Global ETD Search

81	Double Hilbert transforms along surfaces in the Heisenberg group Vitturi, Marco January 2017 (has links) We provide an L² theory for the local double Hilbert transform along an analytic surface (s, t ,φ(s, t )) in the Heisenberg group H¹, that is operator f ↦ Hφ f (x) := p.v.∫∣s∣,∣t∣≤1 f (x ∙ (s, t ,φ(s, t ))-¹) ds/s dt/t, where ∙ denotes the group operation in H1. This operator combines several features: it is amulti-parameter singular integral, its kernel is supported along a submanifold, and convolution is with respect to a homogeneous group structure. We reprove Hφ is always L²(H¹)→L²(H¹) bounded (a result first obtained in [Str12]) to illustrate the method and then refine it to characterize the largest class of polynomials P of degree less than d such that the operator HP is uniformly bounded when P ranges in the class. Finally, we provide examples of surfaces that can be treated by our method but not by the theory of [Str12]. 515
82	Forecasting brazilian inflation with singular spectrum analysis Matsuoka, Danilo Hiroshi January 2016 (has links) O objetivo deste artigo é avaliar previsões da inflação brasileira a partir do método não-paramétrico de Análise Espectral Singular (SSA). O exercício de previsão utiliza o esquema de janelas rolantes. Diferentes estratégias de combinação de previsões e procedimentos de seleção de variáveis para métodos multivariados foram contempladas. Para robustez, cinco horizontes de previsão foram utilizados. A avaliação das previsões considera diversos procedimentos e medidas estatísticas para oferecer conclusões confiáveis, incluindo razões de erro quadrático médio de previsão, teste de igualdade condicional de habilidade preditiva, diferenças de erro quadrático médio de previsão cumulativas e Model Confidence Set. Os resultados mostram que o SSA supera consistentemente os métodos competidores. Quase todas as previsões SSA superam os competidores em termos de erro quadrático médio de previsão, e em vários casos, com significância estatística. A análise da porção fora da amostra indica superioridade em performance relativa do SSA, especialmente no período de choque nos preços de energia elétrica. Adicionalmente, métodos SSA sempre foram incluídos no conjunto superior do Model Confidence Set. A falta de estudos relacionados com previsão da inflação brasileira e a relativa escassez de análises de previsões via métodos não-paramétricos ressaltam a relevância deste artigo. Não existem pesquisas na literatura de previsão de inflação brasileira aplicando SSA. Uma das estratégias de combinação de previsões aplicadas neste artigo não é comumente encontrada na literatura, na medida em que envolve combinações de diferentes especificações para cada método de previsão. Adicionalmente, restrições de parâmetros foram impostas nas previsões SSA, uma prática não reportada na literatura. / The purpose of this paper is to evaluate Brazilian inflation forecasts produced by the nonparametric method Singular Spectrum Analysis (SSA). This forecasting exercise employs rolling windows scheme. Different strategies of forecast combinations and variable selection procedures for multivariate methods were contemplated. For robustness, five forecast horizons were used. The forecast evaluation considers several statistical measures and procedures to offer reliable conclusions, including mean squared forecast error ratios, tests of equal conditional predictive ability, cumulative square forecast error difference and Model Confidence Set. The results show that SSA consistently outperforms the competitive methods. Almost all SSA forecasts outperforms the competitors in the mean squared forecast error sense, and several with statistical significance. Analysis of the out-of-sample portion indicates relative superior performance of SSA, especially over the period of electricity shock of prices. SSA methods were always included in the superior set of Model Confidence Set procedures. The lack of studies related to Brazilian inflation forecasting and the relative scarcity of nonparametric methods of forecasting analysis highlights the relevance of this paper. There is no research in Brazilian inflation literature applying SSA. One of the forecast combination strategies applied in this paper is not commonly found in the literature, as it involves combinations of different specifications for each forecast method. Additionally, parameter restrictions on SSA forecasts were imposed, a practice which is not reported in the literature. Inflação Econometria Series temporais Inflation Singular spectrum analysis Forecasting
83	Concentration phenomena for singularly perturbed problems on two dimensional domains. / CUHK electronic theses & dissertations collection January 2007 (has links) Firstly, we establish the existence of a solution u epsilon concentrating along a curve Gammaepsilon near the non-degenerate Gamma, exponentially small in epsilon at any positive distance from the curve, provided epsilon is small and away from certain critical numbers. The concentrating curve Gammaepsilon will collapse to Gamma as epsilon → 0. / In this thesis, we consider the following problem 32Du-u+up= 0 and u>0 in W , 6u6n= 0 on 6W, where O is a bounded domain in R2 with smooth boundary, epsilon is a small positive parameter, nu denotes the outward normal of O and p > 1. Let Gamma be a straight line intersecting orthogonally with ∂O at exactly two points. We use the infinite dimensional Lyapunov-Schmidt reduction method, introduced by M. del Pino, M. Kowalczyk and J. Wei in [14], to deal with the non-invertibility caused by the critical eigenvalues of the linearized operator in the perturbed problems and then construct interior concentration layers near Gamma, which interact with the boundary. Moreover, the method of successive improvements of the approximation helps us decompose the interaction between the boundary and the interior layers. / Secondly, for any given integer N with N ≥ 2 and for small epsilon away from certain critical numbers, we construct another solution uepsilon exhibiting N concentration layers at mutual distances O(epsilon&mid; ln epsilon&mid;), whose concentration set will approach the non-degenerate and non-minimal Gamma as epsilon → 0, provided that the exponent p ≥ 2. Asymptotic location of these layers is governed by a Toda type system. / Yang, Jun. / "July 2007." / Adviser: Juncheng Wei. / Source: Dissertation Abstracts International, Volume: 69-01, Section: B, page: 0357. / Thesis (Ph.D.)--Chinese University of Hong Kong, 2007. / Includes bibliographical references (p. 129-136). / Electronic reproduction. Hong Kong : Chinese University of Hong Kong, [2012] System requirements: Adobe Acrobat Reader. Available via World Wide Web. / Electronic reproduction. [Ann Arbor, MI] : ProQuest Information and Learning, [200-] System requirements: Adobe Acrobat Reader. Available via World Wide Web. / Abstracts in English and Chinese. / School code: 1307. Boundary value problems Lyapunov functions Singular perturbations (Mathematics)
84	The Singular Values of the Exponientiated Adjacency Matrixes of Broom-Tree Graphs Powell, Tracy 01 May 2006 (has links) In this paper, we explore the singular values of adjacency matrices {An} for a particular family {Gn} of graphs, known as broom trees. The singular values of a matrix M are defined to be the square roots of the eigenvalues of the symmetrized matrix MTM. The matrices we are interested in are the symmetrized adjacency matrices AnTAn and the symmetrized exponentiated adjacency matrices BnTBn = (eAn − I)T(eAn − I) of the graphs Gn. The application of these matrices in the HITS algorithm for Internet searches suggests that we study whether the largest two eigenvalues of AnTAn (or those of BnTBn) can become close or in fact coincide. We have shown that for one family of broom-trees, the ratio of the two largest eigenvalues of BnTBn as the number n of nodes (more specifically, the length l of the graph) goes to infinity is bounded below one. This bound shows that for these graphs, the second largest eigenvalue remains bounded away from the largest eigenvalue. For a second family of broom trees it is not known whether the same is true. However, we have shown that for that family a certain later eigenvalue remains bounded away from the largest eigenvalue. Our last result is a generalization of this latter result. Broom-Tree Graphs Exponentiated Adjacency Matrices Singular Values
85	Perturbations singulières pour des EDP linéaires et non linéaires en presence de discontinuités Hamouda, Makram 21 December 2001 (has links) (PDF) Ma thèse porte sur l'étude des couches limites et de perturbations singulières (\textit{i.e.} des problèmes caractérisés par la présence d'un petit paramètre qui tend vers zéro) dans des conditions plus délicates que d'habitude, à savoir lorsque la solution limite n'est pas régulière. Je considère ainsi deux classes de problèmes réguliers associes à un laplacien et à un bilaplacien, et un problème non linéaire dérivé du problème de Plateau (surfaces minimas), pour lequels la fonction limite possède une singularité (discontinuité simple pour les premiers problèmes, dérivée normale infinie sur certaines parties de la frontière pour le second).\\ La première partie de cette thèse est consacrée à l'étude de deux modèles linéaires singuliers associés à des perturbations singulières pour des EDPs ayant une fonction source singulière. Ce type d'équations fait l'objet de plusieurs applications, par exemple les problèmes de flambement en élasticité, les tourbillons singuliers en mécanique des fluides, le problème de la charge critique pour une poutre ou une plaque élastoplastique, le problème du contrôle automatique de la trajectoire d'un mobile et le problème du bord arrière pour l'écoulement autour d'une aile. De manière classique, la présence d'un petit paramètre dans des équations aux dérivées partielles entraîne, dans certains cas, l'apparition d'une couche limite classique près du bord du domaine pour la solution dite régularisée. Cependant, si on considère en plus une fonction source discontinue (voire une distribution), on constate que de nouvelles couches limites apparaissent à l'intérieur du domaine; l'étude de celles-ci constitue le principal but de cette première partie. Dans la deuxième partie, on s'intéresse à l'étude du problème des surfaces minimales sur une couronne. Pour certaines classes de données au bord, ce problème n'admet pas de solution et sa solution faible dite ``généralisée'' admet une dérivée infinie. On introduit alors une méthode de régularisation elliptique qui entraîne une couche limite près du bord. Le résultat fondamental de cette partie consiste à donner explicitement une approximation pour cette solution régularisée. [MATH] Mathematics Singular perturbations asymptotic analysis numerical simulation boundary layers
86	Structural algorithms and perturbations in differential-algebraic equations Tidefelt, Henrik January 2007 (has links) <p>Den kvasilinjära formen av differential-algebraiska ekvationer är både en mycket allmängiltig generalisering av den linjära tidsinvarianta formen, och en form som visar sig lämpa sig väl för indexreduktionsmetoder som vi hoppas ska komma att bli både praktiskt tillämpbara och väl förstådda i framtiden.</p><p>Kuperingsalgoritmen (engelska: the shuffle algorithm) användes ursprungligen för att bestämma konsistenta initialvillkor för linjära tidsinvarianta differential-algebraiska ekvationer, men har även andra tillämpningar, till exempel det grundläggande problemet numerisk integration. I syfte att förstå hur kuperingsalgoritmen kan tillämpas på kvasilinjära differential-algebraiska ekvationer som inte låter sig analyseras utifrån mönstret av nollor, har problemet att förstå singulära perturbationer i differential-algebraiska ekvationer uppstått. Den här avhandlingen presenterar en indexreduktionsmetod där behovet framgår tydligt, och visar att algoritmen inte bara generaliserar kuperingsalgoritmen, utan även är ett specialfall av den mer allmänna strukturalgoritmen (engelska: the structure algorithm) för att invertera system av Li och Feng.</p><p>Ett kapitel av den här avhandlingen söker av en klass av ekvations-former efter former som är mindre generella än den kvasilinjära, men som en algoritm lik vår kan anpassas till. Det visar sig att indexreduktionen ofta förstör strukturella egenskaper hos ekvationerna, och att det därför är naturligt att arbeta med den mest allmänna kvasilinjära formen.</p><p>Avhandlingen innehåller också några tidiga resultat gällande hur perturbationerna kan hanteras. Huvudresultaten är inspirerade av den modellering i skilda tidskalor som görs i teorin om singulära perturbationer (engelska: singular perturbation theory). Medan teorin om singulära perturbationer betraktar inverkan av en försvinnande skalär i ekvationerna, betraktar analysen häri en okänd matris vars norm begränsas av en liten skalär. Resultaten är begränsade till linjära tidsinvarianta ekvationer av index inte högre än 1, men det är värt att notera att index 0-fallet självt innebär en intressant generalisering av teorin för singulära perturbationer för ordinära differentialekvationer.</p> / <p>The quasilinear form of differential-algebraic equations is at the same time both a very versatile generalization of the linear time-invariant form, and a form which turns out to suit methods for index reduction which we hope will be practically applicable and well understood in the future.</p><p>The shuffle algorithm was originally a method for computing consistent initial conditions for linear time-invariant differential algebraic equations, but has other applications as well, such as the fundamental task of numerical integration. In the prospect of understanding how the shuffle algorithm can be applied to quasilinear differential-algebraic equations that cannot be analyzed by zero-patterns, the question of understanding singular perturbation in differential-algebraic equations has arose. This thesis details an algorithm for index reduction where this need is evident, and shows that the algorithm not only generalizes the shuffle algorithm, but also specializes the more general structure algorithm for system inversion by Li and Feng.</p><p>One chapter of this thesis surveys a class of forms of equations, searching less general forms than the quasilinear, to which an algorithm like ours can be tailored. It is found that the index reduction process often destroys structural properties of the equations, and hence that it is natural to work with the quasilinear form in its full generality.</p><p>The thesis also contains some early results on how the perturbations can be handled. The main results are inspired by the separate timescale modeling found in singular perturbation theory. While the singular perturbation theory considers the influence of a vanishing scalar in the equations, the analysis herein considers an unknown matrix bounded in norm by a small scalar. Results are limited to linear time-invariant equations of index at most 1, but it is worth noting that the index 0 case in itself holds an interesting generalization of the singular perturbation theory for ordinary differential equations.</p> / Report code: LiU-TEK-LIC-2007:27. differential-algebraic equations index reduction singular perturbation Automatic control Reglerteknik
87	On the holomorphic solution of non-linear totally characteristic equations with several space variables Chen, Hua, Lua, Zhuangehu January 1998 (has links) In this paper we study a class of non-linear singular partial differential equation in complex domain Csub(t) x C n sub(x). Under certain assumptions, we prove the existence and uniqueness of holomorphic solution near origin of Csub(t) x C n sub(x). Non-linear singular partial differential equation holomorphic solution Mathematics
88	On the holomorphic solution of non-linear totally characteristic equations Chen, Hua, Hidetoshi, Tahara January 1998 (has links) The paper deals with a non-linear singular partial differential equation: (E) t∂/∂t = F(t, x, u, ∂u/∂x) in the holomorphic category. When (E) is of Fuchsian type, the existence of the unique holomorphic solution was established by Gérard-Tahara [2]. In this paper, under the assumption that (E) is of totally characteristic type, the authors give a sufficient condition for (E) to have a unique holomorphic solution. The result is extended to higher order case. Nonlinear singular partial differential equation holomorphic solution Mathematics
89	Structural algorithms and perturbations in differential-algebraic equations Tidefelt, Henrik January 2007 (has links) Den kvasilinjära formen av differential-algebraiska ekvationer är både en mycket allmängiltig generalisering av den linjära tidsinvarianta formen, och en form som visar sig lämpa sig väl för indexreduktionsmetoder som vi hoppas ska komma att bli både praktiskt tillämpbara och väl förstådda i framtiden. Kuperingsalgoritmen (engelska: the shuffle algorithm) användes ursprungligen för att bestämma konsistenta initialvillkor för linjära tidsinvarianta differential-algebraiska ekvationer, men har även andra tillämpningar, till exempel det grundläggande problemet numerisk integration. I syfte att förstå hur kuperingsalgoritmen kan tillämpas på kvasilinjära differential-algebraiska ekvationer som inte låter sig analyseras utifrån mönstret av nollor, har problemet att förstå singulära perturbationer i differential-algebraiska ekvationer uppstått. Den här avhandlingen presenterar en indexreduktionsmetod där behovet framgår tydligt, och visar att algoritmen inte bara generaliserar kuperingsalgoritmen, utan även är ett specialfall av den mer allmänna strukturalgoritmen (engelska: the structure algorithm) för att invertera system av Li och Feng. Ett kapitel av den här avhandlingen söker av en klass av ekvations-former efter former som är mindre generella än den kvasilinjära, men som en algoritm lik vår kan anpassas till. Det visar sig att indexreduktionen ofta förstör strukturella egenskaper hos ekvationerna, och att det därför är naturligt att arbeta med den mest allmänna kvasilinjära formen. Avhandlingen innehåller också några tidiga resultat gällande hur perturbationerna kan hanteras. Huvudresultaten är inspirerade av den modellering i skilda tidskalor som görs i teorin om singulära perturbationer (engelska: singular perturbation theory). Medan teorin om singulära perturbationer betraktar inverkan av en försvinnande skalär i ekvationerna, betraktar analysen häri en okänd matris vars norm begränsas av en liten skalär. Resultaten är begränsade till linjära tidsinvarianta ekvationer av index inte högre än 1, men det är värt att notera att index 0-fallet självt innebär en intressant generalisering av teorin för singulära perturbationer för ordinära differentialekvationer. / The quasilinear form of differential-algebraic equations is at the same time both a very versatile generalization of the linear time-invariant form, and a form which turns out to suit methods for index reduction which we hope will be practically applicable and well understood in the future. The shuffle algorithm was originally a method for computing consistent initial conditions for linear time-invariant differential algebraic equations, but has other applications as well, such as the fundamental task of numerical integration. In the prospect of understanding how the shuffle algorithm can be applied to quasilinear differential-algebraic equations that cannot be analyzed by zero-patterns, the question of understanding singular perturbation in differential-algebraic equations has arose. This thesis details an algorithm for index reduction where this need is evident, and shows that the algorithm not only generalizes the shuffle algorithm, but also specializes the more general structure algorithm for system inversion by Li and Feng. One chapter of this thesis surveys a class of forms of equations, searching less general forms than the quasilinear, to which an algorithm like ours can be tailored. It is found that the index reduction process often destroys structural properties of the equations, and hence that it is natural to work with the quasilinear form in its full generality. The thesis also contains some early results on how the perturbations can be handled. The main results are inspired by the separate timescale modeling found in singular perturbation theory. While the singular perturbation theory considers the influence of a vanishing scalar in the equations, the analysis herein considers an unknown matrix bounded in norm by a small scalar. Results are limited to linear time-invariant equations of index at most 1, but it is worth noting that the index 0 case in itself holds an interesting generalization of the singular perturbation theory for ordinary differential equations. / Report code: LiU-TEK-LIC-2007:27. differential-algebraic equations index reduction singular perturbation Automatic control Reglerteknik
90	Robust computational methods for two-parameter singular perturbation problems Elago, David January 2010 (has links) <p>This thesis is concerned with singularly perturbed two-parameter problems. We study a tted nite difference method as applied on two different meshes namely a piecewise mesh (of Shishkin type) and a graded mesh (of Bakhvalov type) as well as a tted operator nite di erence method. We notice that results on Bakhvalov mesh are better than those on Shishkin mesh. However, piecewise uniform meshes provide a simpler platform for analysis and computations. Fitted operator methods are even simpler in these regards due to the ease of operating on uniform meshes. Richardson extrapolation is applied on one of the tted mesh nite di erence method (those based on Shishkin mesh) as well as on the tted operator nite di erence method in order to improve the accuracy and/or the order of convergence. This is our main contribution to this eld and in fact we have achieved very good results after extrapolation on the tted operator finitete difference method. Extensive numerical computations are carried out on to confirm the theoretical results.</p> Initial value problems Numerical solutions Singular perturbations (Mathematics) Perturbation (Mathematics).

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