Cosets from equivariant W-algebras
Abstract
The equivariant W-algebra of a simple Lie algebra g is a BRST reduction of the algebra of chiral differential operators on the Lie group of g. We construct a family of vertex algebras A[g, , n] as subalgebras of the equivariant W-algebra of g tensored with the integrable affine vertex algebra Ln(g) of the Langlands dual Lie algebra g at level n∈ Z>0. They are conformal extensions of the tensor product of an affine vertex algebra and the principal W-algebra whose levels satisfy a specific relation.
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