Universal two-parameter even spin W∞-algebra

Abstract

We construct the unique two-parameter vertex algebra which is freely generated of type W(2,4,6,…), and generated by the weights 2 and 4 fields. Subject to some mild constraints, all vertex algebras of type W(2,4,…, 2N) for some N, can be obtained as quotients of this universal algebra. This includes the B and C type principal W-algebras, the Z2-orbifolds of the D type principal W-algebras, and many others which arise as cosets of affine vertex algebras inside larger structures. As an application, we classify all coincidences among the simple quotients of the B and C type principal W-algebras, as well as the Z2-orbifolds of the D type principal W-algebras. Finally, we use our classification to give new examples of principal W-algebras of B, C, and D types, which are lisse and rational.