Reflecting random walks in curvilinear wedges

Abstract

We study a random walk (Markov chain) in an unbounded planar domain whose boundary is described by two curves of the form x2 = a+ x1β+ and x2 = -a- x1β-, with x1 ≥ 0. In the interior of the domain, the random walk has zero drift and a given increment covariance matrix. From the vicinity of the upper and lower sections of the boundary, the walk drifts back into the interior at a given angle α+ or α- to the relevant inwards-pointing normal vector. Here we focus on the case where α+ and α- are equal but opposite, which includes the case of normal reflection. For 0 ≤ β+, β- < 1, we identify the phase transition between recurrence and transience, depending on the model parameters, and quantify recurrence via moments of passage times.