JOURNAL ARTICLE
Functional Gaussian approximations on Hilbert-Poisson spaces
Solesne BourguinSimon CampeseThanh Dang
Year: 2024 Journal: Latin American Journal of Probability and Mathematical Statistics Vol: 21 (1)Pages: 517-517
Abstract
We develop a functional Stein-Malliavin method in a non-diffusive Poissonian setting, thus obtaining a) quantitative central limit theorems for approximation of arbitrary non-degenerate Gaussian random elements taking values in a separable Hilbert space and b) fourth moment bounds for approximating sequences with finite chaos expansion.Our results rely on an infinite-dimensional version of Stein's method of exchangeable pairs combined with the so-called Gamma calculus.Two applications are included: Brownian approximation of Poisson processes in Besov-Liouville spaces and a functional limit theorem for an edge-counting statistic of a random geometric graph.
Keywords:
Poisson distribution Gaussian Hilbert space Mathematics Applied mathematics Mathematical analysis Statistical physics Statistics Physics Quantum mechanics
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Topics
Approximation Theory and Sequence Spaces
Physical Sciences → Mathematics → Statistics and Probability
Mathematical functions and polynomials
Physical Sciences → Mathematics → Applied Mathematics
Stochastic processes and financial applications
Social Sciences → Economics, Econometrics and Finance → Finance
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