Martin Kalck
Published 2016-03-21Version 1
We study composition series of derived module categories in the sense of Angeleri H\"ugel, K\"onig & Liu for quasi-hereditary algebras. More precisely, we show that having a composition series with all factors being derived categories of vector spaces does not characterise derived categories of quasi-hereditay algebras. This gives a negative answer to a question of Liu & Yang and the proof also confirms part of a conjecture of Bobi\'nski & Malicki. In another direction, we show that derived categories of quasi-hereditary algebras can have composition series with lots of different lengths and composition factors. In other words, there is no Jordan-H\"older property for composition series of derived categories of quasi-hereditary algebras.
Comments: 35 pages, to appear in Proc. of Conference of the DFG priority program on Representation Theory, Bad Honnef, March 2015, comments are welcome!
1-quasi-hereditary algebras
Geometrical characterization of semilinear isomorphisms of vector spaces and semilinear homeomorphisms of normed spaces
Triangular decompositions: Reedy algebras and quasi-hereditary algebras
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