A note on equivariantization of additive categories and triangulated categories
Abstract
In this article, we investigate the category AG of equivariant objects of an additive category A with respect to an action of a finite group G. We show that if G is solvable then we can reconstruct A from AG via a finite sequence of equivariantization. We also consider the possibility of a triangulated structure on AG canonical in certain sense when A is triangulated and give several instances in which AG is indeed canonically triangulated.
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