Derivatives of Gaussian multiplicative chaos

Abstract

Consider a logarithmically-correlated Gaussian field X in d dimensions. For all γ ∈ (-2d,2d), we show that the derivatives ∂k∂γk :eγ Xε: of the regularised Gaussian multiplicative chaos :eγ Xε: converge as ε 0. By deriving optimal bounds on their growth as k∞, we control the power expansion of :eγ Xε: about each γ∈(-2d,2d). This yields an alternative approach to complex Gaussian multiplicative chaos in the whole subcritical regime, based entirely on real-valued quantities. One of our key technical contributions is to provide a truncated second moment approach to the uniform integrability of the derivatives of multiplicative chaos and its associated complex variant.