Approach to artinian algebras via natural quivers

Abstract

Given an Artinian algebra A over a field k, there are several combinatorial objects associated to A. They are the diagram DA as defined in [DK], the natural quiver A defined in Li (cf. Section 2), and a generalized version of k-species (A/r, r/r2) with r being the Jacobson radical of A. When A is splitting over the field k, the diagram DA and the well-known ext-quiver A are the same. The main objective of this paper is to investigate the relations among these combinatorial objects and in turn to use these relations to give a characterization of the algebra A.