On the Completeness of the Set of Classical W-Algebras Obtained from DS Reductions

Abstract

We clarify the notion of the DS --- generalized Drinfeld-Sokolov --- reduction approach to classical W-algebras. We first strengthen an earlier theorem which showed that an sl(2) embedding S⊂ G can be associated to every DS reduction. We then use the fact that a -algebra must have a quasi-primary basis to derive severe restrictions on the possible reductions corresponding to a given sl(2) embedding. In the known DS reductions found to date, for which the -algebras are denoted by W S G-algebras and are called canonical, the quasi-primary basis corresponds to the highest weights of the sl(2). Here we find some examples of noncanonical DS reductions leading to -algebras which are direct products of W S G-algebras and `free field' algebras with conformal weights ∈ \0, 1 2, 1\. We also show that if the conformal weights of the generators of a W-algebra obtained from DS reduction are nonnegative ≥ 0 (which is

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