Global ETD Search

1	Vlastnosti zobrazení s konečnou distorzí / Vlastnosti zobrazení s konečnou distorzí Campbell, Daniel January 2011 (has links) We study the continuity of mappings of finite distortion, a set of mappings intended to model elastic deformations in non-linear elasticity. We focus on continuity criteria for the inner-distortion function and prove that certain modulus of continuity estimates are sharp, i.e. cannot be im- proved. We also give a proof of the continuity of mappings of finite distortion under simplified conditions on the integrability of the distortion function. 1
2	Functions of Generalized Bounded Variation Lind, Martin January 2013 (has links) This thesis is devoted to the study of different generalizations of the classical conception of a function of bounded variation. First, we study the functions of bounded p-variation introduced by Wiener in 1924. We obtain estimates of the total p-variation (1<p<∞) and other related functionals for a periodic function f in Lp([0,1]) in terms of its Lp-modulus of continuity ω(f;δ)p. These estimates are sharp for any rate of decay of ω(f;δ)p. Moreover, the constant coefficients in them depend on parameters in an optimal way. Inspired by these results, we consider the relationship between the Riesz type generalized variation vp,α(f) (1<p<∞, 0≤α≤1-1/p) and the modulus of p-continuity ω1-1/p(f;δ). These functionals generate scales of spaces that connect the space of functions of bounded p-variation and the Sobolev space Wp1. We prove sharp estimates of vp,α(f) in terms of ω1-1/p(f;δ). In the same direction, we study relations between moduli of p-continuity and q-continuity for 1<p<q<∞. We prove an inequality that estimates ω1-1/p(f;δ) in terms of ω1-1/q(f;δ). The inequality is sharp for any order of decay of ω1-1/q(f;δ). Next, we study another generalization of bounded variation: the so-called bounded Λ-variation, introduced by Waterman in 1972. We investigate relations between the space ΛBV of functions of bounded Λ-variation, and classes of functions defined via integral smoothness properties. In particular, we obtain the necessary and sufficient condition for the embedding of the class Lip(α;p) into ΛBV. This solves a problem of Wang (2009). We consider also functions of two variables. Applying our one-dimensional result, we obtain sharp estimates of the Hardy-Vitali type p-variation of a bivariate function in terms of its mixed modulus of continuity in Lp([0,1]2). Further, we investigate Fubini-type properties of the space Hp(2) of functions of bounded Hardy-Vitali p-variation. This leads us to consider the symmetric mixed norm space Vp[Vp]sym of functions of bounded iterated p-variation. For p>1, we prove that Hp(2) is not embedded into Vp[Vp]sym, and that Vp[Vp]sym is not embedded into Hp(2). In other words, Fubini-type properties completely fail in the class of functions of bounded Hardy-Vitali type p-variation for p>1. / Baksidestext The classical concept of the total variation of a function has been extended in several directions. Such extensions find many applications in different areas of mathematics. Consequently, the study of notions of generalized bounded variation forms an important direction in the field of mathematical analysis. This thesis is devoted to the investigation of various properties of functions of generalized bounded variation. In particular, we obtain the following results: sharp relations between spaces of generalized bounded variation and spaces of functions defined by integral smoothness conditions (e.g., Sobolev and Besov spaces); optimal properties of certain scales of function spaces of frac- tional smoothness generated by functionals of variational type; sharp embeddings within the scale of spaces of functions of bounded p-variation; results concerning bivariate functions of bounded p-variation, in particular sharp estimates of total variation in terms of the mixed Lp-modulus of continuity, and Fubini-type properties. bounded p-variation generalized bounded variation modulus of continuity function spaces embeddings
3	Regularizability of ill-posed problems and the modulus of continuity Bot, Radu Ioan, Hofmann, Bernd, Mathe, Peter 17 October 2011 (has links) (PDF) The regularization of linear ill-posed problems is based on their conditional well-posedness when restricting the problem to certain classes of solutions. Given such class one may consider several related real-valued functions, which measure the wellposedness of the problem on such class. Among those functions the modulus of continuity is best studied. For solution classes which enjoy the additional feature of being star-shaped at zero, the authors develop a series of results with focus on continuity properties of the modulus of continuity. In particular it is highlighted that the problem is conditionally well-posed if and only if the modulus of continuity is right-continuous at zero. Those results are then applied to smoothness classes in Hilbert space. This study concludes with a new perspective on a concavity problem for the modulus of continuity, recently addressed by two of the authors in "Some note on the modulus of continuity for ill-posed problems in Hilbert space", 2011. inkorrekt gestellte Probleme Regularisierbarkeit ill-posed problems regularizability modulus of continuity ddc:515 Regularisierung Stetigkeitsmodul
4	Embedding Theorems for Mixed Norm Spaces and Applications Algervik, Robert January 2010 (has links) This thesis is devoted to the study of mixed norm spaces that arise in connection with embeddings of Sobolev and Besov type spaces. We study different structural, integrability, and smoothness properties of functions satisfying certain mixed norm conditions. Conditions of this type are determined by the behaviour of linear sections of functions. The work in this direction originates in a paper due to Gagliardo (1958), and was further developed by Fournier (1988), by Blei and Fournier (1989), and by Kolyada (2005). Here we continue these studies. We obtain some refinements of known embeddings for certain mixed norm spaces introduced by Gagliardo, and we study general properties of these spaces. In connection with these results, we consider a scale of intermediate mixed norm spaces, and prove intrinsic embeddings in this scale. We also consider more general, fully anisotropic, mixed norm spaces. Our main theorem states an embedding of these spaces to Lorentz spaces. Applying this result, we obtain sharp embedding theorems for anisotropic Sobolev-Besov spaces, and anisotropic fractional Sobolev spaces. The methods used are based on non-increasing rearrangements, and on estimates of sections of functions and sections of sets. We also study limiting relations between embeddings of spaces of different type. More exactly, mixed norm estimates enable us to get embedding constants with sharp asymptotic behaviour. This gives an extension of the results obtained for isotropic Besov spaces by Bourgain, Brezis, and Mironescu, and for anisotropic Besov spaces by Kolyada. We study also some basic properties (in particular the approximation properties) of special weak type spaces that play an important role in the construction of mixed norm spaces, and in the description of Sobolev type embeddings. In the last chapter, we study mixed norm spaces consisting of functions that have smooth sections. We prove embeddings of these spaces to Lorentz spaces. From this result, known properties of Sobolev-Liouville spaces follow. mixed norms rearrangements modulus of continuity embeddings Sobolev spaces Besov spaces Lorentz spaces Mathematical analysis Analys
5	Regularizability of ill-posed problems and the modulus of continuity Bot, Radu Ioan, Hofmann, Bernd, Mathe, Peter January 2011 (has links) The regularization of linear ill-posed problems is based on their conditional well-posedness when restricting the problem to certain classes of solutions. Given such class one may consider several related real-valued functions, which measure the wellposedness of the problem on such class. Among those functions the modulus of continuity is best studied. For solution classes which enjoy the additional feature of being star-shaped at zero, the authors develop a series of results with focus on continuity properties of the modulus of continuity. In particular it is highlighted that the problem is conditionally well-posed if and only if the modulus of continuity is right-continuous at zero. Those results are then applied to smoothness classes in Hilbert space. This study concludes with a new perspective on a concavity problem for the modulus of continuity, recently addressed by two of the authors in "Some note on the modulus of continuity for ill-posed problems in Hilbert space", 2011. info:eu-repo/classification/ddc/515 ddc:515 Regularisierung Stetigkeitsmodul
6	Propriétés analytiques et diophantiennes de certaines séries de Fourier arithmétiques / Analytic and Diophantine properties of certain arithmetic Fourier series Petrykiewicz, Izabela 29 September 2014 (has links) Nous considérons certaines séries de Fourier liées à la théorie des formes modulaires. Nous étudions leurs propriétés analytiques : la dérivabilité, le module de continuité et l'exposant de Hölder. Nous utilisons deux méthodes différentes. La première revient à trouver et itérer une équation fonctionnelle de la fonction étudiée (méthode d'Itatsu) et la deuxième provient de l'analyse en ondelettes (méthode de Jaffard). L'étape essentielle de chacune dépend de la modularité sous-jacente. Nous trouvons que les propriétés analytiques de ces séries aux points irrationnels sont liées aux propriétés diophantiennes de ces points. Ce travail a été motivé par l'étude de la fonction de Riemann. / We consider certain Fourier series which arise from modular or automorphicforms. We study their analytic properties: differentiability, modulus of continuity and theH¨older regularity exponent. We use two different methods. One is based on finding anditerating a functional equation for the function studied (Itatsu’s method), the second onecomes from wavelet analysis (Jaffard’s method). The crucial steps in both of them arebased on the underlined modularity. We find that the analytic properties of these seriesat an irrational x are related to the fine diophantine properties of x, in a very precise way.The work was motivated by the study of the Riemann series. Dérivabilité Module de continuité Exposant de Hölder Formes modulaires Séries d’Eisenstein Fonction thêta Ondelettes Fractions continues Differentiability Modulus of continuity Holder regularity Modular forms Eisenstein series Theta function Wavelets Continued fractions 510
7	Existência e unicidade de soluções globais suaves para a equação quase-geostrófica crítica / Existence and uniqueness of smooth global solutions for the critical quasi-geostrophic equation Moitinho, Valter Victor Cerqueira, 1991- 26 August 2018 (has links) Orientador: Lucas Catão de Freitas Ferreira / Dissertação (mestrado) - Universidade Estadual de Campinas, Instituto de Matemática Estatística e Computação Científica / Made available in DSpace on 2018-08-26T19:31:34Z (GMT). No. of bitstreams: 1 Moitinho_ValterVictorCerqueira_M.pdf: 1171427 bytes, checksum: 9207703fa3477244cb0e004220ae2827 (MD5) Previous issue date: 2015 / Resumo: Nesta dissertação, estudamos o problema de existência de soluções globais suaves para a equação quase-geostrófica em R2 (2DQG) com condições periódicas e no caso de valor crítico para a viscosidade fracionária. Esta equação aparece em estudos de alguns fluidos geofísicos que apresentam altas velocidades de rotação. De um ponto de vista dimensional, a equação é considerada um análogo em 2D das equações de Navier-Stokes em 3D. Primeiramente, estudamos a teoria de soluções fracas com dados iniciais em L2 via o método de Galerkin. Depois mostramos um princípio do máximo em espaços Lp e investigamos a regularidade de soluções para tempos pequenos e dados iniciais nos espaços de Sobolev Hs com s > 1. Finalmente, mostramos que a solução suave localmente no tempo de fato existe globalmente e é suave para todo tempo. Esta dissertação é baseada na Tese de Doutorado de Resnick [36] e no recente trabalho de Kiselev, Narazov e Volberg [33] / Abstract: In this dissertation, we study existence of smooth global solutions for the quasi-geostrophic equation in R2 (2DQG) with periodic conditions and critical value for the fractional viscosity. This equation appears in studies of some geophysical fluids that present high rotational speed. Dimensionally speaking, the equation is the analogue in 2D of the Navier-Stokes equations in 3D. First, we study the theory of weak solutions with initial data in L2 via the Galerkin method. After we show a maximum principle in Lp spaces and investigate regularity of solutions for small times and initial data in Sobolev spaces Hs with s > 1. Finally, we show that local-in-time smooth solutions are indeed global ones. This dissertation is based on the PhD thesis of Resnick [36] and recent work of Kiselev, Narazov e Volberg [33] / Mestrado / Matematica / Mestre em Matemática Equação quase-geostrófica Soluções globais suaves Quasi-geostrophic equation Smooth global solutions
8	Value at risk et expected shortfall pour des données faiblement dépendantes : estimations non-paramétriques et théorèmes de convergences / Value at risk and expected shortfall for weak dependent random variables : nonparametric estimations and limit theorems Kabui, Ali 19 September 2012 (has links) Quantifier et mesurer le risque dans un environnement partiellement ou totalement incertain est probablement l'un des enjeux majeurs de la recherche appliquée en mathématiques financières. Cela concerne l'économie, la finance, mais d'autres domaines comme la santé via les assurances par exemple. L'une des difficultés fondamentales de ce processus de gestion des risques est de modéliser les actifs sous-jacents, puis d'approcher le risque à partir des observations ou des simulations. Comme dans ce domaine, l'aléa ou l'incertitude joue un rôle fondamental dans l'évolution des actifs, le recours aux processus stochastiques et aux méthodes statistiques devient crucial. Dans la pratique l'approche paramétrique est largement utilisée. Elle consiste à choisir le modèle dans une famille paramétrique, de quantifier le risque en fonction des paramètres, et d'estimer le risque en remplaçant les paramètres par leurs estimations. Cette approche présente un risque majeur, celui de mal spécifier le modèle, et donc de sous-estimer ou sur-estimer le risque. Partant de ce constat et dans une perspective de minimiser le risque de modèle, nous avons choisi d'aborder la question de la quantification du risque avec une approche non-paramétrique qui s'applique à des modèles aussi généraux que possible. Nous nous sommes concentrés sur deux mesures de risque largement utilisées dans la pratique et qui sont parfois imposées par les réglementations nationales ou internationales. Il s'agit de la Value at Risk (VaR) qui quantifie le niveau de perte maximum avec un niveau de confiance élevé (95% ou 99%). La seconde mesure est l'Expected Shortfall (ES) qui nous renseigne sur la perte moyenne au delà de la VaR. / To quantify and measure the risk in an environment partially or completely uncertain is probably one of the major issues of the applied research in financial mathematics. That relates to the economy, finance, but many other fields like health via the insurances for example. One of the fundamental difficulties of this process of management of risks is to model the under lying credits, then approach the risk from observations or simulations. As in this field, the risk or uncertainty plays a fundamental role in the evolution of the credits; the recourse to the stochastic processes and with the statistical methods becomes crucial. In practice the parametric approach is largely used.It consists in choosing the model in a parametric family, to quantify the risk according to the parameters, and to estimate its risk by replacing the parameters by their estimates. This approach presents a main risk, that badly to specify the model, and thus to underestimate or over-estimate the risk. Based within and with a view to minimizing the risk model, we choose to tackle the question of the quantification of the risk with a nonparametric approach which applies to models as general as possible. We concentrate to two measures of risk largely used in practice and which are sometimes imposed by the national or international regulations. They are the Value at Risk (VaR) which quantifies the maximum level of loss with a high degree of confidence (95% or 99%). The second measure is the Expected Shortfall (ES) which informs about the average loss beyond the VaR. Value at Risk (VaR) Expected Shortfall (ES) Représentation de Bahadur Fonction de quantile Processus empirique Module de continuité Normalité asymptotique Estimation non-paramétrique Inégalité de moment Variables faiblement dépendantes Value at Risk (VaR) Expected Shortfall (ES) Bahadur representation Quantile function Empirical process Modulus of continuity Asymptotic normality Nonparametric estimation Moment’s inequality Weak dependent random variables
9	Le problème de Dirichlet pour les équations de Monge-Ampère complexes / The dirichlet problem for complex Monge-Ampère equations Charabati, Mohamad 14 January 2016 (has links) Cette thèse est consacrée à l'étude de la régularité des solutions des équations de Monge-Ampère complexes ainsi que des équations hessiennes complexes dans un domaine borné de Cn. Dans le premier chapitre, on donne des rappels sur la théorie du pluripotentiel. Dans le deuxième chapitre, on étudie le module de continuité des solutions du problème de Dirichlet pour les équations de Monge-Ampère lorsque le second membre est une mesure à densité continue par rapport à la mesure de Lebesgue dans un domaine strictement hyperconvexe lipschitzien. Dans le troisième chapitre, on prouve la continuité hölderienne des solutions de ce problème pour certaines mesures générales. Dans le quatrième chapitre, on considère le problème de Dirichlet pour les équations hessiennes complexes plus générales où le second membre dépend de la fonction inconnue. On donne une estimation précise du module de continuité de la solution lorsque la densité est continue. De plus, si la densité est dans Lp , on démontre que la solution est Hölder-continue jusqu'au bord. / In this thesis we study the regularity of solutions to the Dirichlet problem for complex Monge-Ampère equations and also for complex Hessian equations in a bounded domain of Cn. In the first chapter, we give basic facts in pluripotential theory. In the second chapter, we study the modulus of continuity of solutions to the Dirichlet problem for complex Monge-Ampère equations when the right hand side is a measure with continuous density with respect to the Lebesgue measure in a bounded strongly hyperconvex Lipschitz domain. In the third chapter, we prove the Hölder continuity of solutions to this problem for some general measures. In the fourth chapter, we consider the Dirichlet problem for complex Hessian equations when the right hand side depends on the unknown function. We give a sharp estimate of the modulus of continuity of the solution as the density is continuous. Moreover, for the case of Lp-density we demonstrate that the solution is Hölder continuous up to the boundary. Problème de Dirichlet Opérateur de Monge-Ampère Mesure de Hausdorff-Riesz Fonction m-sousharmonique Opérateur hessien Capacité Module de continuité Principe de comparaison Théorème de stabilité Domaine strictement m-pseudoconvexe Dirichlet problem Monge-Ampère operator Hausdorff-Riesz measure M-subharmonic function Hessian operator Capacity Modulus of continuity Comparison principle Stability theorem Strongly hyperconvex Lipschitz domain Strongly m-pseudoconvex domain

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