Suspensões de Poisson, ergodicidade e o teorema central do limite
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Data
2013-09-11
Autores
Lenarduzzi, Fernando Nera [UNESP]
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Editor
Universidade Estadual Paulista (Unesp)
Resumo
O objetivo principal deste trabalho e estudar os resultados apresentados por R. Zeimuller em Poisson Suspensions of Compactly Regenerative Transformations[Z0]. Neste artigo, partindo de um espaço de medida σ-finito (X;A;μ) com uma transformação ergódica T, o autor consideração de T em poeiras enumeráveis de pontos, o que define uma transformação T num espaço de probabilidade ~ X. Será mostrado que ~ T e invariante e ergódica para uma medida ~μ em ~ X, que est a relacionada com estes conjuntos enumer aveis de pontos. Apesar de não valer o teorema de Birkhoff para o espaço inicial (X;A;μ ) que tem medida infinita, vale a convergência das médias ergódicas neste novo espaço, o que permite recuperar a medida de um conjunto A em termos do número de visitas a A se forem consideradas órbitas de conjuntos enumeráveis ~ μ-típicos ao invés de olhar para a órbita de um só ponto. São estabelecidas ainda condições suficientes para obter um Teorema Central do Limite que acompanha o teorema ergódico de Birkhoff para ~Sn . Também em faremos um breve estudo sobre conservatividade de aplicações em espa ços σ-nito com medida total infinita, taxa de errância de conjuntos de medida positiva e medida aleatória de Poisson
The main purpose of this work is to understand the results presented by R. Zeimuller on his paper Poisson Suspensions of Compactly Regenerative Transformati-ons[Z0]. In this paper, considering σ- nite space (X;A;μ) and a ergodic transformation T, the author considers the action of T on a countable ensemble of points, which de nes a transformation ~ acting on another probability space ~ X. It will be proved that ~ T is invariant and ergodic for a measure ~μ on ~ X, which is related to this countable set of points. We know that Birkhoff's ergodic theorem is not valid on its classical formulation to a in nite measure space (X;A;μ), however we have the convergence of the ergodic means on this new space. This allows us to, somehow, recover the measure of a given set A just looking at the number of its visits considering the orbits of a ~ μ-typical coun-table set instead of looking at the orbit of one single point. It is also established some su cient conditions in order to get a Central Limit Theorem for ~ Sn . We'll also make a brief discussion on conservativity of maps on σ-finite spaces with full measure in nity, wandering rate of positive measure and Poisson random measure. We'll also make a brief discussion on conservativity of maps on σ-finite spaces with full measure in nity, wandering rate of positive measure and Poisson random measure
The main purpose of this work is to understand the results presented by R. Zeimuller on his paper Poisson Suspensions of Compactly Regenerative Transformati-ons[Z0]. In this paper, considering σ- nite space (X;A;μ) and a ergodic transformation T, the author considers the action of T on a countable ensemble of points, which de nes a transformation ~ acting on another probability space ~ X. It will be proved that ~ T is invariant and ergodic for a measure ~μ on ~ X, which is related to this countable set of points. We know that Birkhoff's ergodic theorem is not valid on its classical formulation to a in nite measure space (X;A;μ), however we have the convergence of the ergodic means on this new space. This allows us to, somehow, recover the measure of a given set A just looking at the number of its visits considering the orbits of a ~ μ-typical coun-table set instead of looking at the orbit of one single point. It is also established some su cient conditions in order to get a Central Limit Theorem for ~ Sn . We'll also make a brief discussion on conservativity of maps on σ-finite spaces with full measure in nity, wandering rate of positive measure and Poisson random measure. We'll also make a brief discussion on conservativity of maps on σ-finite spaces with full measure in nity, wandering rate of positive measure and Poisson random measure
Descrição
Palavras-chave
Sistemas dinâmicos diferenciais, Teoria ergodica, Transformações (Matemática), Differentiable dynamical systems
Como citar
LENARDUZZI, Fernando Nera. Suspensões de Poisson, ergodicidade e o teorema central do limite. 2013. 50 f. Dissertação (mestrado) - Universidade Estadual Paulista Julio de Mesquita Filho. Instituto de Biociências, Letras e Ciências Exatas, 2013.