Universal two-parameter W∞-algebra and vertex algebras of type W(2,3,…, N)

Abstract

We prove the longstanding physics conjecture that there exists a unique two-parameter W∞-algebra which is freely generated of type W(2,3,…), and generated by the weights 2 and 3 fields. Subject to some mild constraints, all vertex algebras of type W(2,3,…, N) for some N can be obtained as quotients of this universal algebra. As an application, we show that for n≥ 3, the structure constants for the principal W-algebras Wk(sln, fprin) are rational functions of k and n, and we classify all coincidences among the simple quotients Wk(sln, fprin) for n≥ 2. We also obtain many new coincidences between Wk(sln, fprin) and other vertex algebras of type W(2,3,…, N) which arise as cosets of affine vertex algebras or nonprincipal W-algebras