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arxiv: hep-th/9302141 · v1 · submitted 1993-02-27 · ✦ hep-th · math.QA

A characterization of the differential in semi-infinite cohomology

classification ✦ hep-th math.QA
keywords cohomologysemi-infinitealgebradifferentialactsappropriatearguablycartan
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Semi-infinite cohomology is constructed from scratch as the proper generalization of finite dimensional Lie algebra cohomology. The differential d and other operators are realized as universal inner deri- vations of a completed algebra, which acts on any appropriate semi-infinite complex. In particular, d is shown to be the unique derivation satisfying the "Cartan identity" and certain natural degree conditions. The proof that d is square-zero may well be the shortest (arguably, the only) one in print.

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