Invariant theory and the W1+∞ algebra with negative integral central charge

Abstract

The vertex algebra W1+∞,c with central charge c may be defined as a module over the universal central extension of the Lie algebra of differential operators on the circle. For an integer n≥ 1, it was conjectured in the physics literature that W1+∞,-n should have a minimal strong generating set consisting of n2+2n elements. Using a free field realization of W1+∞,-n due to Kac-Radul, together with a deformed version of Weyl's first and second fundamental theorems of invariant theory for the standard representation of GLn, we prove this conjecture. A consequence is that the irreducible, highest-weight representations of W1+∞,-n are parametrized by a closed subvariety of Cn2+2n.