Reconstruction of log-correlated fields from multiplicative chaos measures

Abstract

We consider log-correlated random fields X and the associated multiplicative chaos measures μγ,X. Our results reconstruct the underlying field X from the multiplicative chaos measure γ,X. The new feature of our results is that we allow the dimension d to be arbitrary and cover also the critical case γ=2d. In the sub-critical regime γ<2d, we allow the fields to be mildly non-Gaussian, that is, the field has the decomposition X=G+H with a log-correlated Gaussian field G and a H\"older-continuos (not necessarily Gaussian) field H.