Kronecker modules generated by modules of length 2

Abstract

Let be a ring and N a class of -modules. A -module is said to be generated by N provided that it is a factor module of a direct sum of modules in N. The semi-simple -modules are just the -modules which are generated by the -modules of length 1. It seems that the modules which are generated by the modules of length 2 (we call them bristled modules) have not attracted the interest they deserve. In this paper we deal with the basic case of the Kronecker modules, these are the (finite-dimensional) representations of an n-Kronecker quiver, where n is a natural number. We show that for n 3, there is an abundance of bristled Kronecker modules.