Annihilation of cohomology and decompositions of derived categories

It is proved that an element $r$ in the center of a coherent ring $\Lambda$ annihilates $\mathrm{Ext}^{n}_{\Lambda}(M,N)$, for some positive integer $n$ and all finitely presented $\Lambda$-modules $M$ and $N$, if and only if the bounded derived category of $\Lambda$ is an extension of the subcategory consisting of complexes annihilated by $r$ and those obtained as $n$-fold extensions of $\Lambda$. This has applications to finiteness of dimension of derived categories.

Keywords

cohomology annihilator, derived category, projective class

2010 Mathematics Subject Classification

16E30, 16E35, 18G25

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Published 30 November 2014