Reduction of Hochschild cohomology over algebras finite over their center
classification
🧮 math.RA
math.KT
keywords
algebrascentercohomologyfinitehochschildnoncommutativereductionresult
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We borrow ideas from Grothendieck duality theory to noncommutative algebra, and use them to prove a reduction result for Hochschild cohomology for noncommutative algebras which are finite over their center. This generalizes a result over commutative algebras by Avramov, Iyengar, Lipman and Nayak.
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