Two-curve Green's function for 2-SLE: the interior case

Abstract

A 2-SLE (∈(0,8)) is a pair of random curves (η1,η2) in a simply connected domain D connecting two pairs of boundary points such that conditioning on any curve, the other is a chordal SLE curve in a complement domain. In this paper we prove that for any z0∈ D, the limit r 0+r-α0 P[dist(z0,ηj)<r,j=1,2], where α0=(12-)(+4)8, exists. Such limit is called a two-curve Green's function. We find the convergence rate and the exact formula of the Green's function in terms of a hypergeometric function up to a multiplicative constant. For ∈(4,8), we also prove the convergence of r 0+r-α0 P[dist(z0,η1 η2)<r], whose limit is a constant times the previous Green's function. To derive these results, we work on two-time-parameter stochastic processes, and use orthogonal polynomials to derive the transition density of a two-dimensional diffusion process that satisfies some system of SDE.