Global ETD Search

41	Taxa de convergência de atratores de algumas equações de reação-difusão perturbadas. / Rate of convergence of attractors de some reaction-difusion equations pertubadas Flank David Morais Bezerra 21 January 2010 (has links) Neste trabalho estudamos a dinâmica assintótica não linear de algumas equações parabólicas do tipo reação-difusão sob perturbações nos parâmetros e perturbações singulares no domínio do tipo dumbbell. Mais precisamente, trataremos dos atratores provenientes destes problemas, buscaremos compreender a dependência destes conjuntos assintóticos de estados em relação ao parâmetro, investigando a continuidade com taxa dos mesmos. O programa que executaremos para obtenção da taxa de continuidade dos atratores, bem como de toda a estrutura, mostra-nos fortes propriedades de dissipatividade exponencial de alguns semigrupos / In this work we study the asymptotic nonlinear dynamical of some reaction-diffusion parabolic equations under perturbations in parameter and singular perturbations in a dumbbell domain. More precisely, we treat of the attractors from these problems, we seek understand the dependence these asymptotic set of states in relationship the parameter, investigating continuity with rate. The program that we will follow to prove the continuity of the attractors with rate well as the entire structure, we show that these semigroups possess strong exponential dissipative properties Atratores Continuidade Domínio Dumbbell Equações de reação-difusão Taxa Attractors continuity Dumbbell domains Rate Reaction-difusion equation
42	Continuity and generalized continuity in dynamics and other applications Mimna, Roy Allan January 2002 (has links) The topological dynamics of continuous and noncontinuous dynamical systems are investigated. Various definitions of chaos are studied, as well as notions of stability. Results are obtained on asymptotically stable sets and the perturbation stability of such sets. The primary focus is on the traditional point sets of topological dynamics, including the chain recurrent set, omega-limit sets and attractors. The basic setting is that of a continuous function on a compact metric space, sometimes with additional properties on the space. The investigation includes results on the dynamical properties of typical continuous functions in the sense of Baire category. Results are also developed concerning dynamical systems involving quasi-continuous functions. An invariance property for the omega-limit sets of such functions is given. Omega-limit sets are characterized for Riemann integrable derivatives and derivatiyes which are continuous almost everywhere. Techniques used in the investigation and formulation of results include finding theorems which relate the rather disparate notions of dynamical properties and generalized continuity. In addition to dynamical systems, numerous other applications of generalized continuity are imoestigated. Techniques used include application of the Baire Category Theorem and the notion of semi-closure. For example, results are formulated concerning functions determined by dense sets, including separately continuous functions, thus generalizing the classical result for continuous functions on dense subsets of the domain. The uniform boundedness theorem is extended to functions which are not necessarily continuous, including various derivatives. The closed graph theorem is strictly generalized in two separate ways, and applications are presented using these generalizations. An invariance property of separately continuous functions is given. Cluster sets are studied in connection with separate continuity, and various results are presented concerning locally bounded functions. Topological dynamics -- Research Perturbation (Mathematics) Attractors (Mathematics) Baire classes Mathematics -- Research
43	Influência dos atratores sociais nas dinâmicas organizacionais: um estudo em arranjos produtivos locais / The social attractors\' influence in organizational dynamics: a case study in Local Productive Arrangement Gabriela Lemos Reis Figueiredo Querino 04 July 2018 (has links) Diante da crescente competição no mercado e as mudanças constantes que vêm ocorrendo, as empresas tiveram que elaborar novas estratégias e pensar a partir de novas lentes. A nova estruturação das organizações como a formação de redes e arranjos produtivos, é consequência dessas mudanças que as organizações vêm enfrentando devido ao mundo globalizado e a concorrência que aumenta a cada dia. Nesse contexto, o presente trabalho tem como objetivo investigar como os atratores sociais moldam as dinâmicas organizacionais em Arranjos Produtivos Locais. A pesquisa teve como objeto de estudo os APL\'s de Ibitinga, Juruaia e Grande ABC. A metodologia teve abordagem qualitativa com caráter exploratório, e quanto aos meios é classificada como pesquisa documental, pesquisa de campo e estudo de múltiplos casos. Os dados foram coletados por meio de entrevistas baseada na ténica de incidente crítico e coleta documental. Para a análise de dados foi utilizada a técnica de análise de conteúdo e análise documental. Foi identificado o sistema técnico como o principal atrator social, com particular destaque à importância das lideranças e dos sistemas sociais no desenvolvimento e aperfeiçoamento dos arranjos produtivos em tela. / In front of the market competition\'s increases and its constant changes that have been occurring, companies had to develop new strategies and think from new point of view. The new organization structuring like build networking and productive arrangements, is consequence of changes that those organizations are facing due the globalization and the competition that increases day by day. In this context, this paper has an objective investigate how the social attractors fits the organizational dynamics on Local Productive Arrangements. The research has Ibitinga, Juruaia and Grande ABC\'s LPAs as study object. The methodology has qualitative approach with an exploratory character, and as to means classified as documental research, field research and multiple cases. The data was collected through interview based on the critical incident technique and documentary collection technique. To the data analysis was used the technique of content analysis and documental analysis. Was identified the technical system as the main social attractor, with particular emphasis to the importance of the leadership and the social systems on development and improvement of the productive arrangements in the screen.
44	Stability and Switchability in Recurrent Neural Networks Perumal, Subramoniam January 2008 (has links) No description available. Computer Science Engineering recurrent neural networks core-periphery networks switchability switching between attractors stability and switchability
45	Robust Encoding of Aperiodic Spatiotemporal Activity Patterns in Recurrent Neural Networks Afzal, Muhammad Furqan 06 June 2016 (has links) No description available. Neurology scaffolded attractors attractor dynamics motor control spatiotemporal patterns motor synergies
46	Dimension and measure theory of self-similar structures with no separation condition Farkas, Ábel January 2015 (has links) We introduce methods to cope with self-similar sets when we do not assume any separation condition. For a self-similar set K ⊆ ℝᵈ we establish a similarity dimension-like formula for Hausdorff dimension regardless of any separation condition. By the application of this result we deduce that the Hausdorff measure and Hausdorff content of K are equal, which implies that K is Ahlfors regular if and only if Hᵗ (K) > 0 where t = dim[sub]H K. We further show that if t = dim[sub]H K < 1 then Hᵗ (K) > 0 is also equivalent to the weak separation property. Regarding Hausdorff dimension, we give a dimension approximation method that provides a tool to generalise results on non-overlapping self-similar sets to overlapping self-similar sets. We investigate how the Hausdorff dimension and measure of a self-similar set K ⊆ ℝᵈ behave under linear mappings. This depends on the nature of the group T generated by the orthogonal parts of the defining maps of K. We show that if T is finite then every linear image of K is a graph directed attractor and there exists at least one projection of K such that the dimension drops under projection. In general, with no restrictions on T we establish that Hᵗ (L ∘ O(K)) = Hᵗ (L(K)) for every element O of the closure of T , where L is a linear map and t = dim[sub]H K. We also prove that for disjoint subsets A and B of K we have that Hᵗ (L(A) ∩ L(B)) = 0. Hochman and Shmerkin showed that if T is dense in SO(d; ℝ) and the strong separation condition is satisfied then dim[sub]H (g(K)) = min {dim[sub]H K; l} for every continuously differentiable map g of rank l. We deduce the same result without any separation condition and we generalize a result of Eroğlu by obtaining that Hᵗ (g(K)) = 0. We show that for the attractor (K1, … ,Kq) of a graph directed iterated function system, for each 1 ≤ j ≤ q and ε > 0 there exists a self-similar set K ⊆ Kj that satisfies the strong separation condition and dim[sub]H Kj - ε < dim[sub]H K. We show that we can further assume convenient conditions on the orthogonal parts and similarity ratios of the defining similarities of K. Using this property we obtain results on a range of topics including on dimensions of projections, intersections, distance sets and sums and products of sets. We study the situations where the Hausdorff measure and Hausdorff content of a set are equal in the critical dimension. Our main result here shows that this equality holds for any subset of a set corresponding to a nontrivial cylinder of an irreducible subshift of finite type, and thus also for any self-similar or graph directed self-similar set, regardless of separation conditions. The main tool in the proof is an exhaustion lemma for Hausdorff measure based on the Vitali's Covering Theorem. We also give several examples showing that one cannot hope for the equality to hold in general if one moves in a number of the natural directions away from `self-similar'. Finally we consider an analogous version of the problem for packing measure. In this case we need the strong separation condition and can only prove that the packing measure and δ-approximate packing pre-measure coincide for sufficiently small δ > 0. 511.3
47	Continuidade de atratores para sistemas dinâmicos: decomposição de Morse, equi-atração e domínios ilimitados / Continuity of attractors for dynamical systems: Morse decompositions, equiattraction and unbounded domains Costa, Henrique Barbosa da 28 July 2016 (has links) Neste trabalho estudamos a dinâmica assintótica de problemas parabólicos sob vista de diferentes teorias, particularmente interessados na estabilidade das propriedades dinâmicas dos sistemas. Estudamos a equi-atração no caso não autônomo pelos semifluxos skew-product, que transformam o sistema dinâmico não autônomo em um autônomo num espaço de fase conveniente. Para modelos multívocos, em que o semifluxo é uma função cujos valores são conjuntos, desenvolvemos a decomposição de Morse e mostramos sua equivalência com a existência de um funcional de Lyapunov, que é um resultado muito importante na teoria de semigrupos. Também estudamos a continuidade da dinâmica assintótica de um problema parabólico em um domínio ilimitado quando o aproximamos por domínios limitados específicos. / In this work we study assimptotic properties of parabolic problems under some different view of points, particularlly interested in the stability properties of the systems. We study equi-attraction in the non autonomous case using skew-product semiflows, which transform the non autonomous dynamical system into a autonomous one in a convenient phase space. For multivalued semiflows, in which the semiflow is a set valued function, we develop the Morse decomposition and show its equivalence with admiting a Lyapunov funcional, wich is a important result on the semigroup theory. We also study the continuity of the asymptotic dynamic for a parabolic problem in an unbouded domain when we approach it by bounded ones. Atratores Attractors Chafee-Infate equation Continuidade de atratores. Continuity of attractors. Decomposição de Morse Equação de Chafee-Infante Equiatração Equiattraction Espaços uniformemente locais Locally uniform spaces Morse decomposition Multivalued semiflows Semi-fluxos skew-product Semifluxos multívocos Skew-product semiflows
48	Continuidade de atratores para sistemas dinâmicos: decomposição de Morse, equi-atração e domínios ilimitados / Continuity of attractors for dynamical systems: Morse decompositions, equiattraction and unbounded domains Henrique Barbosa da Costa 28 July 2016 (has links) Neste trabalho estudamos a dinâmica assintótica de problemas parabólicos sob vista de diferentes teorias, particularmente interessados na estabilidade das propriedades dinâmicas dos sistemas. Estudamos a equi-atração no caso não autônomo pelos semifluxos skew-product, que transformam o sistema dinâmico não autônomo em um autônomo num espaço de fase conveniente. Para modelos multívocos, em que o semifluxo é uma função cujos valores são conjuntos, desenvolvemos a decomposição de Morse e mostramos sua equivalência com a existência de um funcional de Lyapunov, que é um resultado muito importante na teoria de semigrupos. Também estudamos a continuidade da dinâmica assintótica de um problema parabólico em um domínio ilimitado quando o aproximamos por domínios limitados específicos. / In this work we study assimptotic properties of parabolic problems under some different view of points, particularlly interested in the stability properties of the systems. We study equi-attraction in the non autonomous case using skew-product semiflows, which transform the non autonomous dynamical system into a autonomous one in a convenient phase space. For multivalued semiflows, in which the semiflow is a set valued function, we develop the Morse decomposition and show its equivalence with admiting a Lyapunov funcional, wich is a important result on the semigroup theory. We also study the continuity of the asymptotic dynamic for a parabolic problem in an unbouded domain when we approach it by bounded ones. Atratores Continuidade de atratores. Decomposição de Morse Equação de Chafee-Infante Equiatração Espaços uniformemente locais Semi-fluxos skew-product Semifluxos multívocos Attractors Chafee-Infate equation Continuity of attractors. Equiattraction Locally uniform spaces Morse decomposition Multivalued semiflows Skew-product semiflows
49	Semicontinuidade inferior de atratores para problemas parabólicos em domínios finos / Lower semicontinuity of attactors for parabolic problems in thin domains Silva, Ricardo Parreira da 30 October 2007 (has links) Neste trabalho estudamos problemas de reação-difusão semilineares do tipo \'u IND..t(x, t) = \'DELTA\'u(x, t)+ f (u(x, t)), x \'PERTENCE A\' \'OMEGA\' \'PARTIAL\' U/\'PARTIAL\'V (x, t) = 0, x \'PERTENCE A\' \'PARTIAL\'\' OMEGA\'. Desenvolvemos uma teoria abstrata para a obtenção da continuidade da dinâmica assintótica de (P) sob perturbações singulares do domínio espacial W e aplicamos a uma série de exemplos dos assim chamados domínios finos / In this work we study semilinear reaction-diffusion problems of the type \'u IND.t(x, t) = \'DELTA\'u(x, t)+ f (u(x, t)), x \' PERTENCE A\' \'OMEGA\' \'PARTIAL\'u/\'ARTIAL\' v (x, t) = 0, x \"PERTENCE A\' \'PARTIAL\' \' OMEGA\' We develop a abstract theory to obtain the continuity of the asymptotic dynamics of (P) under singular perturbations of the spatial domain W and we apply that to many examples in thin domains Asymptotic behaviour Atratores Attractors comportamento assintótico Domínios finos Equações de reação-difusão Lower semicontinuity Reaction-diffusion equations Semicontinuidade inferior Thin domains
50	Long-time dynamics of two classes of beam and plate equations / Dinâmica a longo prazo de duas classes de equações de viga e placa Monteiro, Rodrigo Nunes 01 April 2016 (has links) In this thesis we will discuss the well-posedness and long-time dynamics of curved beam and thermoelastic plates. First, we considered the Bresse system with nonlinear damping and forcing terms. For this model we show the Timoshenko system as a singular limit of the Bresse system as the arch curvature l goes to 0 and under suitable assumptions on the nonlinearity we prove the existence of a smooth global attractor with finite fractal dimension and exponential attractors as well. We also compare the Bresse system with the Timoshenko system, in the sense of upper-semicontinuity of their attractors as l → 0. Second, we study a full von Karman system, this model accounts for vertical and in plane displacements. For this system we add a nonlinear thermal coupling and free boundary conditions. It is shown that the system, without any mechanical dissipation imposed on vertical displacements, admits a global attractor which is also smooth and of finite fractal dimension. / Neste trabalho iremos discutir a existência, unicidade, dependência contínua e a dinâmica a longo prazo das soluções de um sistema de equações que modela a vibração de vigas curvas e um modelo de placas termoelásticas. Primeiro consideramos o modelo de Bresse com dissipação não linear e forças externas. Provamos que o sistema de Timoshenko pode ser obtido como limite do sistema de Bresse quando o arco de curvatura l tende para zero e sob algumas hipóteses, mostramos a existência de um atrator global com dimensão fractal finita. Também comparamos o sistema de Bresse com o sistema de Timoshenko no sentido da semicontinuidade de seus atratores quando o parâmetro l → 0. Na segunda parte estudamos o sistema de full Von Karmam. Neste modelo adicionamos efeitos térmicos e condições de fronteira do tipo livre. Mostramos que esse problema, sem dissipação mecânica no deslocamento vertical, também possui um atrator global regular com dimensão infinita. Atrator exponencial Atrator global Equações diferenciais parciais Exponential attractors Global attractor Partial differential equations Semicontinuidade Termoelásticidade. Thermoelasticity Upper-semicontinuity

Search results