BV-Structure of the Cohomology of Nilpotent Subalgebras and the Geometry of (W-) Strings
Abstract
Given a simple, simply laced, complex Lie algebra corresponding to the Lie group G, let be the subalgebra generated by the positive roots. In this paper we construct a BV-algebra [] whose underlying graded commutative algebra is given by the cohomology, with respect to , of the algebra of regular functions on G with values in (). We conjecture that [] describes the algebra of all physical (i.e., BRST invariant) operators of the noncritical [] string. The conjecture is verified in the two explicitly known cases, = (the Virasoro string) and = (the 3 string).
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