An injective Model for Twisted Derived Categories and Curved Koszul Triality

Abstract

Given a curved differential graded algebra A, we define a new model structure on the category of curved differential graded A-modules, called the injective Guan-Lazarev model structure. We prove that the category of CDG A-modules with this model structure is Quillen equivalent to the category of curved differential graded contramodules over the extended bar-construction of A, equipped with the contraderived model structure. This result can be seen as bridging the gap between Positselski's theory of conilpotent Koszul triality and Guan-Lazarev's work on non-conilpotent Koszul duality. As an application, we use the injective Guan-Lazarev model structure to show that the tensor product is a Quillen bifunctor with respect to these model structures of the second kind.

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