Optimal H\"older Continuity and Dimension Properties for SLE with Minkowski Content Parametrization

Abstract

We make use of the fact that a two-sided whole-plane Schramm-Loewner evolution (SLE) curve γ for ∈(0,8) from ∞ to ∞ through 0 may be parametrized by its d-dimensional Minkowski content, where d=1+ 8, and become a self-similar process of index 1d with stationary increments. We prove that such γ is locally α-H\"older continuous for any α< 1d. In the case ∈(0,4], we show that γ is not locally 1d-H\"older continuous. We also prove that, for any deterministic closed set A⊂ R, the Hausdorff dimension of γ(A) almost surely equals d times the Hausdorff dimension of A.