Quantum Hamiltonian reduction of W-algebras and category O

Abstract

We define a quantum version of Hamiltonian reduction by stages, producing a construction in type A for a quantum Hamiltonian reduction from the W-algebra U(g,e1) to an algebra conjecturally isomorphic to U(g,e2), whenever e2 e1 in the dominance ordering. This isomorphism is shown to hold whenever e1 is subregular, and in sln for all n 4. We next define embeddings of various categories O for the W-algebras associated to e1 and e2, amongst them the embeddings O(e2,p) O(e1,p), where p is a parabolic subalgebra containing both e1 and e2 in its Levi subalgebra.