A dimension spectrum for SLE boundary collisions

Abstract

We consider chordal SLE$(\kappa)$ curves for $\kappa > 4$, where the intersection of the curve with the boundary is a random fractal of almost sure Hausdorff dimension $\min(2−8/\kappa,1)$. We study the random sets of points at which the curve collides with the real line at a specified “angle” and compute an almost sure dimension spectrum describing the metric size of these sets. We work with the forward SLE flow and a key tool in the analysis is Girsanov’s theorem, which is used to study events on which moments concentrate. The two-point correlation estimates are proved using the direct method.

Publication
Comm. Math. Phys.
Tom Alberts
Tom Alberts
Associate Professor of Mathematics
University of Utah

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