Ideals as generalized prime ideal factorization of submodules
Abstract
For a submodule N of an R-module M, a unique product of prime ideals in R is assigned, which is called the generalized prime ideal factorization of N in M, and denoted as PM(N). But for a product of prime ideals p1 ·s pn in R and an R-module M, there may not exist a submodule N in M with PM(N) = p1 ·s pn. In this article, for an arbitrary product of prime ideals p1 ·s pn and a module M, we find conditions for the existence of submodules in M having p1 ·s pn as their generalized prime ideal factorization.
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