Non-Polynomial Realizations of W-Algebras

Abstract

Relaxing first-class constraint conditions in the usual Drinfeld-Sokolov Hamiltonian reduction leads, after symmetry fixing, to realizations of W algebras expressed in terms of all the J-current components. General results are given for G a non exceptional simple (finite and affine) algebra. Such calculations directly provide the commutant, in the (closure of) G enveloping algebra, of the nilpotent subalgebra G-, where the subscript refers to the chosen gradation in G. In the affine case, explicit expressions are presented for the Virasoro, W3, and Bershadsky algebras at the quantum level.

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