English

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

Probability 2020-05-05 v2

Abstract

We prove that for κ(0,8)\kappa\in(0,8), if (η1,η2)(\eta_1,\eta_2) is a 22-SLEκ_\kappa pair in a simply connected domain DD with an analytic boundary point z0z_0, then limr0+rαP[\mboxdist(z0,ηj)<r,j=1,2]\lim_{r\to 0^+}r^{-\alpha} \mathbb{P}[\mbox{dist}(z_0,\eta_j)<r,j=1,2] converges to a positive number for some α>0\alpha>0, which is called the two-curve Green's function. The exponent α\alpha equals 12κ1\frac{12}{\kappa}-1 or 2(12κ1)2(\frac{12}{\kappa}-1) depending on whether z0z_0 is one of the endpoints of η1\eta_1 and η2\eta_2. We also find the convergence rate and the exact formula of the Green's function up to a multiplicative constant. To derive these results, we construct two-dimensional diffusion processes and use orthogonal polynomials to obtain their transition density.

Cite

@article{arxiv.1901.00254,
  title  = {Two-curve Green's function for $2$-SLE: the boundary case},
  author = {Dapeng Zhan},
  journal= {arXiv preprint arXiv:1901.00254},
  year   = {2020}
}

Comments

62 pages

R2 v1 2026-06-23T07:01:03.513Z