Categorical Krull-Remak-Schmidt for triangulated categories

Abstract

Let R be a commutative ring If C1 and C2 are R-linear triangulated categories then we can give an obvious triangulated structure on C = C1 C2 where HomC(U, V) = 0 if U ∈ Ci and V ∈ Cj with i ≠ j. We say a R-linear triangulated category C is disconnected if C = C1 C2 where Ci are non-zero triangulated subcategories of C. Let Ci and Dj be connected triangulated R categories with i ∈ and j ∈ . Suppose there is an equivalence of triangulated R-categories \[ i ∈ Ci j ∈ Dj \] Then we show that there is a bijective function π → such that we have an equivalence Ci Dπ(i) for all i ∈ . We give several examples of connected triangulated categories and also of triangulated subcategories which decompose into utmost finitely many components.

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