A BRST Analysis of W-symmetries
Abstract
We perform a classical BRST analysis of the symmetries corresponding to a generic wN-algebra. An essential feature of our method is that we write the wN-algebra in a special basis such that the algebra manifestly has a ``nested'' set of subalgebras vNN ⊂ vNN-1 ⊂ … ⊂ vN2 wN where the subalgebra vNi\ (i=2, … ,N) consists of generators of spin s=\i,i+1,… ,N\, respectively. In the new basis the BRST charge can be written as a ``nested'' sum of N-1 nilpotent BRST charges. In view of potential applications to (critical and/or non-critical) W-string theories we discuss the quantum extension of our results. In particular, we present the quantum BRST-operator for the W4-algebra in the new basis. For both critical and non-critical W-strings we apply our results to discuss the relation with minimal models.
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