Universality of the geodesic tree in last passage percolation

Abstract

In this paper we consider the geodesic tree in exponential last passage percolation. We show that for a large class of initial conditions around the origin, the line-to-point geodesic that terminates in a cylinder of width o(N2/3) and length o(N) agrees in the cylinder, with the stationary geodesic sharing the same end point. In the case of the point-to-point model, we consider width δ N2/3 and length up to δ3/2 N/((δ-1))3 and provide lower and upper bound for the probability that the geodesics agree in that cylinder.