Critical Gaussian Multiplicative Chaos for singular measures

Abstract

Given d 1, we provide a construction of the random measure - the critical Gaussian Multiplicative Chaos - formally defined e2dXd μ where X is a -correlated Gaussian field and μ is a locally finite measure on Rd. Our construction generalizes the one performed in the case where μ is the Lebesgue measure. It requires that the measure μ is sufficiently spread out, namely that for μ almost every x we have ∫B(0,1)μ(d y)|x-y|de( 1|x-y| )<∞, for any compact set where : R+ R+ can be chosen to be any lower envelope function for the 3-Bessel process (this includes (x)=xα with α∈ (0,1/2)). We prove that three distinct random objects converge to a common limit which defines the critical GMC: the derivative martingale, the critical martingale, and the exponential of the mollified field. We also show that the above criterion for the measure μ is in a sense optimal.