Green's function for cut points of chordal SLE attached with boundary arcs

Abstract

Let ∈(4,8). Let γ be an SLE curve in a Jordan domain D connecting a1 a2∈∂ D. We attach γ with two open boundary arcs A1,A2 of D, which share end points b1 b2∈∂ D\a1,a2\, and consider for each z0∈ D the limit r 0r1- 38 P[γ A1 A2 has a cut point in \|z-z0|<r\]. We prove that the limit converges, derive a rate of convergence, and obtain the exact formula of the limit up to a multiplicative constant depending only on .