Reversibility of whole-plane SLE for > 8
Abstract
Whole-plane SLE is a random fractal curve between two points on the Riemann sphere. Zhan established for ≤ 4 that whole-plane SLE is reversible, meaning invariant in law under conformal automorphisms swapping its endpoints. Miller and Sheffield extended this to ≤ 8. We prove whole-plane SLE is reversible for > 8, resolving the final case and answering a conjecture of Viklund and Wang. Our argument depends on a novel mating-of-trees theorem of independent interest, where Liouville quantum gravity on the disk is decorated by an independent radial space-filling SLE curve.
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