Unitarising measures for Kac-Moody algebras

Abstract

Given a compact connected Lie group G with dual Coxeter number h and a level <-2 h, we introduce a probability measure on the space of holomorphic g C-valued (1,0)-forms in D, in relation to the K\"ahler geometry of the loop group of G and the action of a pair of Kac--Moody algebras at respective levels and -2 h->0. We prove that is characterised by a covariance property making rigorous sense of the formal path integral `` d(γ)=e-S(γ)Dγ", where Dγ is the non-existent Haar measure on the loop group and S is a K\"ahler potential for the right-invariant Kac--Moody metric. Infinitesimally, the covariance formula prescribes the Shapovalov forms of the Kac--Moody representations.