SLE Loop Measures

Abstract

We use Minkowski content (i.e., natural parametrization) of SLE to construct several types of SLE loop measures for ∈(0,8). First, we construct rooted SLE loop measures in the Riemann sphere C, which satisfy M\"obius covariance, conformal Markov property, reversibility, and space-time homogeneity, when the loop is parametrized by its (1+ 8)-dimensional Minkowski content. Second, by integrating rooted SLE loop measures, we construct the unrooted SLE loop measure in C, which satisfies M\"obius invariance and reversibility. Third, we extend the SLE loop measures from C to subdomains of C and to two types of Riemann surfaces using Brownian loop measures, and obtain conformal invariance or covariance of these measures. Finally, using a similar approach, we construct SLE bubble measures in simply/multiply connected domains rooted at a boundary point. The SLE loop measures for ∈(0,4] give examples of Malliavin-Kontsevich-Suhov loop measures for all c 1. The space-time homogeneity of rooted SLE loop measures in C answers a question raised by Greg Lawler.