Reconstructing the base field from imaginary multiplicative chaos

Abstract

We show that the imaginary multiplicative chaos (iβ ) determines the gradient of the underlying field for all log-correlated Gaussian fields with covariance of the form - |x-y| + g(x,y) with mild regularity conditions on g, for all d ≥ 2 and for all β ∈ (0,d). In particular, we show that the 2D continuum zero boundary Gaussian free field is measurable w.r.t. its imaginary chaos.