Large deviation principle for the streams and the maximal flow in first passage percolation

Abstract

We consider the standard first passage percolation model in the rescaled lattice Zd for d≥ 2 and a bounded domain in R d. We denote by 1 and 2 two disjoint subsets of ∂ representing respectively the source and the sink, i.e., where the water can enter in and escape from . A maximal stream is a vector measure μnmax that describes how the maximal amount of fluid can enter through 1 and spreads in . Under some assumptions on and G, we already know a law of large number for μnmax. The sequence (μnmax)n≥ 1 converges almost surely to the set of solutions of a continuous deterministic problem of maximal stream in an anisotropic network. We aim here to derive a large deviation principle for streams and deduce by contraction principle the existence of a rate function for the upper large deviations of the maximal flow in .