Tilting in Q-shaped derived categories
Abstract
The main result of this paper is that there is sometimes a triangulated equivalence between DQ( A ), the Q-shaped derived category of an algebra A, and D( B ), the classic derived category of a different algebra B. By construction, DQ( A ) consists of Q-shaped diagrams of A-modules for a suitable small category Q. Our result concerns the case where Q consists of shifts of indecomposable projective modules over a self-injective Z-graded algebra . A notable special case is the result by Iyama, Kato, and Miyachi that DN( A ), the N-derived category of A, is triangulated equivalent to D( T N-1 A ), the classic derived category of T N-1 ( A ), which denotes upper diagonal ( N-1 ) × ( N-1 )-matrices over A. Several other special cases will also be discussed.
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