From (n+1)-term subcategories to (n+1)-term complexes

Abstract

Let n be a positive integer. Given an n-rigid subcategory M of an algebraic triangulated category T, we explicitly construct an extriangulated functor from the (n+1)-term subcategory of T generated by M to the full subcategory of (n+1)-term complexes in the bounded homotopy category Kb(M), which restricts to the identity on M. In the broader context of reduced (n-1)-Auslander extriangulated categories, we provide necessary and sufficient conditions for such a functor to be full, in which case it induces an equivalence of extriangulated categories modulo a certain ideal. Furthermore, we establish a mutation-compatible bijection between the silting subcategories of these categories. Finally, we apply these results to n-cluster tilting subcategories and n-cluster tilting objects in (n+1)-Calabi-Yau categories.

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