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Abstract
A ring is of finite type if it has only finitely many maximal right ideals, all two-sided. In this article, we give a complete set of invariants for finite direct sums of cyclically presented modules over a ring R of finite type. More generally, our results apply to finite direct sums of direct summands of cyclically presented right R-modules (DCP modules). Using a duality, we obtain as an application a similar set of invariants for kernels of morphisms between finite direct sums of pair-wise non-isomorphic indecomposable injective modules over an arbitrary ring. This application motivates the study of DCP modules.
ACKNOWLEDGMENT
The research of the third author was partially supported by Ministero dell'Istruzione, dell'Università e della Ricerca, Italy (Prin 2007 “Rings, algebras, modules and categories”) and by Università di Padova (Progetto di Ricerca di Ateneo CPDA071244/07).
Notes
Communicated by T. Albu.