Extreme local extrema of two-dimensional discrete Gaussian free field

Abstract

We consider the discrete Gaussian Free Field in a square box in Z2 of side length N with zero boundary conditions and study the joint law of its properly-centered extreme values (h) and their scaled spatial positions (x) in the limit as N∞. Restricting attention to extreme local maxima, i.e., the extreme points that are maximal in an rN-neighborhood thereof, we prove that the associated process tends, whenever rN∞ and rN/N0, to a Poisson point process with intensity measure Z(dx)e-α hdh, where α:= 2/g with g:=2/π and where Z(dx) is a random Borel measure on [0,1]2. In particular, this yields an integral representation of the law of the absolute maximum, similar to that found in the context of Branching Brownian Motion. We give evidence that the random measure Z is a version of the derivative martingale associated with the continuum Gaussian Free Field.