Fonctorial Construction of Frobenius Categories
Abstract
Let , be exact categories with karoubian and M be an exact functor. Under suitable adjonction hypotheses for M, we are able to show that the direct factors of the objects of of the form MY with Y ∈ make up a Frobenius category which allow us to define an M-stable category for only by quotienting. In addition, we propose a construction of an M-stable category for , triangulated categories and M a triangulated functor. We illustrate this notion with a theorem of Keller and Vossieck which links the two notions of M-stable category.
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