Finite -Rickart modules

Abstract

In this article, we study the notion of a finite -Rickart module, as a module theoretic analogue of a right semi-hereditary ring. A module M is called finite -Rickart if every finite direct sum of copies of M is a Rickart module. It is shown that any direct summand and any direct sum of copies of a finite -Rickart module are finite -Rickart modules. We also provide generalizations in a module theoretic setting of the most common results of semi-hereditary rings. Also, we have a characterization of a finite -Rickart module in terms of its endomorphism ring. In addition, we introduce M-coherent modules and provide a characterization of finite -Rickart modules in terms of M-coherent modules. At the end, we study when -Rickart modules and finite -Rickart modules coincide. Examples which delineate the concepts and results are provided.