Polygon of recollements and N-complexes
Abstract
We study a structure of subcategories which are called a polygon of recollements in a triangulated category. First, we study a 2n-gon of recollements in an (m/n)-Calabi-Yau triangulated category. Second, we show the homotopy category K(MorN-1(B)) of complexes of an additive category MorN-1(B) of N-1 sequences of split monomorphisms of an additive category B has a 2N-gon of recollments. Third, we show the homotopy category KN(B) of N-complexes of B has also a 2N-gon of recollments. Finally, we show there is a triangle equivalence between K(MorN-1(B)) and KN(B).
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