Critical exponents on Fortuin--Kasteleyn weighted planar maps

Abstract

In this paper we consider random planar maps weighted by the self-dual Fortuin--Kasteleyn model with parameter q ∈ (0,4). Using a bijection due to Sheffield and a connection to planar Brownian motion in a cone we obtain rigorously the value of the critical exponent associated with the length of cluster interfaces, which is shown to be 4π ( 2 - q2 )='8. where ' is the SLE parameter associated with this model. We also derive the exponent corresponding to the area enclosed by a loop which is shown to be 1 for all values of q ∈ (0,4). Applying the KPZ formula we find that this value is consistent with the dimension of SLE curves and SLE duality.