Regularity of the Schramm-Loewner evolution: Up-to-constant variation and modulus of continuity

Abstract

We find optimal (up to constant) bounds for the following measures for the regularity of the Schramm-Loewner evolution (SLE): variation regularity, modulus of continuity, and law of the iterated logarithm. For the latter two we consider the SLE with its natural parametrisation. More precisely, denoting by d∈(0,2] the dimension of the curve, we show the following. 1. The optimal -variation is (x)=xd( x-1)-(d-1) in the sense that η is a.s. of finite -variation for this and not for any function decaying more slowly as x 0. 2. The optimal modulus of continuity is ω(s) = c\,s1/d( s-1)1-1/d, i.e. for some random c>0 we have |η(t)-η(s)| ω(t-s) a.s., while this does not hold for any function ω decaying faster as s 0. 3. t 0 |η(t)|\,(t1/d( t-1)1-1/d)-1 is a.s. equal to a deterministic constant in (0,∞). We also show that the natural parametrisation of SLE is given by the fine mesh limit of the -variation. As part of our proof, we show that every stochastic process whose increments satisfy a particular moment condition attains a certain variation regularity.

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