Factorization Formulas for 2D Critical Percolation, Revisited

Abstract

We consider critical site percolation on the triangular lattice in the upper half-plane. Let u1, u2 be two sites on the boundary and w 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(nu1 nu2 nw)2\,/\,P(nu1 nu2)·P(nu1 nw)·P(nu2 nw) converges to KF as n ∞, where x y denotes the event that x and y are in the same open cluster, and KF 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]), where s>0.