New universal vertex algebras as glueings of the basic ones

Abstract

There are three universal 2-parameter vertex algebras W∞, Wev∞, and Wsp∞ which are freely generated of types W(2,3,4,…), W(2,4,6,…), and W(13, 2, 33, 4,…), respectively. They serve as classifying objects for vertex algebras with these generating types satisfying mild hypotheses. Their 1-parameter quotients are expected to be the building blocks of all W-algebras of classical Lie types. Furthermore, such W-algebras are expected to be organized into families that are governed by new universal 2-parameter vertex algebras, which are themselves glueings of copies of W∞ in type A (together with a Heisenberg algebra), and copies of Wev∞ and Wsp∞ in types B, C, and D. We denote these universal objects by WX,S,M∞, where X denotes the Lie type (either A, C, or BD since types B and D can be treated uniformly), and S, M are sets of positive integers that determine certain families of partitions. More precisely, for a partition P = (n0m0, n1m1,…, ntmt) of N = Σi=0t ni mi consisting of mi parts of size ni, where n0> n1 > ·s > nt ≥ 2, M = \m0,…, mt\ is the set of multiplicities, and S = \d1,…, dt\ is the set of height differences di+1 = ni - ni+1. After introducing this general conjectural picture, we will construct the first nontrivial example Wso2∞:=WBD, , \2\∞, which is a glueing of two copies of Wev∞.

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