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Abstract
Let be a ring with identity and be an -module. A ring in which every element can be expressed as the sum of an idempotent and a unit element is called a clean ring. An -module that is mapped to itself is called an endomorphism, denoted by . The set of all endomorphisms forms a ring under addition and function composition. This fact motivates the notion of clean modules over a ring. An -module is called a clean module if is a clean ring. This concept was first investigated by Camillo et al. In this article, we identify a special case of a clean module constructed from the external direct sum of two modules over the same ring. We show that if and are clean modules over , then their external direct sum is also a clean module.
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