Duality of Chordal SLE, II

Abstract

We improve the geometric properties of SLE(;) processes derived in an earlier paper, which are then used to obtain more results about the duality of SLE. We find that for ∈ (4,8), the boundary of a standard chordal SLE() hull stopped on swallowing a fixed x∈\0\ is the image of some SLE(16/;) trace started from a random point. Using this fact together with a similar proposition in the case that 8, we obtain a description of the boundary of a standard chordal SLE() hull for >4, at a finite stopping time. Finally, we prove that for >4, in many cases, the limit of a chordal or strip SLE(;) trace exists.