Triangulated categories arising from n-fold matrix factorizations

Abstract

Let A be an additive category and let T A→ A be an additive functor equipped with a natural transformation ω IdA→ T. We prove that the homotopy category of n-fold matrix factorizations of ω, denoted HFactn(A,T,ω), admits a natural structure of a right triangulated category. In particular, when T is an automorphism, the homotopy category HFactn(A,T,ω) becomes triangulated. Furthermore, if A is a Frobenius exact category and T is an autoequivalence, we obtain that the category Factn(A,T,ω) of n-fold (A,T)-factorizations of ω is a Frobenius exact category. Consequently, the stable category of the Frobenius exact category Factn(A,T,ω) is a triangulated category.

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