Percolation of random nodal lines

Abstract

We prove a Russo-Seymour-Welsch percolation theorem for nodal domains and nodal lines associated to a natural infinite dimensional space of real analytic functions on the real plane. More precisely, let U be a smooth connected bounded open set in R2 and γ, γ' two disjoint arcs of positive length in the boundary of U. We prove that there exists a positive constant c, such that for any positive scale s, with probability at least c there exists a connected component of \x∈ U, \, f(sx) 0\ intersecting both γ and γ', where f is a random analytic function in the Wiener space associated to the real Bargmann-Fock space. For s large enough, the same conclusion holds for the zero set \x∈ U, \, f(sx) = 0\ . As an important intermediate result, we prove that sign percolation for a general stationary Gaussian field can be made equivalent to a correlated percolation model on a lattice.