Refined regularity of SLE

Abstract

We prove refined (variation and H\"older-type) regularity statements for the SLE trace (under capacity parametrisation). More precisely, we show that the trace has finite -variation for (x) = xd( 1/x)-d- and H\"older-type modulus (t) = tα( 1/t)β where d and α are the optimal p-variation and H\"older exponents of SLE which have been previously identified by Viklund, Lawler (2011) and Friz, Tran (2017). For SLE8, we simplify a step in the proof by Kavvadias, Miller, and Schoug (2021), and get the modulus (t) = ( 1/t)-1/4( 1/t)2+. Finally, for 8, we prove regularity estimates for the uniformising maps that hold uniformly in time, namely t | ft'(u+iv)| v2α-1( 1/v)β in case >8 and v-1( 1/v)-1/4( 1/v)1+ in case =8. Our results are obtained from analysing the forward Loewner differential equation (in contrast to the other mentioned works which analyse the backward equation).