Geometric Interpretation of Half-Plane Capacity

Author(s)

Lalley, Steven P.; Lawler, Gregory F.; Narayanan, Hariharan

Abstract

Schramm-Loewner Evolution describes the scaling limits of interfaces in certain statistical mechanical systems. These interfaces are geometric objects that are not equipped with a canonical parametrization. The standard parametrization of SLE is via half-plane capacity, which is a conformal measure of the size of a set in the reference upper half-plane. This has useful harmonic and complex analytic properties and makes SLE a time-homogeneous Markov process on conformal maps. In this note, we show that the half-plane capacity of a hull A is comparable up to multiplicative constants to more geometric quantities, namely the area of the union of all balls centered in A tangent to R, and the (Euclidean) area of a 1-neighborhood of A with respect to the hyperbolic metric.

Date issued

2009-12

URI

http://hdl.handle.net/1721.1/89524

Department

Massachusetts Institute of Technology. Laboratory for Information and Decision Systems

Journal

Electronic Communications in Probability

Publisher

Institute of Mathematical Statistics

Citation

Lalley, Steven P., Gregory F. Lawler, and Hariharan Narayanan. “Geometric Interpretation of Half-Plane Capacity.” Electronic Communications in Probability 14, no. 0 (January 1, 2009).

Version: Final published version

ISSN

1083-589X