Abstract
We study the cokernel of the application given by the Cartan matrix CΛ of a finite dimensional k-algebra This produces a finitely generated abelian group, the Cartan group which is invariant under derived equivalences. We are interested in the case when GΛ is finite. For a standardly stratified algebra, it is shown that this group is always finite and some interesting connections with the standard modules are found. As a consequence, it is got that GΛ can be seen as a measure of how far is a standardly stratified algebra Λ to be quasi-hereditary. Finally, it is also shown that any finite abelian group can be realized as the Cartan group of some standardly stratified algebra.
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