Interface scaling limit for the critical planar Ising model perturbed by a magnetic field

Abstract

We prove that the interface separating +1 and -1 spins in the critical planar Ising model with Dobrushin boundary conditions perturbed by an external magnetic field has a scaling limit. This result holds when the Ising model is defined on a bounded and simply connected subgraph of δ Z2, with δ >0. We show that if the scaling of the external field is of order δ15/8, then, as δ 0, the interface converges in law to a random curve whose law is conformally covariant and absolutely continuous with respect to SLE3. This limiting law is a massive version of SLE3 in the sense of Makarov and Smirnov and we give an explicit expression for its Radon-Nikodym derivative with respect to SLE3. We also prove that if the scaling of the external field is of order δ15/8g1(δ) with g1(δ) 0, then the interface converges in law to SLE3. In contrast, we show that if the scaling of the external field is of order δ15/8g2(δ) with g2(δ) ∞, then the interface degenerates to a boundary arc.

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