Phase transition on randomly horizontally stretched square lattice

Abstract

In this article, we study a bond percolation model on a horizontally stretched square lattice, constructed by stretching the distances between the columns of Z+2 according to a collection of independent and identically distributed (i.i.d.) copies of a non-negative random variable . We assume that satisfies the integrability condition \[ E[\, ec( )1/2 \,1\ ≥ 1\] < ∞, \] for some constant c > 8 96. In this random environment, each vertical edge is independently declared open with probability p, while each horizontal edge is open with probability p|e|, where |e| denotes the Euclidean length of the edge. We develop a multiscale renormalization scheme adapted to this geometry and use it to prove that percolation occurs for all sufficiently large values of p < 1.