Universality of Noise Reinforced Brownian Motions

Abstract

A noise reinforced Brownian motion is a centered Gaussian process B=( B(t))t≥ 0 with covariance E( B(t) B(s))=(1-2p)-1tps1-p for 0≤ s ≤ t, where p∈(0,1/2) is a reinforcement parameter. Our main purpose is to establish a version of Donsker's invariance principle for a large family of step-reinforced random walks in the diffusive regime, and more specifically, to show that B arises as the universal scaling limit of the former. This extends known results on the asymptotic behavior of the so-called elephant random walk.