Large deviations of radial SLE∞

Abstract

We derive the large deviation principle for radial Schramm-Loewner evolution (SLE) on the unit disk with parameter → ∞. Restricting to the time interval [0,1], the good rate function is finite only on a certain family of Loewner chains driven by absolutely continuous probability measures \φt2 (ζ)\, dζ\t ∈ [0,1] on the unit circle and equals ∫01 ∫S1 |φt'|2/2\,dζ \,dt. Our proof relies on the large deviation principle for the long-time average of the Brownian occupation measure by Donsker and Varadhan.