English

Factorization Formulas for $2D$ Critical Percolation, Revisited

Probability 2015-05-29 v3

Abstract

We consider critical site percolation on the triangular lattice in the upper half-plane. Let u1,u2u_1, u_2 be two sites on the boundary and ww a site in the interior of the half-plane. It was predicted by Simmons, Kleban and Ziff in a paper from 2007 that the ratio P(nu1nu2nw)2/P(nu1nu2)P(nu1nw)P(nu2nw)\mathbb{P}(nu_1 \leftrightarrow nu_2 \leftrightarrow nw)^{2}\,/\,\mathbb{P}(nu_1 \leftrightarrow nu_2)\cdot\mathbb{P}(nu_1 \leftrightarrow nw)\cdot\mathbb{P}(nu_2 \leftrightarrow nw) converges to KFK_F as nn \to \infty, where xyx\leftrightarrow y denotes the event that xx and yy are in the same open cluster, and KFK_F is an explicitly known constant. Beliaev and Izyurov proved in a paper in 2012 an analog of this factorization in the scaling limit. We prove, using their result and a generalized coupling argument, the earlier mentioned prediction. Furthermore we prove a factorization formula for the probability P(nu2[nu1,nu1+s];nw[nu1,nu1+s])\mathbb{P}(nu_2 \leftrightarrow [nu_1,nu_1+s];\, nw \leftrightarrow [nu_1,nu_1+s]), where s>0s>0.

Keywords

Cite

@article{arxiv.1502.04387,
  title  = {Factorization Formulas for $2D$ Critical Percolation, Revisited},
  author = {Rene Conijn},
  journal= {arXiv preprint arXiv:1502.04387},
  year   = {2015}
}

Comments

Final version. To appear in Stochastic Processes and their Applications

R2 v1 2026-06-22T08:30:05.189Z