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341	Equações parabólicas quase lineares e fluxos de curvatura média em espaços euclidianos / Quasilinear parabolic equations and mean curvature flows in Euclidean spaces Hitomi, Eduardo Eizo Aramaki, 1989- 03 June 2015 (has links) Orientador: Olivâine Santana de Queiroz / Dissertação (mestrado) - Universidade Estadual de Campinas, Instituto de Matemática Estatística e Computação Científica / Made available in DSpace on 2018-08-27T03:06:43Z (GMT). No. of bitstreams: 1 Hitomi_EduardoEizoAramaki_M.pdf: 5800906 bytes, checksum: 04b93921a20d8ab0f71d4977b9e93e73 (MD5) Previous issue date: 2015 / Resumo: Nesta dissertação realizamos um estudo sobre o fluxo de curvatura média em espaços Euclidianos sob as perspectivas analítica e geométrica. Tratamos inicialmente da existência e regularidade de soluções em tempos pequenos de equações parabólicas quase lineares de segunda ordem em variedades Riemannianas, o que é essencial para garantirmos a existência de uma solução suave em tempo pequeno do fluxo de curvatura média. Em uma segunda parte, passamos a alguns resultados sobre o comportamento no intervalo maximal de existência de uma solução suave da hipersuperfície em evolução, por meio de equações das componentes geométricas associadas e de Princípios de Máximo. Próximo desse tempo maximal, analisamos a formação de singularidades do Tipo I por meio da Fórmula de Monotonicidade de Huisken e de rescalings, e do Tipo II por meio de uma técnica de blow-up devida a Hamilton. Em especial, reservamos o caso de curvas a um capítulo a parte e apresentamos resultados clássicos da teoria de curve-shortening flows / Abstract: In this dissertation we study the mean curvature flow in Euclidean spaces from the analytic and geometric point of view. We deal initially with short-time existence and regularity of a solution for second order quasilinear parabolic equations on Riemannian manifolds, which is essential to guarantee the short-time existence of a smooth solution to the mean curvature flow. In a second part, we present some results concerning the behavior of the evolving hypersurface close to the maximal time of existence of a smooth solution, by means of Maximum Principles and evolution equations of the associated geometric components. Close to this maximal time, we analyse the formation of singularities of Type I by means of rescalings and Huisken's Monotonicity Formula, and of Type II by means of a blow-up technique due to Hamilton. In particular, we reserve the case of curves to a separate chapter, where we present some classical results in curve-shortening flow theory / Mestrado / Matematica / Mestre em Matemática Fluxo de curvatura Geometria diferencial global Equações diferenciais parabólicas Curvature flow Global differential geometry Parabolic differential equations
342	Crystalline order and topological charges on capillary bridges Schmid, Verena, Voigt, Axel 30 July 2014 (has links) We numerically investigate crystalline order on negative Gaussian curvature capillary bridges. In agreement with the experimental results in [W. Irvine et al., Nature, Pleats in crystals on curved surfaces, 2010, 468, 947] we observe for decreasing integrated Gaussian curvature, a sequence of transitions, from no defects to isolated dislocations, pleats, scars and isolated sevenfold disclinations. We especially focus on the dependency of topological charge on the integrated Gaussian curvature, for which we observe, again in agreement with the experimental results, no net disclination for an integrated curvature down to −10, and an approximately linear behavior from there on until the disclinations match the integrated curvature of −12. In contrast to previous studies in which ground states for each geometry are searched for, we here show that the experimental results, which are likely to be in a metastable state, can be best resembled by mimicking the experimental settings and continuously changing the geometry. The obtained configurations are only low energy local minima. The results are computed using a phase field crystal approach on catenoid-like surfaces and are highly sensitive to the initialization. Kapillarbrücke, Gaußsche Krümmung info:eu-repo/classification/ddc/530 ddc:530
343	Rigidity for the isoperimetric inequality of negative effective dimension on weighted Riemannian manifolds / 重み付きリーマン多様体上の負の有効次元の等周不等式の剛性 Mai, Cong Hung 23 March 2021 (has links) 京都大学 / 新制・課程博士 / 博士(理学) / 甲第22975号 / 理博第4652号 / 新制\|\|理\|\|1668(附属図書館) / 京都大学大学院理学研究科数学・数理解析専攻 / (主査)教授山口孝男, 教授藤原耕二, 教授入谷寛 / 学位規則第4条第1項該当 / Doctor of Science / Kyoto University / DFAM weighted manifold isoperimetric inequality needle decomposition negative effective dimension Ricci curvature bound 400
344	Berry's phase driven nonlinear optical and transport effects in solids Matsyshyn, Oles 22 November 2021 (has links) In this thesis, research starts by questioning Berry curvature dipole's role in electronic properties in solids. Strongly inspired by the recent studies, we discover a more profound interpretation of the Berry curvature dipole. It is demonstrated that the anomalous correction to the electron acceleration is proportional to the Berry curvature dipole and is responsible for the Non-linear Hall effect recently discovered in materials with broken inversion symmetry. This allows uncovering a deeper meaning of the Berry curvature dipole as a non-linear version of the Drude weight that serves as a measurable order parameter for broken inversion symmetry in metals. Later, we introduce the Quantum Rectification Sum Rule in time-reversal invariant materials is derived by showing that the integral over frequency of the rectification conductivity depends solely on the Berry connection and not on the band energies or relaxation rates. In the final part of the thesis, we use the Keldysch-Floquet formalism to obtain non-perturbative predictions of the optical responses in solids, mainly focusing on the clean limit response of systems with broken time-reversal symmetry. info:eu-repo/classification/ddc/530 ddc:530
345	Vliv modelu zpevnění na výsledky simulace kosoúhlého rovnání / Influence of hardening model on the results of cros-roll straightening simulation Meňhert, Samuel January 2019 (has links) This diploma thesis deals with simulation of cross-roll straightening using computational modeling with finite element method in software ANSYS. The main goal of this thesis is to quantify the influence of inaccurate knowledge of mechanical properties on the straightening process and correct setting of machine. It also aims for comparison of hardening models and their influence on the final curvature and residual stresses in the cross section of the bar.
346	Ricci Curvature of Finsler Metrics by Warped Product Patricia Marcal (8788193) 01 May 2020 (has links) <div>In the present work, we consider a class of Finsler metrics using the warped product notion introduced by B. Chen, Z. Shen and L. Zhao (2018), with another “warping”, one that is consistent with the form of metrics modeling static spacetimes and simplified by spherical symmetry over spatial coordinates, which emerged from the Schwarzschild metric in isotropic coordinates. We will give the PDE characterization for the proposed metrics to be Ricci-flat and construct explicit examples. Whenever possible, we describe both positive-definite solutions and solutions with Lorentz signature. For the latter, the 4-dimensional metrics may also be studied as Finsler spacetimes.</div> Geometry Algebraic and Differential Geometry Warped Product Finsler Metric Ricci Curvature Ricci flat
347	Investigation of Residual and Thermal Stress on Membrane-Based MEMS Devices Davis, Lynford O 29 October 2009 (has links) Thin films have become very important in the past years as there is a tremendous increase in the need for small-scale devices. Thin films are preferred because of their electrical, mechanical, chemical, and other unique properties. They are often used for coatings, and in the fabrication of Microelectronic devices and Micro-electro Mechanical Systems (MEMS). Internal (residual) stress always exists when a thin film is employed in the device design. Residual and thermal stresses cause membrane bow, altering the anticipated dynamic response of a membrane-based MEMS design. The device may even become inoperable under the high stresses conditions. As a result, the stresses that act upon the membrane should be minimized for optimum operation of a MEMS device. In this research, the fabrication process parameters leading to low stress silicon nitride films were investigated. Silicon nitride was deposited using Plasma Enhanced Chemical Vapor Deposition (PECVD) and the residual stresses on these films were determined using a wafer curvature technique. By adjusting the silane (SiH4) and nitrogen (N2) gas flow rates, and the radiofrequency (RF) power; high quality silicon nitride films with residual stress as low as 11 MPa were obtained. Furthermore, an analytical study was also conducted to explore the effect of thermal stresses between layers of thin films on the MEMS device operation. In this thesis, we concentrated our efforts on three layers of thin films, as that is the most commonly encountered in a membrane based MEMS device. The results obtained from a parametric study of the membrane center deflection indicate that the deflection can be minimized by the appropriate choice of materials used. In addition, our results indicate that thin films with similar coefficient of thermal expansion should be employed in the design to minimize the deflection of the membrane, leading to anticipated device operation and increased yield. A complete understanding of the thermal and residual stress in MEMS structures can improve survival rate during fabrication, thereby increasing yield and ultimately reducing the device cost. In addition, reliability, durability, and overall performance of membrane-based structures are improved when substrate curvature and membrane deflection caused by stresses are kept at a minimum. Film stress PECVD Radius of curvature Deflection CMUT American Studies Arts and Humanities
348	Courbure de Ricci grossière de processus markoviens / Coarse Ricci curvature of Markov processes Veysseire, Laurent 16 July 2012 (has links) La courbure de Ricci grossière d’un processus markovien sur un espace polonais est définie comme un taux de contraction local de la distance de Wasserstein W1 entre les lois du processus partant de deux points distincts. La première partie de cette thèse traite de résultats valables dans le cas d’espaces polonais quelconques. On montre que l’infimum de la courbure de Ricci grossière est un taux de contraction global du semigroupe du processus pour la distance W1. Quoiqu’intuitif, ce résultat est difficile à démontrer en temps continu. La preuve de ce résultat, ses conséquences sur le trou spectral du générateur font l’objet du chapitre 1. Un autre résultat intéressant, faisant intervenir les valeurs de la courbure de Ricci grossière en différents points, et pas seulement son infimum, est un résultat de concentration des mesures d’équilibre, valable uniquement en temps discret. Il sera traité dans le chapitre 2. La seconde partie de cette thèse traite du cas particulier des diffusions sur les variétés riemanniennes. Une formule est donnée permettant d’obtenir la courbure de Ricci grossière à partir du générateur. Dans le cas où la métrique est adaptée à la diffusion, nous montrons l’existence d’un couplage entre les trajectoires tel que la courbure de Ricci grossière est exactement le taux de décroissance de la distance entre ces trajectoires. Le trou spectral du générateur de la diffusion est alors plus grand que la moyenne harmonique de la courbure de Ricci. Ce résultat peut être généralisé lorsque la métrique n’est pas celle induite par le générateur, mais il nécessite une hypothèse contraignante, et la courbure que l'on doit considérer est plus faible. / The coarse Ricci curvature of a Markov process on a Polish space is defined as a local contraction rate of the W1 Wasserstein distance between the laws of the process starting at two different points. The first part of this thesis deals with results holding in the case of general Polish spaces. The simplest of them is that the infimum of the coarse Ricci curvature is a global contraction rate of the semigroup of the process for the W1 distance between probability measures. Though intuitive, this result is diffucult to prove in continuous time. The proof of this result, and the following consequences for the spectral gap of the generator are the subject of Chapter 1. Another interesting result, using the values of the coarse Ricci curvature at different points, and not only its infimum, is a concentration result for the equilibrium measures, only holding in a discrete time framework. That will be the topic of Chapter 2. The second part of this thesis deals with the particular case of diffusions on Riemannian manifolds. A formula is given, allowing to get the coarse Ricci curvature from the generator of the diffusion. In the case when the metric is adapted to the diffusion, we show the existence of a coupling between the paths starting at two different points, such that the coarse Ricci curvature is exactly the decreasing rate of the distance between these paths. We can then show that the spectral gap of the generator is at least the harmonic mean of the Ricci curvature. This result can be generalized when the metric is not the one induced by the generator, but it needs a very restricting hypothesis, and the curvature we have to choose is smaller. Courbure de Ricci Processus markoviens Trou spectral Concentration de la mesure Ricci curvature Markov processes Spectral gap Measure concentration
349	An Obstacle Problem for Mean Curvature Flow Logaritsch, Philippe 19 October 2016 (has links) We adress an obstacle problem for (graphical) mean curvature flow with Dirichlet boundary conditions. Using (an adapted form of) the standard implicit time-discretization scheme we derive the existence of distributional solutions satisfying an appropriate variational inequality. Uniqueness of this flow and asymptotic convergence towards the stationary solution is proven. info:eu-repo/classification/ddc/500 ddc:500 Obstacle Problem, Mean Curvature Flow
350	Convergence of phase-field models and thresholding schemes via the gradient flow structure of multi-phase mean-curvature flow Laux, Tim Bastian 13 July 2017 (has links) This thesis is devoted to the rigorous study of approximations for (multi-phase) mean curvature flow and related equations. We establish convergence towards weak solutions of the according geometric evolution equations in the BV-setting of finite perimeter sets. Our proofs are of variational nature in the sense that we use the gradient flow structure of (multi-phase) mean curvature flow. We study two classes of schemes, namely phase-field models and thresholding schemes. The starting point of our investigation is the fact that both, the Allen-Cahn Equation and the thresholding scheme, preserve this gradient flow structure. The Allen-Cahn Equation is a gradient flow itself, while the thresholding scheme is a minimizing movements scheme for an energy that Γ-converges to the total interfacial energy. In both cases we can incorporate external forces or a volume-constraint. In the spirit of the work of Luckhaus and Sturzenhecker (Calc. Var. Partial Differential Equations 3(2):253–271, 1995), our results are conditional in the sense that we assume the time-integrated energies to converge to those of the limit. Although this assumption is natural, it is not guaranteed by the a priori estimates at hand. info:eu-repo/classification/ddc/500 ddc:500

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