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Brownian Motion in a Vector Space over a Local Field is a Scaling Limit

Published 3 May 2024 in math.PR | (2405.02502v1)

Abstract: For any natural number $d$, the Vladimirov-Taibleson operator is a natural analogue of the Laplace operator for complex-valued functions on a $d$-dimensional vector space $V$ over a local field $K$. Just as the Laplace operator on $L2(\mathbb Rd)$ is the infinitesimal generator of Brownian motion with state space $\mathbb Rd$, the Vladimirov-Taibleson operator on $L2(V)$ is the infinitesimal generator of real-time Brownian motion with state space $V$. This study deepens the formal analogy between the two types of diffusion processes by demonstrating that both are scaling limits of discrete-time random walks on a discrete group. It generalizes the earlier works, which restricted $V$ to be the $p$-adic numbers.

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