Group actions on categories and Elagin's Theorem Revisited
Abstract
After recalling basic definitions and constructions for a finite group G action on a k-linear category we give a concise proof of the following theorem of Elagin: if C = A, B is a semiorthogonal decomposition of a triangulated category which is preserved by the action of G, and CG is triangulated, then there is a semiorthogonal decomposition CG = AG, BG . We also prove that any G-action on C is weakly equivalent to a strict G-action which is the analog of the Coherence Theorem for monoidal categories.
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