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International Conference Dedicated to the 100th Anniversary of the Birthday of V. S. Vladimirov (Vladimirov-100)
January 9, 2023 12:00–12:30, Moscow, Steklov Mathematical Institute, room 430 (Gubkina 8) + Zoom
 


Components and Exit Times of Brownian Motion in two or more $p$-Adic Dimensions

D. Weisbart

University of California, Riverside
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Abstract: The fundamental solution of a pseudo-differential equation for functions defined on the $d$-fold product of the $p$-adic numbers, $\mathbb{Q}_p$, induces an analogue of the Wiener process in $\mathbb{Q}_p^d$. As in the real setting, the components are $1$-dimensional $p$-adic Brownian motions with the same diffusion constant and exponent as the original process. Asymptotic analysis of the conditional probabilities shows that the vector components are dependent for all time. Exit time probabilities for the higher dimensional processes reveal a concrete effect of the component dependency.

Language: English
 
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