Singular Vectors of W Algebras via DS Reduction of A2(1)

Abstract

The BRST quantisation of the Drinfeld - Sokolov reduction applied to the case of A(1)2\, is explored to construct in an unified and systematic way the general singular vectors in W3 and W3(2) Verma modules. The construction relies on the use of proper quantum analogues of the classical DS gauge fixing transformations. Furthermore the stability groups W(η)\, of the highest weights of the W\, - Verma modules play an important role in the proof of the BRST equivalence of the Malikov-Feigin-Fuks singular vectors and the W algebra ones. The resulting singular vectors are essentially classified by the affine Weyl group W\, modulo W(η)\,. This is a detailed presentation of the results announced in a recent paper of the authors (Phys. Lett. B318 (1993) 85).

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