Symmetry Algebras of Stringy Cosets

Abstract

We find the symmetry algebras of cosets which are generalizations of the minimal-model cosets, of the specific form SU(N)k × SU(N)SU(N)k+. We study this coset in its free field limit, with k, → ∞, where it reduces to a theory of free bosons. We show that, in this limit and at large N, the algebra We∞[1] emerges as a sub-algebra of the coset algebra. The full coset algebra is a larger algebra than conventional W-algebras, with the number of generators rising exponentially with the spin, characteristic of a stringy growth of states. We compare the coset algebra to the symmetry algebra of the large N symmetric product orbifold CFT, which is known to have a stringy symmetry algebra labelled the `higher spin square'. We propose that the higher spin square is a sub-algebra of the symmetry algebra of our stringy coset.