Schramm-Loewner evolution contains a topological Sierpi\'nski carpet when is close to 8

Abstract

We consider the Schramm-Loewner evolution (SLE) for ∈ (4,8), which is the regime where the curve is self-intersecting but not space-filling. We show that there exists δ0>0 such that for ∈ (8 - δ0,8), the range of an SLE curve almost surely contains a topological Sierpi\'nski carpet. Combined with a result of Ntalampekos (2021), this implies that in this parameter range, SLE is almost surely conformally non-removable, and the conformal welding problem for SLE does not have a unique solution. Our result also implies that for ∈ (8 - δ0,8), the adjacency graph of the complementary connected components of the SLE curve is disconnected.