Scaling limits of the single-curve interface and outermost loops in the planar random field Ising model

Abstract

We prove that the interface separating +1 and -1 spins in the near-critical planar random field Ising model (RFIM) with Dobrushin boundary conditions has a scaling limit, whose law is conformally covariant and almost surely absolutely continuous with respect to SLE3. The limiting curve can be seen as a massive version of SLE3 in the sense of Makarov and Smirnov, but in a random environment. We then show that the outermost spin loops of the near-critical planar RFIM with +1 boundary conditions have subsequential limits and that any of these limits is almost surely singular with respect to CLE3. This dichotomy between absolute continuity of the single interface and singularity of the outermost loops reflects the fact that a single interface does not explore enough of the magnetization field of the near-critical RFIM to detect the singularity of this field with respect to the critical Ising magnetization field, whereas the outermost spin loops do.