Stochastic Komatu-Loewner evolutions and SLEs

Abstract

Let D= H j=1N Cj be a standard slit domain, where H is the upper half plane and Cj,1 j N, are mutually disjoint horizontal line segments in H. A stochastic Komatu-Loewner evolution denoted by SKLEα,b has been introduced in CF as a family \Ft\ of random growing hulls with Ft⊂ D driven by a diffusion process (t) on ∂ H that is determined by certain continuous homogeneous functions α and b defined on the space S of all labelled standard slit domains. We aim at identifying the distribution of a suitably reparametrized SKLEα,b with that of the Loewner evolution on H driven by the path of a certain continuous semimartingale and thereby relating the former to the distribution of SLEα2 when α is a constant. We then prove that, when α is a constant, SKLEα,b up to some random hitting time and modulo a time change has the same distribution as SLEα2 under a suitable Girsanov transformation. We further show that a reparametrized SKLE6,-b BMD has the same distribution as SLE6, where b BMD is the BMD-domain constant indicating the discrepancy of D from H relative to Brownian motion with darning (BMD in abbreviation). A key ingredient of the proof is a hitting time analysis for the absorbing Brownian motion on H. We also revisit and examine the locality property of SLE6 in several canonical domains. Finally K-L equations and SKLEs for other canonical multiply connected planar domains than the standard slit one are recalled and examined.