Boundary Green's functions and Minkowski content measure of multi-force-point SLE()

Abstract

We consider a transient chordal SLE(1,…,m) curve η in H from w to ∞ with force points v1> ·s >vm in (-∞,w-], which intersects and is not boundary-filling on (-∞,vm). The main result is that there is an atomless locally finite Borel measure μη on η (-∞,vm] such that for any v<vm, the d-dimensional Minkowski content of η [v,vm] exists and equals μη [v,vm], where d=(Σ j+4)(-4-2Σ j)2 is the Hausdorff dimension of η [v,vm]. In the case that all j=0, this measure agrees with the covariant measure derived in [Alberts-Sheffield, 2011] for chordal SLE up to a multiplicative constant. %Such measure, called Minkowski content measure, satisfies conformal covariance properties. We call such measure a Minkowski content measure, extend it to a class of subsets of Rn, and prove that they satisfy conformal covariance. To construct the Minkowski content measure on η [v,vm], we follow the standard approach to derive the existence and estimates of the one- and two-point boundary Green's functions of η on (-∞,vm), which are the limits of the rescaled probability that η passes through small discs or open real intervals centered at points on (-∞,vm).

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