SLE() bubble measures

Abstract

For >0 and >-2, we construct a σ-finite measure, called a rooted SLE() bubble measure, on the space of curves in the upper half plane H started and ended at the same boundary point, which satisfies some SLE()-related domain Markov property, and is the weak limit of SLE() curves in H with the two endpoints both tending to the root. For ∈(0,8) and ∈ ((-2)( 2-4), 2-2), we derive decomposition theorems for the rooted SLE() bubble with respect to the Minkowski content measure of the intersection of the rooted SLE() bubble with R, and construct unrooted SLE() bubble measures.