Recollement and Tilting Complexes
Abstract
First, we study recollement of a derived category of unbounded complexes of modules induced by a partial tilting complex. Second, we give equivalent conditions for P^{centerdot} to be a recollement tilting complex, that is, a tilting complex which induces an equivalence between recollements \{\cat{D}_{A/AeA}(A), \cat{D}(A), \cat{D}(eAe)} and \{\cat{D}_{B/BfB}(B), \cat{D}(B), \cat{D}(fBf)}, where e, f are idempotents of A, B, respectively. In this case, there is an unbounded bimodule complex which induces an equivalence between and . Third, we apply the above to a symmetric algebra A. We show that a partial tilting complex for A of length 2 extends to a tilting complex, and that is a tilting complex if and only if the number of indecomposable types of is one of A. Finally, we show that for an idempotent e of A, a tilting complex for eAe extends to a recollement tilting complex for A, and that its standard equivalence induces an equivalence between and .
Cite
@article{arxiv.math/0203037,
title = {Recollement and Tilting Complexes},
author = {Jun-ichi Miyachi},
journal= {arXiv preprint arXiv:math/0203037},
year = {2007}
}
Comments
24 pages