Abstract
We study complexes of finite complete intersection dimension in the derived category of a local ring. Given such a complex of complexity $c$, we prove that the thick subcategory it generates contains complexes of all possible complexities at most $c$. In particular, we show that such a complex is virtually small, answering a question raised by Dwyer, Greenlees and Iyengar.
Citation
Petter Andreas Bergh. "On complexes of finite complete intersection dimension." Homology Homotopy Appl. 11 (2) 49 - 54, 2009.
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