Mathematics – Representation Theory
Scientific paper
2007-02-02
Algebras and Representation Theory 14 (2011), 57-74
Mathematics
Representation Theory
16 pages; major revision, formulated the result in greater generality
Scientific paper
10.1007/s10468-009-9175-0
A triangular matrix ring A is defined by a triplet (R,S,M) where R and S are rings and M is an S-R-bimodule. In the main theorem of this paper we show that if T is a tilting S-module, then under certain homological conditions on M as an S-module, one can extend T to a tilting complex over A inducing a derived equivalence between A and another triangular matrix ring specified by (S',R,M'), where the ring S' and the R-S'-bimodule M' depend only on T and M, and S' is derived equivalent to S. Note that no conditions on the ring R are needed. These conditions are satisfied when S is an Artin algebra of finite global dimension and M is finitely generated as an S-module. In this case, $(S',R,M')=(S,R,DM)$ where D is the duality on the category of finitely generated S-modules. They are also satisfied when S is arbitrary, M has a finite projective resolution as an S-module, and $\Ext^n_S(M,S)=0$ for all $n>0$. In this case, $(S',R,M')=(S,R,\Hom_S(M,S))$.
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