Conformal removability of SLE4

Abstract

We consider the Schramm-Loewner evolution (SLE) with =4, the critical value of > 0 at or below which SLE is a simple curve and above which it is self-intersecting. We show that the range of an SLE4 curve is a.s. conformally removable, answering a question posed by Sheffield. Such curves arise as the conformal welding of a pair of independent critical (γ=2) Liouville quantum gravity (LQG) surfaces along their boundaries and our result implies that this conformal welding is unique. In order to establish this result, we give a new sufficient condition for a set X ⊂eq C to be conformally removable which applies in the case that X is not necessarily the boundary of a simply connected domain.