Fluctuations for the Ginzburg-Landau ∇ φ Interface Model on a Bounded Domain

Abstract

We study the massless field on Dn = D 1n 2, where D ⊂eq 2 is a bounded domain with smooth boundary, with Hamiltonian (h) = Σx y (h(x) - h(y)). The interaction is assumed to be symmetric and uniformly convex. This is a general model for a (2+1)-dimensional effective interface where h represents the height. We take our boundary conditions to be a continuous perturbation of a macroscopic tilt: h(x) = n x · u + f(x) for x ∈ ∂ Dn, u ∈ 2, and f 2 continuous. We prove that the fluctuations of linear functionals of h(x) about the tilt converge in the limit to a Gaussian free field on D, the standard Gaussian with respect to the weighted Dirichlet inner product (f,g)∇β = ∫D Σi βi ∂i fi ∂i gi for some explicit β = β(u). In a subsequent article, we will employ the tools developed here to resolve a conjecture of Sheffield that the zero contour lines of h are asymptotically described by SLE(4), a conformally invariant random curve.