The vacuum preserving Lie algebra of a classical W-algebra
Abstract
We simplify and generalize an argument due to Bowcock and Watts showing that one can associate a finite Lie algebra (the `classical vacuum preserving algebra') containing the M\"obius sl(2) subalgebra to any classical -algebra. Our construction is based on a kinematical analysis of the Poisson brackets of quasi-primary fields. In the case of the -algebra constructed through the Drinfeld-Sokolov reduction based on an arbitrary sl(2) subalgebra of a simple Lie algebra , we exhibit a natural isomorphism between this finite Lie algebra and whereby the M\"obius sl(2) is identified with .
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