Global ETD Search

1	Optimal rates for Lavrentiev regularization with adjoint source conditions Plato, Robert, Mathé, Peter, Hofmann, Bernd 10 March 2016 (has links) (PDF) There are various ways to regularize ill-posed operator equations in Hilbert space. If the underlying operator is accretive then Lavrentiev regularization (singular perturbation) is an immediate choice. The corresponding convergence rates for the regularization error depend on the given smoothness assumptions, and for general accretive operators these may be both with respect to the operator or its adjoint. Previous analysis revealed different convergence rates, and their optimality was unclear, specifically for adjoint source conditions. Based on the fundamental study by T. Kato, Fractional powers of dissipative operators. J. Math. Soc. Japan, 13(3):247--274, 1961, we establish power type convergence rates for this case. By measuring the optimality of such rates in terms on limit orders we exhibit optimality properties of the convergence rates, for general accretive operators under direct and adjoint source conditions, but also for the subclass of nonnegative selfadjoint operators. Lineare inkorrekte Probleme Regularisierung accretive Operatoren Quellbedingungen Konvergenzraten Linear ill-posed problems regularization accretive operators source conditions convergence rates ddc:510 Regularisierung
2	Optimal rates for Lavrentiev regularization with adjoint source conditions Plato, Robert, Mathé, Peter, Hofmann, Bernd January 2016 (has links) There are various ways to regularize ill-posed operator equations in Hilbert space. If the underlying operator is accretive then Lavrentiev regularization (singular perturbation) is an immediate choice. The corresponding convergence rates for the regularization error depend on the given smoothness assumptions, and for general accretive operators these may be both with respect to the operator or its adjoint. Previous analysis revealed different convergence rates, and their optimality was unclear, specifically for adjoint source conditions. Based on the fundamental study by T. Kato, Fractional powers of dissipative operators. J. Math. Soc. Japan, 13(3):247--274, 1961, we establish power type convergence rates for this case. By measuring the optimality of such rates in terms on limit orders we exhibit optimality properties of the convergence rates, for general accretive operators under direct and adjoint source conditions, but also for the subclass of nonnegative selfadjoint operators. info:eu-repo/classification/ddc/510 ddc:510 Regularisierung
3	Euler schemes for accretive operators on Banach spaces Beurich, Johann Carl 06 February 2024 (has links) We look at the Cauchy problem with an accretive Operator on a Banach space. We give an upper bound for the norm of the difference of two solutions of Euler schemes with this accretive operator. This concrete estimate also works for the problem with a non-zero right-hand side in the Cauchy problem and is a generalization of a famous result by Kobayashi. We also show, how this result gives direct proofs for existence, uniqueness, stability and regularity of Euler solutions of the Cauchy problem and also the rate of convergence of solutions of Euler schemes. The results concerning regularity and rate of convergence are generalized for problem data in interpolation sets.:1. Accretive operators 1.1. Thebracket. 1.2. Accretive operators 1.3. The Cauchy problem and Euler solutions 2. A priori estimates for solutions of implicit Euler schemes 2.1. An implicit upper bound 2.2. Properties of the density 2.3. An explicit upper bound 3. Applications 3.1. Wellposedness of the Cauchy problem 3.2. Interpolation theory A. Functions of bounded variation info:eu-repo/classification/ddc/510 ddc:510
4	Applications of Degree Theories to Nonlinear Operator Equations in Banach Spaces Adhikari, Dhruba R 26 April 2007 (has links) Let X be a real Banach space and G1, G2 two nonempty, open and bounded subsets of X such that 0 ∈ G2 and G2 ⊂ G1. The problem (∗) T x + Cx = 0 is considered, where T : X ⊃ D(T) → X is an accretive or monotone operator with 0 ∈ D(T) and T(0) = 0, while C : X ⊃ D(C) → X can be, e.g., one of the following types: (a) compact; (b) continuous and bounded with the resolvents of T compact; (c) demicontinuous, bounded and of type (S+) with T positively homogeneous of degree one; (d) quasi-bounded and satisfies a generalized (S+)-condition w.r.t. the operator T, while T is positively homogeneous of degree one. Solutions are sought for the problem (∗) lying in the set D(T + C) ∩ (G1 \ G2). Nontrivial solutions of (∗) exist even when C(0) = 0. The degree theories of Leray and Schauder, Browder, and Skrypnik as well as the degree theory by Kartsatos and Skrypnik for densely defined operators T, C are used. The last three degree theories do not assume any compactness conditions on the operator C. The excision and additivity properties of these degree theories are employed, and the main results are significant extensions or generalizations of previous results by Krasnoselskii, Guo, Ding and Kartsatos involving the relaxation of compactness conditions and/or conditions on the boundedness of the operator T. Moreover, a new degree theory developed by Kartsatos and Skrypnik has been used to prove a similar result for operators of type T + C, where T : X ⊃ D(T) → 2 X∗ is a multi-valued maximal monotone operator, with 0 ∈ D(T) and 0 ∈ T(0), and C : X ⊃ D(C) → X∗ is a densely defined quasi-bounded and finitely continuous operator of type (S˜+). The problem of existence of nonzero solutions for T x + Cx + Gx 3 0 is also considered. Here, T is maximal monotone, C is bounded demicontinuous of type (S+), and G is of class (P). Eigenvalue and invariance of domain results have also been established for the sum L + T + C : G ∩ D(L) → 2 X∗ , where G ⊂ X is open and bounded, L : X ⊃ D(L) → X∗ densely defined linear maximal monotone, T : X → 2X∗ bounded maximal monotone, and C : G → X∗ bounded demicontinuous of type (S+) w. r. t. D(L). Maximal monotone operators m-accretive operators mappings of type (S+) excision property compact resolvents nonzero solutions American Studies Arts and Humanities
5	Nolinear Evolution Equations and Optimization Problems in Banach Spaces Lee, Haewon January 2005 (has links) No description available. Mathematics Nonlocal Cauchy Problems M-accretive Compact Semigroup Multivalued Perturbation Lower Semicontinuous Continuous selection Higher order tangential cones
6	Analyse mathématique de quelques équations intervenant en dynamique des populations et en cinétique des gaz / Mathematical analysis of some equations arising in the dynamics of populations and the kinetic of gas Al Izeri, Abdul Majeed 08 December 2016 (has links) Les travaux présentés dans cette thèse portent sur l’analyse mathématique de quelques équations intervenant en dynamique des populations et en cinétique des gaz. On s’est intéressé tout d’abord à une version non linéaire d’un modèle dû à Lebowitz et Rubinow en 1974 pour décrire une population cellulaire. On a établi des résultats d’existence et d’unicité aussi bien les solutions au sens de Bénilan que les solutions fortes du problème d’évolution correspondant. Cette analyse a été étendue ensuite à une perturbation de ce modèle par un opérateur non linéaire et pour des conditions aux limites locales et non locales. Cette partie a été complétée par l’étude des résultats d’existence des solutions du problème stationnaire correspondant. Le second volet de ce travail traite de l’existence des solutions d’une version non linéaire stationnaire d’un modèle dû à Rotenberg en 1983. Le dernier chapitre de ce travail à été consacré à l’analyse spectrale d’une équation de transport neutronique faisant intervenir des opérateurs de collision élastiques et inélastiques. Le problème d’évolution correspondant ainsi que le comportement asymptotique (pour les grands temps) de la solution ont été considéré pour des conditions aux limites périodiques. / The work presented in this thesis deals with the mathematical analysis of some equations arising in the dynamics of populations and the kinetic of gas. First, we focused on a non-linear version of a model introduced by Lebowitz and Rubinow in 1974 to describe a cells population. We discussed the existence and the uniqueness of solutions of both Bénilan’s solution and strong solutions to the corresponding evolution equation. This analysis was subsequently extended to a perturbation of this model by a nonlinear operator for local and non-local boundary conditions. This part was supplemented by the study of existence of solutions to the corresponding stationary problem. In chapter 5, we discuss the existence of solutions to a stationary nonlinear version of a model describing the evolution of a cells population introduced by Rotenberg in 1983. The last chapter of this work is devoted to the spectral analysis of a neutron transport equation involving elastic and inelastic collision operators. The corresponding evolution problem as well as the asymptotic behavior (for large times) of the solution was considered for periodic boundary conditions. Équations d’évolution Opérateur m-accrétif Solusion au sens de Bénilan Solution forte Opérateur de transport Dynamique des populations Equations of evolution M-accretive operator Solution in the sense of Bénilan Strong solution Transport operator Dynamic of populations
7	Nonlinear Perron-Frobenius theory and mean-payoff zero-sum stochastic games / Théorie de Perron-Frobenius non-linéaire et jeux stochastiques à somme nulle avec paiement moyen Hochart, Antoine 14 November 2016 (has links) Les jeux stochastiques à somme nulle possèdent une structure récursive qui s'exprime dans leur opérateur de programmation dynamique, appelé opérateur de Shapley. Ce dernier permet d'étudier le comportement asymptotique de la moyenne des paiements par unité de temps. En particulier, le paiement moyen existe et ne dépend pas de l'état initial si l'équation ergodique - une équation non-linéaire aux valeurs propres faisant intervenir l'opérateur de Shapley - admet une solution. Comprendre sous quelles conditions cette équation admet une solution est un problème central de la théorie de Perron-Frobenius non-linéaire, et constitue le principal thème d'étude de cette thèse. Diverses classes connues d'opérateur de Shapley peuvent être caractérisées par des propriétés basées entièrement sur la relation d'ordre ou la structure métrique de l'espace. Nous étendons tout d'abord cette caractérisation aux opérateurs de Shapley "sans paiements", qui proviennent de jeux sans paiements instantanés. Pour cela, nous établissons une expression sous forme minimax des fonctions homogènes de degré un et non-expansives par rapport à une norme faible de Minkowski. Nous nous intéressons ensuite au problème de savoir si l'équation ergodique a une solution pour toute perturbation additive des paiements, problème qui étend la notion d'ergodicité des chaînes de Markov. Quand les paiements sont bornés, cette propriété d'"ergodicité" est caractérisée par l'unicité, à une constante additive près, du point fixe d'un opérateur de Shapley sans paiement. Nous donnons une solution combinatoire s'exprimant au moyen d'hypergraphes à ce problème, ainsi qu'à des problèmes voisins d'existence de points fixes. Puis, nous en déduisons des résultats de complexité. En utilisant la théorie des opérateurs accrétifs, nous généralisons ensuite la condition d'hypergraphes à tous types d'opérateurs de Shapley, y compris ceux provenant de jeux dont les paiements ne sont pas bornés. Dans un troisième temps, nous considérons le problème de l'unicité, à une constante additive près, du vecteur propre. Nous montrons d'abord que l'unicité a lieu pour une perturbation générique des paiements. Puis, dans le cadre des jeux à information parfaite avec un nombre fini d'actions, nous précisons la nature géométrique de l'ensemble des perturbations où se produit l'unicité. Nous en déduisons un schéma de perturbations qui permet de résoudre les instances dégénérées pour l'itération sur les politiques. / Zero-sum stochastic games have a recursive structure encompassed in their dynamic programming operator, so-called Shapley operator. The latter is a useful tool to study the asymptotic behavior of the average payoff per time unit. Particularly, the mean payoff exists and is independent of the initial state as soon as the ergodic equation - a nonlinear eigenvalue equation involving the Shapley operator - has a solution. The solvability of the latter equation in finite dimension is a central question in nonlinear Perron-Frobenius theory, and the main focus of the present thesis. Several known classes of Shapley operators can be characterized by properties based entirely on the order structure or the metric structure of the space. We first extend this characterization to "payment-free" Shapley operators, that is, operators arising from games without stage payments. This is derived from a general minimax formula for functions homogeneous of degree one and nonexpansive with respect to a given weak Minkowski norm. Next, we address the problem of the solvability of the ergodic equation for all additive perturbations of the payment function. This problem extends the notion of ergodicity for finite Markov chains. With bounded payment function, this "ergodicity" property is characterized by the uniqueness, up to the addition by a constant, of the fixed point of a payment-free Shapley operator. We give a combinatorial solution in terms of hypergraphs to this problem, as well as other related problems of fixed-point existence, and we infer complexity results. Then, we use the theory of accretive operators to generalize the hypergraph condition to all Shapley operators, including ones for which the payment function is not bounded. Finally, we consider the problem of uniqueness, up to the addition by a constant, of the nonlinear eigenvector. We first show that uniqueness holds for a generic additive perturbation of the payments. Then, in the framework of perfect information and finite action spaces, we provide an additional geometric description of the perturbations for which uniqueness occurs. As an application, we obtain a perturbation scheme allowing one to solve degenerate instances of stochastic games by policy iteration. Jeux répétés à somme nulle Jeux stochastiques à paiement moyen Contrôle ergodique Opérateur de Shapley Opérateurs accrétifs Hypergraphes Zero-Sum repeated games Mean-Payoff stochastic games Ergodic control Shapley operators Accretive operators Hypergraphs

1

Page generated in 0.0473 seconds