Desigualdades universais para autovalores do polidrifting laplaciano em dominios compactos do R^n e S^n / Universal bounds for eigenvalues of the poli-drifting laplaciano operators ìn compact domains in the R^n and S^n

Pereira, Rosane Gomes

08 March 2016

Submitted by Marlene Santos (marlene.bc.ufg@gmail.com) on 2016-05-05T20:05:47Z No. of bitstreams: 2 Tese - Rosane Gomes Pereira - 2016.pdf: 1460804 bytes, checksum: bde81076cac51b848a33cb0c0f768798 (MD5) license_rdf: 19874 bytes, checksum: 38cb62ef53e6f513db2fb7e337df6485 (MD5) / Approved for entry into archive by Luciana Ferreira (lucgeral@gmail.com) on 2016-05-06T11:39:46Z (GMT) No. of bitstreams: 2 Tese - Rosane Gomes Pereira - 2016.pdf: 1460804 bytes, checksum: bde81076cac51b848a33cb0c0f768798 (MD5) license_rdf: 19874 bytes, checksum: 38cb62ef53e6f513db2fb7e337df6485 (MD5) / Made available in DSpace on 2016-05-06T11:39:46Z (GMT). No. of bitstreams: 2 Tese - Rosane Gomes Pereira - 2016.pdf: 1460804 bytes, checksum: bde81076cac51b848a33cb0c0f768798 (MD5) license_rdf: 19874 bytes, checksum: 38cb62ef53e6f513db2fb7e337df6485 (MD5) Previous issue date: 2016-03-08 / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior - CAPES / In this work, we study eigenvalues of poly-drifting laplacian on compact Riemannian manifolds with boundary (possibly empty). Here, we bring a universal inequality for the eigenvalues of the poly-drifting operator on compact domains in an Euclidean spaceRn. Besides,weintroduce universal inequalities for eigenvalues of poly-drifting operator on compact domains in a unit n-sphere Sn. We give an universal inequality for lower order eigenvalues of the poly-drifting operator inRn and Sn. Moreover, we prove an universal inequality type Ashbaugh and Benguria for the drifting Laplacian on Riemannian manifold immersed in an unit sphere or a projective space. Let be a bounded domain in a n-dimensional Euclidean space Rn. We study eigenvalues of an eigenvalue problem of a system of elliptic equations of the drifting laplacian 8>><>>: L u+ (r(divu)􀀀r divu) = 􀀀¯ u; in ; uj@ = 0 Estimates for eigenvalues of the above eigenvalue problem are obtained. Furthermore, a universal inequality for lower order eigenvalues of the problem is also derived. / Neste trabalho, estudamos autovalores do polidrifting Laplaciano em variedades Riemannianas compactas com fronteira (possivelmente vazia). Aqui, trazemos uma desigualdade universal para autovalores do polidrifting operador em domínios compactos no espaço Euclidiano Rn. Além disso, introduzimos desigualdades universais para autovalores do polidrifting operador em domínios compactos na n-esfera unitária Sn. Fornecemos uma estimativa para autovalores de ordem inferior do polidrifting operador emRn e Sn. Mais ainda, provamos uma desigualdade universal do tipo Ashbaugh-Benguria para o drifting Laplacianoem variedades Riemannianas imersas em uma esfera unitária ou no espaço projetivo. Seja um domínio limitado no n-dimensional espaço Euclidiano Rn. Estudamos autovalores de um problema de autovalores de um sistema de equações elípticas do drifting Laplaciano 8>><>>: L u+ (r(divu)􀀀r divu) = 􀀀¯ u; in ; uj@ = 0 Estimativas para autovalores do problema de autovalores acima são obtidas. Além disso, uma desigualdade universal de ordem inferior também é encontrada.

Desigualdade tipo Yang

Variedades Riemannianas

Polidrifting Laplaciano

Espaço Euclidiano

Esfera unitária

Equações elípticas

Yang type inequality

Riemannian manifolds

Poly-drifting Laplacian

Euclidean space

Unit sphere

Elliptic equations

MATEMATICA::GEOMETRIA E TOPOLOGIA

[pt] TEORIA DE REGULARIDADE PARA MODELOS COMPLETAMENTE NÃO-LINEARES / [en] TOWARDS A REGULARITY THEORY FOR FULLY NONLINEAR MODELS

PEDRA DARICLEA SANTOS ANDRADE

28 December 2020

[pt] Neste trabalho examinamos equações completamente não-lineares em dois contextos distintos. A princípio, estudamos jogos de campo médio completamente não-lineares. Aqui, examinamos ganhos de regularidade para as soluções do problema, existência de soluções, resultados de relaxação e aspectos particulares de um example explícito. A segunda metade da tese dedica-se à regularidade ótima das soluções de um modelo completamente não-linear que degenera-se com respeito ao gradiente das soluções. A pergunta fundamental subjacente a ambos os tópicos diz respeito aos efeitos da elipticidade sobre propriedades intrínsecas das soluções de equações não-lineares. Mais precisamente, no caso dos jogos de campo médio, a elipticidade parece magnificada pelos efeitos do acoplamento, enquanto no caso dos problemas degenerados, esta quantidade colapsa em sub-regiões do domínio, dando origem a delicados fenômenos. Nossa análise inclui um breve contexto da inserção do trabalho. / [en] In this thesis, we examine fully nonlinear problems in two distinct contexts. The first part of our work focuses on fully nonlinear mean-field games. In this context, we examine gains of regularity, the existence of solutions, relaxation results, and particular aspects of a one-dimensional problem. The second half of the thesis concerns a (sharp) regularity theory for fully nonlinear equations degenerating with respect to the gradient of the solutions. The fundamental question underlying both topics regards the effects of ellipticity on the intrinsic properties of solutions to nonlinear equations. To be more precise, in the case of mean-field game systems, ellipticity seems to be magnified through the coupling structure. On the other hand, in the degenerate setting, ellipticity collapses, giving rise to intricate regularity phenomena. Our analysis is preceded by some context on both topics.

[pt] EXISTENCIA

[pt] EQUACOES ELIPTICAS DEGENERADAS

[pt] JOGOS DE CAMPO MEDIO

[pt] METODOS DE APROXIMACAO

[pt] TEORIA DE REGULARIDADE

[pt] VISCOSIDADE

[en] EXISTENCE

[en] DEGENERATE ELLIPTIC EQUATIONS

[en] MEAN FIELD GAMES

[en] APPROXIMATION METHODS

[en] REGULARITY THEORY

[en] VISCOSITY

Two Problems in non-linear PDE’s with Phase Transitions

Jonsson, Karl

January 2018

This thesis is in the field of non-linear partial differential equations (PDE), focusing on problems which show some type of phase-transition. A single phase Hele-Shaw flow models a Newtoninan fluid which is being injected in the space between two narrowly separated parallel planes. The time evolution of the space that the fluid occupies can be modelled by a semi-linear PDE. This is a problem within the field of free boundary problems. In the multi-phase problem we consider the time-evolution of a system of phases which interact according to the principle that the joint boundary which emerges when two phases meet is fixed for all future times. The problem is handled by introducing a parameterized equation which is regularized and penalized. The penalization is non-local in time and tracks the history of the system, penalizing the joint support of two different phases in space-time. The main result in the first paper is the existence theory of a weak solution to the parameterized equations in a Bochner space using the implicit function theorem. The family of solutions to the parameterized problem is uniformly bounded allowing us to extract a weakly convergent subsequence for the case when the penalization tends to infinity. The second problem deals with a parameterized highly oscillatory quasi-linear elliptic equation in divergence form. As the regularization parameter tends to zero the equation gets a jump in the conductivity which occur at the level set of a locally periodic function, the obstacle. As the oscillations in the problem data increases the solution to the equation experiences high frequency jumps in the conductivity, resulting in the corresponding solutions showing an effective global behaviour. The global behavior is related to the so called homogenized solution. We show that the parameterized equation has a weak solution in a Sobolev space and derive bounds on the solutions used in the analysis for the case when the regularization is lost. Surprisingly, the limiting problem in this case includes an extra term describing the interaction between the solution and the obstacle, not appearing in the case when obstacle is the zero level-set. The oscillatory nature of the problem makes standard numerical algorithms computationally expensive, since the global domain needs to be resolved on the micro scale. We develop a multi scale method for this problem based on the heterogeneous multiscale method (HMM) framework and using a finite element (FE) approach to capture the macroscopic variations of the solutions at a significantly lower cost. We numerically investigate the effect of the obstacle on the homogenized solution, finding empirical proof that certain choices of obstacles make the limiting problem have a form structurally different from that of the parameterized problem. / <p>QC 20180222</p>

Conductivity jump

Free boundary problem

Quasilinear elliptic equation

Mathematical techniques

Nonlinear analysis

Free boundary

Free-boundary problems

Quasi-linear elliptic

Quasilinear elliptic equations

Hele-Shaw flow

non-local

implicit function theorem

Heterogeneous Multi Scale

HMM

Finite Element

FEM

FE

Mathematics

Matematik

Équations polyharmoniques sur les variétés et études asymptotiques dans une équation de Hardy-Sobolev / Some Polyharmonic equations on Manifolds and Blow-up Analysis of a Hardy-Sobolev equation

Mazumdar, Saikat

27 June 2016

Ce mémoire est divisé en deux parties : Partie 1 : Nous obtenons des résultats d'existence pour des problèmes au limite mettant en jeu des opérateurs polyharmoniques conformément invariants. Nous nous plaçons indifféremment dans le cas d'une variété riemannienne avec ou sans bord. En particulier, nous montrons que la meilleure constante de Sobolev sur les variétés est exactement la constante euclidienne. En conséquence, nous montrons l'existence d'une solution d'énergie minimale lorsque la fonctionnelle descend en-dessous d'un seuil quantifié. Puis nous montrons l'existence de solutions de haute énergie en utilisant la méthode topologique de Coron. Nous généralisons la décomposition des suites de Palais-Smale comme somme de bulles sur une variété avec ou sans bord : il s'agit d'un résultat dans l'esprit du célèbre théorème de Struwe en 1984. Nous obtenons aussi une version du lemme de compacité-concentration de Pierre-Louis Lions sur les variétés. Partie 2 : Dans cette partie, nous effectuons une analyse de blow-up pour une équation de Hardy-Sobolev à croissance critique et à singularité évanescente au bord. En supposant que l'équation limite n'admet pas de solution minimisante, nous étudions le comportement asymptotique d’une suite de solutions de l'équation perturbée. Ici, la perturbation est la singularité à l'origine. Dans un premier temps, nous obtenons un contrôle ponctuel optimal de la suite de solutions. Dans un second temps, nous obtenons des informations précises sur le point d'explosion en utilisant une identité de Pohozaev / This memoir can be divided into two parts: Part 1: In this part we obtain some existence results for conformally invariant polyharmonic boundary value problems on a compact Riemannian manifold with or without boundary. In particular we show that the best constant of the Sobolev embedding on manifolds is same as the euclidean one, and as a consequence prove the existence of minimum energy solutions when the energy functionnal goes below a quantified threshold. Next we show the existence of high energy solution using the topological method of Coron. We generalize the decomposition of Palais Smale sequences as a sum of bubble on manifolds with or without boundary, a result in the spirit of Struwe's celebrated 1984 result and also an extension of PL Lions concentration compactness result on manifolds. Part2: In this part we do a blow-up analysis of the nonlinear elliptic Hardy-Sobolev equation with critical growth and vanishing boundary singularity. We assume that our equation does not admit minimising solutions, and study the asymptotic behaviour of a sequence of solution to the perturbed equation. Here the perturbation is the singularity at the origin. First we obtain optimal pointwise controlon the sequence and then obtain more precise informations on the localization of the blow-up point using the Pohozaev identity

Équations elliptiques

Opérateurs polyharmoniques

Variétés riemaniennes

Constante de Sobolev

Constante euclidienne

Équation de Hardy-Sobolev

Comportement asymptotique

Identité de Pohozaev

Higher order elliptic equations

Best constants on manifolds

Struwe Decomposition

Coron-Type Solution

Topological Method

Hardy-Sobolev Equation

Pointwise control

Mass of the Green function

Pohozaev identity

516.373

515.2

Theory and Numerics for Shape Optimization in Superconductivity / Theorie und Numerik für ein Formoptimierungsproblem aus der Supraleitung

Heese, Harald

21 July 2006

No description available.

510 Mathematik

Mathematics and Computer Science

Supraleitung

Randwertproblem

Integralgleichungen

Level Set Methoden

Formoptimierung

superconductivity

boundary value problem

integral equations

level set methods

shape optimization

31.80

33.06

31.76

electromagnetic theory: General}

Théorie non linéaire du potentiel et équations quasilinéaires avec données mesures / Nonlinear potential theory and quasilinear equations with measure data

Nguyen, Quoc-Hung

25 September 2014

Cette thèse concerne l’existence et la régularité de solutions d’équations non-linéaires elliptiques, d’équations paraboliques et d’équations de Hesse avec mesures, et les critères de l’existence de solutions grandes d’équations elliptiques et paraboliques non-linéaires. / This thesis is concerned to the existence and regularity of solutions to nonlinear elliptic, parabolic and Hessian equations with measure, and criteria for the existence of large solutions to some nonlinear elliptic and parabolic equations.

Équations quasi-linéaire elliptiques

Équations quasi-linéaires paraboliques

Solutions renormalisée

Solutions maximales

Solutions grandes

Potentiel de Wolff

Potentiel de Riesz

Potentiel de Bessel

Potentiel maximal

Noyau de la chaleur

Noyau de Bessel parabolique

Mesures de Radon

Capacités de Lorentz-Bessel

Capacités de Bessel

Capacités de Hausdorff

Lemme de recouvrement de Vitali

Espaces de Lorentz

Domaines épais uniformes

Domaines plats de Reifenberg

Estimations de décroissance

Estimations de Lorentz-Morrey

Estimations capacitaires

Équations de milieu poreux

Équations de type Riccati

Quasilinear elliptic equations

Quasilinear parabolic equations

Renormalized solutions

Maximal solutions

Large solutions

Wolff potential

Riesz potential

Bessel Potential

Maximal potential

Heat kernel

Parabolic Bessel kernel

Radon measures

Lorentz-Bessel capacities

Bessel capacities

Hausdorff capacities

Vitial covering Lemma

Lorentz spaces

Uniformly thick domain

Reifenberg flat domain

Decay estimates

Lorentz- Morrey estimates

Capacitary estimates

Porous medium equations

Riccati type Equations