Author: "Durieu, Olivier" / Topic: 60g10 - Searchworks@Jio Institute Digital Library Search Results

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Start Over Author "Durieu, Olivier" Topic 60g10

Author: Durieu, Olivier and Volny, Dalibor
Subjects: Mathematics - Dynamical Systems, Mathematics - Probability, 28D05, 37A50, 60F05, 60G10
Abstract: In this paper, we are interested in the limit theorem question for sums of indicator functions. We show that in every aperiodic dynamical system, for every increasing sequence $(a_n)_{n\in\N}\subset\R_+$ such that $a_n\nearrow\infty$ and $\frac{a_n}{n}\to 0$ as $n\to\infty$, there exists a measurable set $A$ such that the sequence of the distributions of the partial sums $\frac{1}{a_n}\sum_{i=0}^{n-1}(\ind_A-\mu(A))\circ T^i$ is dense in the set of the probability measures on $\R$. Further, in the ergodic case, we prove that there exists a dense $G_\delta$ of such sets.
Published: 2008

Author: Durieu, Olivier and Volny, Dalibor
Subjects: Mathematics - Dynamical Systems, Mathematics - Probability, 28D05, 60F05, 60G10
Abstract: We show by a constructive proof that in all aperiodic dynamical system, for all sequences $(a_n)_{n\in\N}\subset\R_+$ such that $a_n\nearrow\infty$ and $\frac{a_n}{n}\to 0$ as $n\to\infty$, there exists a set $A\in\A$ having the property that the sequence of the distributions of $(\frac{1}{a_{n}}S_{n}(\ind_A-\mu(A)))_{n\in\N}$ is dense in the space of all probability measures on $\R$.
Published: 2008

Author: Durieu, Olivier
Subjects: Mathematics - Probability, 60G10, 60F17, 62G30, 28D05
Abstract: In this paper, a fourth moment bound for partial sums of functional of strongly ergodic Markov chain is established. This type of inequality plays an important role in the study of empirical process invariance principle. This one is specially adapted to the technique of Dehling, Durieu and Voln\'y (2008). The same moment bound can be proved for dynamical system whose transfer operator has some spectral properties. Examples of applications are given.
Published: 2008

Author: Dehling, Herold, Durieu, Olivier, and Volný, Dalibor
Subjects: Mathematics - Probability, Mathematics - Statistics Theory, 60G10, 60F17, 62G30
Abstract: We present a new technique for proving empirical process invariance principle for stationary processes $(X_n)_{n\geq 0}$. The main novelty of our approach lies in the fact that we only require the central limit theorem and a moment bound for a restricted class of functions $(f(X_n))_{n\geq 0}$, not containing the indicator functions. Our approach can be applied to Markov chains and dynamical systems, using spectral properties of the transfer operator. Our proof consists of a novel application of chaining techniques.
Published: 2008

Author: Durieu, Olivier
Subjects: Mathematics - Probability, 60F17, 60G10, 28D05, 60G42
Abstract: Let $(X_i)_{i\in\Z}$ be a regular stationary process for a given filtration. The weak invariance principle holds under the condition $\sum_{i\in\Z}\|P_0(X_i)\|_2<\infty$ (see Hannan (1979)}, Dedecker and Merlev\`ede (2003), Deddecker, Merlev\'ede and Voln\'y (2007)). In this paper, we show that this criterion is independent of other known criteria: the martingale-coboundary decomposition of Gordin (see Gordin (1969, 1973)), the criterion of Dedecker and Rio (see Dedecker and Rio (2000)) and the condition of Maxwell and Woodroofe (see Maxwell and Woodroofe (2000), Peligrade and Utev (2005), Voln\'y (2006, 2007))., Comment: 6 pages
Published: 2008

Author: Durieu, Olivier, Durieu, Olivier, Laboratoire de Mathématiques Raphaël Salem (LMRS), Université de Rouen Normandie (UNIROUEN), and Normandie Université (NU)-Normandie Université (NU)-Centre National de la Recherche Scientifique (CNRS)
Subjects: [MATH.MATH-PR]Mathematics [math]/Probability [math.PR], [MATH.MATH-PR] Mathematics [math]/Probability [math.PR], 28D05, 60F17, Probability (math.PR), FOS: Mathematics, Physics::Atomic Physics, 60G42, 60G10, Mathematics - Probability
Abstract: Let $(X_i)_{i\in\Z}$ be a regular stationary process for a given filtration. The weak invariance principle holds under the condition $\sum_{i\in\Z}\|P_0(X_i)\|_2, Comment: 6 pages
Published: 2009

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