Random concave functions on an equilateral lattice with periodic Hessians I: entropy and Laplacians

Abstract

We show that a random concave function having a periodic hessian on an equilateral lattice has a quadratic scaling limit, if the average hessian of the function satisfies certain conditions. We consider the set of all concave functions g on an equilateral lattice L that when shifted by an element of n L, incur addition by a linear function (this condition is equivalent to the periodicity of the hessian of g). We identify this set, up to addition by a constant, with a convex polytope Pn(s), where s corresponds to the average hessian. We show that the ∞ diameter of Pn(s) is bounded below by c(s) n2, where c(s) is a positive constant depending only on s. Our main result is that, for any ε0 > 0, the normalized Lebesgue measure of all points in Pn(s) that are not contained in a n2 dimensional cube Q of sidelength 2 ε0 n2, centered at the unique (up to addition of a linear term) quadratic polynomial with hessian s, tends to 0 as n tends to ∞.