A QFT approach to W1+infty
Abstract
W1+infty is defined as an infinite dimensional Lie algebra spanned by the unit operator and the Laurent modes of a series of local quasiprimary chiral fields Vl(z) of dimension l+1 (l=0,1,2,...). These fields are neutral with respect to the u(1) current J(z)=V0(z); as a result the (l+2)-fold commutator of J with Vl vanishes. We outline a construction of rational conformal field theories with stress energy tensor T(z)=V1(z) whose chiral algebras include all Vl's. It is pointed out that earlier work on local extensions of the u(1) current algebra solves the problem of classifying all such theories for Virasoro central charge c=1.
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