English

Multiple Ising interfaces in annulus and $2N$-sided radial SLE

Probability 2024-03-28 v4

Abstract

We consider critical planar Ising model in annulus with alternating boundary conditions on the outer boundary and free boundary conditions in the inner boundary. As the size of the inner hole goes to zero, the event that all interfaces get close to the inner hole before they meet each other is a rare event. We prove that the law of the collection of the interfaces conditional on this rare event converges in total variation distance to the so-called 2N2N-sided radial SLE3_3, introduced by~[HL21]. The proof relies crucially on an estimate for multiple chordal SLE. Suppose (γ1,,γN)(\gamma_1, \ldots, \gamma_N) is chordal NN-SLEκ_{\kappa} with κ(0,4]\kappa\in (0,4] in the unit disc, and we consider the probability that all NN curves get close to the origin. We prove that the limit limr0+rA2NP[dist(0,γj)<r,1jN]\lim_{r\to 0+}r^{-A_{2N}}\mathbb{P}[\mathrm{dist}(0,\gamma_j)<r, 1\le j\le N] exists, where A2NA_{2N} is the so-called 2N2N-arm exponents and dist\mathrm{dist} is Euclidean distance. We call the limit Green's function for chordal NN-SLEκ_{\kappa}. This estimate is a generalization of previous conclusions with N=1N=1 and N=2N=2 proved in~[LR12, LR15] and~[Zha20] respectively.

Cite

@article{arxiv.2302.08124,
  title  = {Multiple Ising interfaces in annulus and $2N$-sided radial SLE},
  author = {Yu Feng and Hao Wu and Lu Yang},
  journal= {arXiv preprint arXiv:2302.08124},
  year   = {2024}
}

Comments

Final version

R2 v1 2026-06-28T08:41:32.679Z