CaTherine wheels from trees and Liouville quantum gravity

Abstract

A CaTherine wheel is a space-filling curve f : S1 S2 such that for every closed interval J⊂ S1, f(J) is homeomorphic to a closed disk and f(∂ J) is contained in ∂ f(J). A CaTherine wheel gives rise to a pair of disjoint, dense topological trees in S2 which roughly speaking lie to the left and right of f. We give necessary and sufficient conditions for a topological tree in S2 to arise as one of these trees for some CaTherine wheel f. We apply this result to show that there is a unique CaTherine wheel corresponding to the geodesic tree rooted at ∞ for the γ-Liouville quantum gravity (LQG) metric, for γ ∈ (0,2). In other words, we construct the space-filling curve which is the contour exploration of the LQG geodesic tree.