Representations of quivers over a ring and the Weak Krull-Schmidt Theorems.

Let R be a ring and Q be a finite quiver, and let be the number of vertices of Q. Let be the class of representations of Q by right R-modules with local endomorphism ring and R-module homomorphisms. The endomorphism ring of a representation has at most n maximal right ideals, all of which are also left ideals, and the isomorphism class of M is determined by n invariants. The main theorem of this paper states that a finite direct sum of representations in is unique up to npermutations of m elements. Let . A non-directed graph associated to M is introduced and is shown to determine the unique decomposition of Minto indecomposable representations. This class of representations is shown to generalize the known classes of modules for which a theorem analogous to the case of our main theorem holds. [ABSTRACT FROM AUTHOR]