English

Universality for SLE(4)

Probability 2010-10-08 v1 Mathematical Physics math.MP

Abstract

We resolve a conjecture of Sheffield that \SLE(4)\SLE(4), a conformally invariant random curve, is the universal limit of the chordal zero-height contours of random surfaces with isotropic, uniformly convex potentials. Specifically, we study the \emph{Ginzburg-Landau ϕ\nabla \phi interface model} or \emph{anharmonic crystal} on Dn=D1nZ2D_n = D \cap \tfrac{1}{n} \Z^2 for D\CD \subseteq \C a bounded, simply connected Jordan domain with smooth boundary. This is the massless field with Hamiltonian \CH(h)=xy\CV(h(x)h(y))\CH(h) = \sum_{x \sim y} \CV(h(x) - h(y)) with \CV\CV symmetric and uniformly convex and h(x)=ϕ(x)h(x) = \phi(x) for xDnx \in \partial D_n, ϕ ⁣:DnR\phi \colon \partial D_n \to \R a given function. We show that the macroscopic chordal contours of hh are asymptotically described by \SLE(4)\SLE(4) for appropriately chosen ϕ\phi.

Keywords

Cite

@article{arxiv.1010.1356,
  title  = {Universality for SLE(4)},
  author = {Jason Miller},
  journal= {arXiv preprint arXiv:1010.1356},
  year   = {2010}
}

Comments

58 pages

R2 v1 2026-06-21T16:25:03.541Z