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21	Navjė-Stokso lygčių periodiniai laiko atžvilgiu uždaviniai srityse su cilindriniais išėjimais į begalybę / Time periodic problems for Navier-Stokes equations in domains with cylindrical outlets to infinity Keblikas, Vaidas 19 November 2008 (has links) Disertacijos santraukoje apžvelgiami Navjė-Stokso lygčių periodiniai laiko atžvilgiu uždaviniai srityse su cilindriniais išėjimais į begalybę. / In this PhD dissertation summary is considered time periodic Navier-Stokes equations in domains with cylindrical outlets to infinity. Mathematics Navjė-Stokso lygtys Puazelio sprendiniai Periodiniai laiko atžvilgiu sprendiniai Navier-Stokes equations Poiseuille solution Time periodic solutions
22	Periodic Solutions And Stability Of Linear Impulsive Delay Differential Equations Alzabut, Jehad 01 April 2004 (has links) (PDF) In this thesis, we investigate impulsive differential systems with delays of the form And more generally of the form The dissertation consists of five chapters. The first chapter serves as introduction, contains preliminary considerations and assertions that will be encountered in the sequel. In chapter 2, we construct the adjoint systems and obtain the variation of parameters formulas of the solutions in terms of fundamental matrices. The asymptotic behavior of solutions of systems satisfying the Perron condition is investigated in chapter 3. In chapter4, we give a result that characterizes the behavior of solutions in the case there is a bounded solution. Moreover, a necessary and sufficient condition for the existence of periodic solutions is obtained. In the last chapter, a series of consequences on the existence of periodic solutions of functionally equivlent impulsive systems with delays is established. QA Differential Equations 370-387
23	Periodic and Quasi-Periodic Solutions of some Non-Linear Hamiltonian PDE's / Solutions périodiques et quasi-périodiques de certaines EDP hamiltoniennes non-linéaires Khayamian, Chiara 13 June 2017 (has links) Les équations aux dérivées partielles (EDP) permettent d’aborder d’un point de vue mathématique des phénomènes observés dans tous les domaines des sciences. Certaines EDP non-linéaires modélisent des problèmes de mécanique statistique, mécanique des fluides, théories de la gravitation ou des mathématiques financières.L’objectif de ce travail de thèse est l’étude de certains problèmes d’ EDP non-linéaires et hamiltoniennes et la recherche des leurs solutions périodiques et quasi-périodiques. / The aim of this thesis is the research of periodic and quasi-periodic solutions for some non-linear hamiltonian PDEs. Théorie de Nash-Moser EDP hamiltoniennes Nash-Moser theory Non-linear PDEs Periodic and quasi-periodic solutions NLW
24	Helikální symetrie a neexistence asymptoticky plochých periodických řešení v obecné teorii relativity / Helical symmetry and the non-existence of asymptotically flat periodic solutions in general relativity Scholtz, Martin January 2011 (has links) 1 Title Helical symmetry and the non-existence of asymptotically flat periodic solutions in general relativity Author Martin Scholtz Department Institute of theoretical physics Faculty of Mathematics and Physics Charles University in Prague Supervisor Prof. RNDr. Jiří Bičák, DrSc., dr. h.c. Abstract. No exact helically symmetric solution in general relativity is known today. There are reasons, however, to expect that such solutions, if they exist, cannot be asymptotically flat. In the thesis presented we investigate a more general question whether there exist periodic asymptotically flat solutions of Einstein's equations. We follow the work of Gibbons and Stewart [3] who have shown that there are no periodic vacuum asymptotically flat solutions an- alytic near null infinity I. We discuss necessary corrections of Gibbons and Stewart proof and generalize their results for the system of Einstein-Maxwell, Einstein-Klein-Gordon and Einstein-conformal-scalar field equations. Thus, we show that there are no asymptotically flat periodic space-times analytic near I if as the source of gravity we take electromagnetic, Klein-Gordon or conformally invariant scalar field. The auxilliary results consist of corresponding confor- mal field equations, the Bondi mass and the Bondi massloss formula for scalar fields. We also...
25	Sobre soluções periódicas de equações diferenciais com retardo e impulsos / On periodic solutions of retarded differential equations with impulses André Luiz Furtado 27 March 2012 (has links) Neste trabalho, apresentamos condições suficientes para a existência e a unicidade de soluções periódicas para equações diferenciais funcionais com retardo e impulsos. Os resultados sobre existência estão ancorados num Teorema de Continuação de Jean Mawhin. Por outro lado, as condições que garantem a unicidade de soluções periódicas são condições do tipo Lipschitz / In this work, we present sufficient conditions for the existence and the uniqueness of periodic solutions for retarded functional differential equations with impulses. The results on the existence of periodic solutions are anchored by a Jean Mawhin continuation theorem. Moreover, the conditions that guarantee the uniqueness of the periodic solutions are Lipschitz type Soluções periódicas Teoria do grau Degree theory Periodic solutions
26	On Evolution Equations in Banach Spaces and Commuting Semigroups Alsulami, Saud M. A. 28 September 2005 (has links) No description available. Mathematics Differential Equations with Multi-time C-Admissibility Admissibility of subspaces Analytic C-semigroup Integral of almost Periodic Functions Almost Periodic Solutions
27	A qualitative approach to the existence of random periodic solutions Uda, Kenneth O. January 2015 (has links) In this thesis, we study the existence of random periodic solutions of random dynamical systems (RDS) by geometric and topological approach. We employed an extension of ergodic theory to random setting to prove that a random invariant set with some kind of dissipative structure, can be expressed as union of random periodic curves. We extensively characterize the dissipative structure by random invariant measures and Lyapunov exponents. For stochastic flows induced by stochastic differential equations (SDEs), we studied the dissipative structure by two point motion of the SDE and prove the existence exponential stable random periodic solutions. 519.2
28	Sistemas impulsivos com retardamento: soluções periódicas. / Periodic solutions of an impulsive differential system with delay: an Lp approach. Nicola, Selma Helena de Jesus 18 August 2000 (has links) Provamos a existência de soluções periódicas de algumas equações diferenciais funcionais com retardamento sujeitas a condições de impulsos de auto-sustentação. Devido aos impulsos, soluções exibem descontinuidades de primeira espécie e isso força considerarmos espaços de fase mais gerais que C([-r,0],Rn). Mostramos que soluções periódicas podem emanar da origem através de bifurcações locais de Hopf. Também estabelecemos um teorema de existência de soluções periódicas lentamente espiralantes. Esse teorema é obtido combinando-se a condição de auto-sustentação com a ejetividade da origem em relação a um operador de retorno. / We prove the existence of periodic solutions of some retarded functional differential equations subjected to impulsive self-supporting conditions. Due to the impulses, solutions exhibit discontinuites of the first kind and this forces the consideration of more general phase spaces than C([-r,0],Rn). We show that periodic solutions can emanate from the origin through local Hopf bifurcations. We also state an existence theorem for slowly spiralling periodic solutions. This theorem is accomplished by a combination of the self-supporting condition with the ejectivity of the origin with respect to a return operator. basic theory in Lp ejectivity ejetividade equações diferenciais com retardamento impulses impulsos periodic solutions retarded differential equations soluções periódicas teoria básica em Lp
29	Inexact Newton Methods Applied to Under-Determined Systems Simonis, Joseph P 04 May 2006 (has links) Consider an under-determined system of nonlinear equations F(x)=0, F:R^m→R^n, where F is continuously differentiable and m > n. This system appears in a variety of applications, including parameter-dependent systems, dynamical systems with periodic solutions, and nonlinear eigenvalue problems. Robust, efficient numerical methods are often required for the solution of this system. Newton's method is an iterative scheme for solving the nonlinear system of equations F(x)=0, F:R^n→R^n. Simple to implement and theoretically sound, it is not, however, often practical in its pure form. Inexact Newton methods and globalized inexact Newton methods are computationally efficient variations of Newton's method commonly used on large-scale problems. Frequently, these variations are more robust than Newton's method. Trust region methods, thought of here as globalized exact Newton methods, are not as computationally efficient in the large-scale case, yet notably more robust than Newton's method in practice. The normal flow method is a generalization of Newton's method for solving the system F:R^m→R^n, m > n. Easy to implement, this method has a simple and useful local convergence theory; however, in its pure form, it is not well suited for solving large-scale problems. This dissertation presents new methods that improve the efficiency and robustness of the normal flow method in the large-scale case. These are developed in direct analogy with inexact-Newton, globalized inexact-Newton, and trust-region methods, with particular consideration of the associated convergence theory. Included are selected problems of interest simulated in MATLAB. Periodic Solutions Under-Determined Systems Continuation Nonlinear Eigenvalue Inexact Newton Methods Newton's Method Trust Region Methods Newton-Raphson method Periodic functions Eigenvalues
30	Validated Continuation for Infinite Dimensional Problems Lessard, Jean-Philippe 07 August 2007 (has links) Studying the zeros of a parameter dependent operator F defined on a Hilbert space H is a fundamental problem in mathematics. When the Hilbert space is finite dimensional, continuation provides, via predictor-corrector algorithms, efficient techniques to numerically follow the zeros of F as we move the parameter. In the case of infinite dimensional Hilbert spaces, this procedure must be applied to some finite dimensional approximation which of course raises the question of validity of the output. We introduce a new technique that combines the information obtained from the predictor-corrector steps with ideas from rigorous computations and verifies that the numerically produced zero for the finite dimensional system can be used to explicitly define a set which contains a unique zero for the infinite dimensional problem F: HxR->Im(F). We use this new validated continuation to study equilibrium solutions of partial differential equations, to prove the existence of chaos in ordinary differential equations and to follow branches of periodic solutions of delay differential equations. In the context of partial differential equations, we show that the cost of validated continuation is less than twice the cost of the standard continuation method alone. Continuation Equilibria of PDEs Chaos in ODEs Periodic solutions of delay equations Infinite-dimensional manifolds Continuation methods Differential equations, Partial

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