Large deviation principle for empirical measures of once-reinforced random walks on finite graphs

Abstract

A δ once-reinforced random walk (δ-ORRW) on connected graph is a self-interacting random walk which moves to its neighbors at each step according to the weights of the edges at that time, where the weights are 1 on edges that have not been traversed and δ otherwise. In this paper, we prove a large deviation principle for empirical measures of δ-ORRWs on finite connected graphs using a modified weak convergence approach. The rate function of the large deviation principle exhibits a phase transition at the δ=1.