Torsion classes of extended Dynkin quivers over commutative rings

Abstract

For a Noetherian R-algebra , there is a canonical inclusion torsΠp∈ Spec Rtors((p)), and each element in the image satisfies a certain compatibility condition. We call compatible if the image coincides with the set of all compatible elements. For example, for a Dynkin quiver Q and a commutative Noetherian ring R containing a field, the path algebra RQ is compatible. In this paper, we prove that RQ is compatible when Q is an extended Dynkin quiver and R is either a Dedekind domain or a Noetherian semilocal normal ring of dimension two.