Flat model structures and Gorenstein objects in functor categories

Abstract

We construct a flat model structure on the category Q,RMod of additive functors from a small preadditive category Q satisfying certain conditions to the module category RMod over an associative ring R, whose homotopy category is the Q-shaped derived category introduced by Holm and Jorgensen. Moreover, we prove that for an arbitrary associative ring R, an object in Q,RMod is Gorenstein projective (resp., Gorenstein injective, Gorenstein flat, projective coresolving Gorenstein flat) if and only if so is its value on each object of Q, and hence improve a result by Dell'Ambrogio, Stevenson and Stov\'cek.

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