Standard Complex for Quantum Lie Algebras

Abstract

For a quantum Lie algebra , let be its exterior extension (the algebra is canonically defined). We introduce a differential on the exterior extension algebra which provides the structure of a complex on . In the situation when is a usual Lie algebra this complex coincides with the "standard complex". The differential is realized as a commutator with a (BRST) operator Q in a larger algebra [], with extra generators canonically conjugated to the exterior generators of . A recurrent relation which defines uniquely the operator Q is given.

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