Liouville quantum gravity spheres as matings of finite-diameter trees

• Main Authors: Miller, Jason E. (Author), Sheffield, Scott Roger (Author)
• Other Authors: Massachusetts Institute of Technology. Department of Mathematics (Contributor)
• Format: Article
• Language: English
• Published: Institute of Mathematical Statistics, 2020-08-05T20:45:34Z.
• Subjects: Article
• Online Access: Get fulltext

 We show that the unit area Liouville quantum gravity sphere can be constructed in two equivalent ways. The first, which was introduced by the authors and Duplantier in (Liouville quantum gravity as a mating of trees (2014) Preprint), uses a Bessel excursion measure to produce a Gaussian free field variant on the cylinder. The second uses a correlated Brownian loop and a "mating of trees" to produce a Liouville quantum gravity sphere decorated by a space-filling path. In the special case that γ = √8/3, we present a third equivalent construction, which uses the excursion measure of a 3/2-stable Levy process (with only upward jumps) to produce a pair of trees of quantum disks that can be mated to produce a sphere decorated by SLE6. This construction is relevant to a program for showing that the γ =√8/3 Liouville quantum gravity sphere is equivalent to the Brownian map.