Stable limit laws for random walk in a sparse random environment I: moderate sparsity

Abstract

A random walk in a sparse random environment is a model introduced by Matzavinos et al. [Electron. J. Probab. 21, paper no. 72: 2016] as a generalization of both a simple symmetric random walk and a classical random walk in a random environment. A random walk (Xn)n∈ N\0\ in a sparse random environment (Sk,λk)k∈Z is a nearest neighbor random walk on Z that jumps to the left or to the right with probability 1/2 from every point of Z \…,S-1,S0=0,S1,…\ and jumps to the right (left) with the random probability λk+1 (1-λk+1) from the point Sk, k∈Z. Assuming that (Sk-Sk-1,λk)k∈Z are independent copies of a random vector (,λ)∈ N× (0,1) and the mean E is finite (moderate sparsity) we obtain stable limit laws for Xn, properly normalized and centered, as n∞. While the case ≤ M a.s.\ for some deterministic M>0 (weak sparsity) was analyzed by Matzavinos et al., the case E =∞ (strong sparsity) will be analyzed in a forthcoming paper.