Gaussian free field light cones and SLEκ (ρ )

• dc.contributor.author: Miller, Jason
• dc.contributor.author: Sheffield, Scott
• dc.date.issued: 2019
• dc.identifier.uri: https://hdl.handle.net/1721.1/134364
• dc.description.abstract: © Institute of Mathematical Statistics, 2019. Let h be an instance of the GFF. Fix κ ∈ (0, 4) and χ = 2/√κ-√κ/2. Recall that an imaginary geometry ray is a flow line of ei(h/χ+θ) that looks locally like SLEκ. The light cone with parameter θ ∈ [0, π] is the set of points reachable from the origin by a sequence of rays with angles in [-θ/2, θ/2]. It is known that when θ = 0, the light cone looks like SLEκ, and when θ = π it looks like the range of an SLE16/κ counterflow line. We find that when θ ∈ (0, π) the light cones are either fractal carpets with a dense set of holes or space-filling regions with no holes. We show that every nonspace-filling light cone agrees in law with the range of an SLEκ (ρ) process with ρ ∈ (-2-κ/2) ∨ (κ/2-4),-2). Conversely, the range of any such SLEκ (ρ) process agrees in law with a non-space-filling light cone. As a consequence of our analysis, we obtain the first proof that these SLEκ (ρ) processes are a.s. continuous curves and show that they can be constructed as natural path-valued functions of the GFF.
• dc.language.iso: en
• dc.publisher: Institute of Mathematical Statistics
• dc.relation.isversionof: 10.1214/18-AOP1331
• dc.source: arXiv
• dc.type: Article
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.relation.journal: The Annals of Probability
• dc.eprint.version: Original manuscript
• mit.journal.volume: 47
• mit.journal.issue: 6