On Regular Fusible Modules

Abstract

In this article, we introduce the notion of regular fusible modules. Let R be a ring with an identity and M an R-module. An element 0≠ m∈ M is said to be regular fusible if there exists r∈ R, a non zero-divisor of M, such that mr can be written as the sum of a torsion element and a torsion free element in M. M is called regular fusible if every nonzero element of M is regular fusible. We characterize regular fusible modules in terms of fusible modules. In addition, we show that a regular fusible module over a right duo ring is reduced and nonsingular. Moreover, we study the regular fusible property under Cartesian product, trivial extension ring, and module of a fractions. Also, we characterize division rings in terms of fusible modules.