Dimension of two-valued sets via imaginary chaos

Abstract

Two-valued sets are local sets of the two-dimensional Gaussian free field (GFF) that can be thought of as representing all points of the domain that may be connected to the boundary by a curve on which the GFF takes values only in [-a,b]. Two-valued sets exist whenever a+b≥ 2λ, where λ depends explicitly on the normalization of the GFF. We prove that the almost sure Hausdorff dimension of the two-valued set A-a,b equals d=2-2λ2/(a+b)2. For the two-point estimate, we use the real part of a "vertex field" built from the purely imaginary Gaussian multiplicative chaos. We also construct a non-trivial d-dimensional measure supported on A-a,b and discuss its relation with the d-dimensional conformal Minkowski content for A-a,b.