Constrained-degree percolation in random environment

Abstract

We consider the Constrained-degree percolation model in random environment on the square lattice. In this model, each vertex v has an independent random constraint v which takes the value j∈ \0,1,2,3\ with probability j. Each edge e attempts to open at a random uniform time Ue in [0,1], independently of all other edges. It succeeds if at time Ue both its end-vertices have degrees strictly smaller than their respectively attached constraints. We show that this model undergoes a non-trivial phase transition when 3 is sufficiently large. The proof consists of a decoupling inequality, the continuity of the probability for local events, and a coarse-graining argument.