W-algebras, Gaussian Free Fields and g-Dotsenko-Fateev integrals

Abstract

Based on the intrinsic connection between Gaussian Free Fields and the Heisenberg vertex algebra, we study some aspects of the correspondence between probability theory and W-algebras. This is first achieved by providing a construction of the W-algebra associated to a complex simple Lie algebra g by means of Gaussian Free Fields. This correspondence in turn allows to translate algebraic statements into actual constraints for free-field correlation functions. This leads to new integrability results for Dotsenko-Fateev integrals associated to g, such as Ward identities and the derivation of a new Fuchsian differential equation for deformations of B2-Dotsenko-Fateev integrals arising from the Mukhin-Varchenko conjecture. Along the proof of this statement we also provide new results on representation theory of W-algebras such as the description of some singular vectors for the W-algebra associated to g=B2.

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