Convergence to the Tracy-Widom distribution for longest paths in a directed random graph

Abstract

We consider a directed graph on the 2-dimensional integer lattice, placing a directed edge from vertex (i1,i2) to (j1,j2), whenever i1 j1, i2 j2, with probability p, independently for each such pair of vertices. Let Ln,m denote the maximum length of all paths contained in an n × m rectangle. We show that there is a positive exponent a, such that, if m/na 1, as n ∞, then a properly centered/rescaled version of Ln,m converges weakly to the Tracy-Widom distribution. A generalization to graphs with non-constant probabilities is also discussed.