Strong Approximation of the Anisotropic Random Walk Revisited
Endre Csaki, Antonia Foldes
TL;DR
This paper investigates the path behavior of anisotropic random walks on a 2D lattice, providing strong approximations for its components to better understand their probabilistic properties.
Contribution
It offers new strong approximation results for the components of anisotropic random walks, enhancing understanding of their asymptotic behavior.
Findings
Established simultaneous strong approximations for walk components
Improved understanding of anisotropic walk path behavior
Contributed to probabilistic analysis of lattice-based random walks
Abstract
We study the path behavior of the anisotropic random walk on the two-dimensional lattice Z^2. Simultaneous strong approximations of its components are given.
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