Brownian Motion in the $p$-Adic Integers is a Limit of Discrete Time Random Walks

TL;DR

This paper demonstrates that the $p$-adic Brownian motion, generated by the Vladimirov-Kochubei operator, can be approximated as a limit of discrete-time random walks, enhancing understanding of ultrametric diffusion.

Contribution

It shows that $p$-adic Brownian motion is a limit of discrete random walks, providing new insights into ultrametric diffusion and stochastic processes on profinite groups.

Findings

Brownian motion in $ ext{Z}_p$ is a limit of discrete random walks

Provides intuition about ultrametric diffusion properties

Illustrates weak convergence of processes in profinite groups

Abstract

Vladimirov defined an operator on balls in $\mathbb Q_p$, the $p$-adic numbers, that is analogous to the Laplace operator in the real setting. Kochubei later provided a probabilistic interpretation of the operator. This Vladimirov-Kochubei operator generates a real-time diffusion process in the ring of $p$-adic integers, a Brownian motion in $\mathbb Z_p$. The current work shows that this process is a limit of discrete time random walks. It motivates the construction of the Vladimirov-Kochubei operator, provides further intuition about the properties of ultrametric diffusion, and gives an example of the weak convergence of stochastic processes in a profinite group.