The Slow Bond Random Walk and the Snapping Out Brownian Motion

Abstract

We consider the continuous time symmetric random walk with a slow bond on Z, which rates are equal to 1/2 for all bonds, except for the bond of vertices \-1,0\, which associated rate is given by α n-β/2, where α≥ 0 and β∈ [0,∞] are the parameters of the model. We prove here a functional central limit theorem for the random walk with a slow bond: if β<1, then it converges to the usual Brownian motion. If β∈ (1,∞], then it converges to the reflected Brownian motion. And at the critical value β=1, it converges to the snapping out Brownian motion (SNOB) of parameter =2α, which is a Brownian type-process recently constructed in Lejay, A., The snapping out Brownian motion. Ann. Appl. Probab., 26(3):1727--1742, 2016. We also provide Berry-Esseen estimates in the dual bounded Lipschitz metric for the weak convergence of one-dimensional distributions, which we believe to be sharp.