The natural parametrization for the Schramm-Loewner evolution

Abstract

The Schramm-Loewner evolution (SLE) is a candidate for the scaling limit of random curves arising in two-dimensional critical phenomena. When < 8, an instance of SLE is a random planar curve with almost sure Hausdorff dimension d = 1 + /8 < 2. This curve is conventionally parametrized by its half plane capacity, rather than by any measure of its d-dimensional volume. For < 8, we use a Doob-Meyer decomposition to construct the unique (under mild assumptions) Markovian parametrization of SLE that transforms like a d-dimensional volume measure under conformal maps. We prove that this parametrization is non-trivial (i.e., the curve is not entirely traversed in zero time) for < 4(7 - 33) = 5.021 ....