Building blocks for W-algebras of classical types

Abstract

The universal 2-parameter vertex algebra W∞ of type W(2,3,4,…) serves as a classifying object for vertex algebras of type W(2,3,…,N) for some N in the sense that under mild hypothesis, all such vertex algebras arise as quotients of W∞. There is an N × N family of such 1-parameter vertex algebras which, after tensoring with a Heisenberg algebra, are known as Y-algebras. They were introduced by Gaiotto and Rapc\'ak and are expected to be the building blocks for all W-algebras in type A, i.e., every W-(super) algebra in type A is an extension of a tensor product of finitely many Y-algebras. Similarly, the orthosymplectic Y-algebras are 1-parameter quotients of a universal 2-parameter vertex algebra Wev∞ of type W(2,4,6,…), which is a classifying object for vertex algebras of type W(2,4,…, 2N) for some N. Unlike type A, these algebras are not all the building blocks for W-algebras of types B, C, and D. In this paper, we construct a new universal 2-parameter vertex algebra of type W(13, 2, 33, 4, 53,6,…) which we denote by Wsp∞ since it contains a copy of the affine vertex algebra Vk(sp2). We identify 8 infinite families of 1-parameter quotients of Wsp∞ which are analogues of the Y-algebras. We regard Wsp∞ as a fundamental object on equal footing with W∞ and Wev∞, and we give some heuristic reasons for why we expect the 1-parameter quotients of these three objects to be the building blocks for all W-algebras of classical types. Finally, we prove that Wsp∞ has many quotients which are strongly rational. This yields new examples of strongly rational W-superalgebras.