On the Beem-Nair Conjecture

Abstract

For a simple linear algebraic group G, the chiral universal centralizer IG,k is a vertex operator algebra, which is the chiralization of the universal centralizer ZG. The variety ZG is identified with the spectrum of the equivariant Borel-Moore homology of the affine Grassmannian of the Langlands dual group of G. Beem and Nair conjectured that an open symplectic immersion from KTG, the Kostant-Toda lattice associated to a simple group G, to ZG gives rises to a free field realization of the chiral universal centralizer at the critical level. In this paper, we construct a free field realization of IG,k at any level, which coincides with the one conjectured by Beem and Nair at the critical level. We give an explicit description of this construction in SL2(C)-case.