Semiinfinite cohomology of associative algebras and bar duality

Abstract

We describe semiinfinite cohomology of associative algebras in terms of Koszul (or bar) duality. Consider an associative algebra A and two its subalgebras B and N such that A=B N as a vector space. We prove that the endomorphism algebra of the semiregular A-module appears naturally in semiinfinite cohomology theory as a ``two times Koszul dual'' to the algebra A. We compare semiinfinite cohomology of universal enveloping algebras with the well-known Lie algebra semiinfinite cohomology. A new description of the critical 2-cocycle is provided. As a consequence we obtain another proof of the fact that additive categories generated by Verma modules over affine Lie algebras on dual levels are antiequivalent.

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