticos no PCPD apresentam valores similares ao da classe PC. Porem, Hinrichsen (2001), mostrou resultados diferentes do caso PCPD, atrav?s da simula??o, para o caso PC, propondo uma nova classe de universalidade. At? hoje existe uma controv?rsia em rela??o a classe de universalidade do PCPD. No PCPD ? necess?rio um par de part?culas vizinhas para os processos de cria??o e aniquila??o, embora as part?culas difundam individualmente. Neste trabalho, estudamos o PCPDP com difus?o de pares, no qual part?culas isoladas n?o podem difundir. Pares vizinhos difundem juntos. Usando simula??o quase-estacion?ria, determinamos com boa precis?o o ponto cr?tico e os expoentes para dois valores da probabilidade de difus?o: D=0.5, e 0.1. Para D=0.5: PC=0.89007(3), β/v=0.252(9), z=1.573(1), =1.10(2), m=1.1758(24). Para D=0.1: PC=0.9172(1), β/v=0.252(9), z=1.579(11), =1.11(4), m=1.173(4)

Sistema epid?mico difusivo

Propriedades cr?ticas

Quase-estacion?rio

Diffusive epidemic system

Critical properties

Quasistationary

CNPQ::CIENCIAS BIOLOGICAS

Théorie spectrale pour des applications de Poincaré aléatoires / Spectral theory for random Poincaré maps

Baudel, Manon

01 December 2017

Nous nous intéressons à des équations différentielles stochastiques obtenues en perturbant par un bruit blanc des équations différentielles ordinaires admettant N orbites périodiques asymptotiquement stables. Nous construisons une chaîne de Markov à temps discret et espace d’états continu appelée application de Poincaré aléatoire qui hérite du comportement métastable du système. Nous montrons que ce processus admet exactement N valeurs propres qui sont exponentiellement proches de 1 et nous donnons des expressions pour ces valeurs propres et les fonctions propres associées en termes de fonctions committeurs dans les voisinages des orbites périodiques. Nous montrons également que ces valeurs propres sont bien séparées du reste du spectre. Chacune de ces valeurs propres exponentiellement proche de 1 est également reliée à un temps d’atteinte de ces voisinages. De plus, les N valeurs propres exponentiellement proches de 1 et fonctions propres à gauche et à droite associées peuvent être respectivement approchées par des valeurs propres principales, des distributions quasi-stationnaires, et des fonctions propres principales à droite de processus tués quand ils atteignent ces voisinages. Les preuves reposent sur une représentation de type Feynman–Kac pour les fonctions propres, la transformée harmonique de Doob, la théorie spectrale des opérateurs compacts et une propriété de type équilibré détaillé satisfaite par les fonctions committeurs. / We consider stochastic differential equations, obtained by adding weak Gaussian white noise to ordinary differential equations admitting N asymptotically stable periodic orbits. We construct a discrete-time,continuous-space Markov chain, called a random Poincaré map, which encodes the metastable behaviour of the system. We show that this process admits exactly N eigenvalues which are exponentially close to 1,and provide expressions for these eigenvalues and their left and right eigenfunctions in terms of committorfunctions of neighbourhoods of periodic orbits. We also provide a bound for the remaining part of the spectrum. The eigenvalues that are exponentially close to 1 and the right and left eigenfunctions are well-approximated by principal eigenvalues, quasistationary distributions, and principal right eigenfunctions of processes killed upon hitting some of these neighbourhoods. Each eigenvalue that is exponentially close to 1is also related to the mean exit time from some metastable neighborhood of the periodic orbits. The proofsrely on Feynman–Kac-type representation formulas for eigenfunctions, Doob’s h-transform, spectral theory of compact operators, and a recently discovered detailed balance property satisfied by committor functions.

Équation différentielle stochastique

Orbite périodique

Application de Poincaré aléatoire

Chaîne de Markov

Métastabilité

Distribution quasi-stationnaire

Transformée harmonique de Doob

Théorie spectrale

Théorie de Fredholm

Problème de première sortie

Stochastic differential equation

Periodic orbit

Random Poincaré map

Markov chain

Metastability

Quasistationary distribution

Doob h-transform

Spectral theory

Fredholm theory

First-passage time