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21	Invariants semi-locaux des Structures de Poisson Olivier, Brahic 12 November 2004 (has links) (PDF) La donnée d'une structure de Poisson sur une variété induit un feuilletage dont les feuilles sont des variétés symplectiques. En chaque point de la variété, il existe un unique invariant local, donné par la structure transverse. Dans ce travail, on s'intéresse aux invariants de nature emi-locale, c'est à dire associés au germe de la structure le ong d'une sous-variété. On s'interesse à deux cas extrêmes: celui d'une sous-variété de singularités sous des hypothèses génériqus, ainsi que celui du voisinage d'une feuille symplectique. [MATH] Mathematics Géométrie de Poisson
22	Approximation of a class of Markov-modulated Poisson processes with a large state-space. Sitaraman, Hariharakrishnan. January 1989 (has links) Many queueing systems have an arrival process that can be modeled by a Markov-modulated Poisson process. The Markov-modulated Poisson process (MMPP) is a doubly stochastic Poisson process in which the arrival rate varies according to a finite state irreducible Markov process. In many applications of MMPPs, the point process is constructed by superpositions or similar constructions, which lead to modulating Markov processes with a large state space. Since this limits the feasibility of numerical computations, a useful problem is to approximate an MMPP represented by a large Markov process by one with fewer states. We focus our attention in particular, to approximating a simple but useful special case of the MMPP, namely the Birth and Death Modulated Poisson process. In the validation stage, the quality of the approximation is examined in relation to the MMPP/G/1 queue. Queuing theory. Poisson processes.
23	Jump diffusion models in volatility Tassi-Londorfou, Eleftheria January 2002 (has links) No description available. 519 Poisson jumps
24	Screening method 余秋萍, Yu, Chau-ping. January 1993 (has links) published_or_final_version / Applied Statistics / Master / Master of Social Sciences Correlation (Statistics) Poisson distribution.
25	Random polytopes : the generalisation to n dimensions of the intervals of a Poisson process Miles, Roger Edmund January 1964 (has links) No description available. 510 Polytopes ; Poisson processes
26	Ginzburg-Weinstein Isomorphisms for Pseudo-Unitary Groups Lamb, McKenzie Russell January 2009 (has links) Ginzburg and Weinstein proved in [GW92] that for a compact, semisimple Lie group K endowed with the Lu-Weinstein Poisson structure, there exists a Poisson diffeomorphism from the dual Poisson Lie group K* to the dual k* of the Lie algebra of K endowed with the Lie-Poisson structure. We investigate the possibility of extending this result to the pseudo-unitary groups SU (p, q ), which are semisimple but not compact. The main results presented here are the following. (1) The Ginzburg-Weinstein proof hinges on the existence of a certain vector field X on k. We prove that for any p, q, the analogous vector field for the SU (p, q ) case exists on an open subset of k. (2) Each generic dressing orbit ψ(λ) in the Poisson dual AN can be embedded in the complex flag manifold K/T . We show that for SU (1, 1) and SU (1, 2), the induced Poisson structure π(λ) on ψ(λ) extends smoothly to the entire flag manifold. (3) Finally, we prove the Ginzburg-Weinstein theorem for the SU (1, 1) case in two different ways: first, by constructing the vector field X in coordinates and proving that it satisfies the necessary properties, and second, by adapting the approach of [FR96] to the SU (1, 1) case. geometry Lie groups Poisson
27	The multiple-server queue with heterogeneous service times Baxley, Robert Van Namee 08 1900 (has links) No description available. Queuing theory Poisson distribution
28	Some aspects of modelling overdispersed and zero-inflated count data Jansakul, Naratip January 2001 (has links) No description available. 519.5 Poisson regression
29	Occurrence of exceedances in a finite perpetuity Benjamin, Nathanaël Alexandre January 2004 (has links) Generated by stochastic recursions, perpetuities encompass a vast range of discretetime financial behaviours. When focusing on the dramatic changes occurring in such processes, the analysis of threshold exceedances provides an extensive description of their underlying mechanisms. Asymptotically, an exceedance point process tends to a compound Poisson measure, highlighting a tendency to cluster. Now, the parameters of this limit law are known, but complex. Here, an empirical approach is adopted, and a class of explicit compound Poisson models developed, with a bound on the error, for the exceedance point process of a finite, multidimensional perpetuity. In a financial regulatory context, this provides a new way of examining the Value-at-Risk criterion for securities. 519.2 Perpetuities : Poisson manifolds
30	Dynamic measurement and characterization of Poisson's ratio / Lomenzo, Richard A., January 1994 (has links) Thesis (M.S.)--Virginia Polytechnic Institute and State University, 1994. / Vita. Abstract. Includes bibliographical references (leaves 127-128). Also available via the Internet. Materials Aluminum Poisson processes.

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