Free field realisation and the chiral universal centraliser

Abstract

In the TQFT formalism of Moore-Tachikawa for describing Higgs branches of theories of class S, the space associated to the unpunctured sphere in type g is the universal centraliser ZG, where g=Lie(G). In more physical terms, this space arises as the Coulomb branch of pure N=4 gauge theory in three dimensions with gauge group G, the Langlands dual. In the analogous formalism for describing chiral algebras of class S, the vertex algebra associated to the sphere has been dubbed the chiral universal centraliser. In this paper, we construct an open, symplectic embedding from a cover of the Kostant-Toda lattice of type g to the universal centraliser of G, extending a classic result of Kostant. Using this embedding and some observations on the Poisson algebraic structure of ZG, we propose a free field realisation of the chiral universal centraliser for any simple group G. We exploit this realisation to develop free field realisations of chiral algebras of class S of type a1 for theories of genus zero with up to six punctures. These realisations make generalised S-duality completely manifest, and the generalisation to more than six punctures is conceptually clear, though technically burdensome.