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Paper   IPM / M / 17655
School of Mathematics
  Title:   Commutative rings whose proper ideals decompose into local modules
  Author(s): 
1.  Shadi Asgari
2.  Mahmood Behboodi
  Status:   Published
  Journal: Comm. Algebra
  Year:  2024
  Pages:   DOI: 10.1080/00927872.2023.2267674
  Supported by:  IPM
  Abstract:
For a commutative local ring R, we know that every ideal is a direct sum of local modules if and only if the unique maximal ideal M of R is of the form M =Rx â??Ry â??(γâ?? Rsγ), where R/Ann(x) and R/Ann(y) are principal ideal rings and s2 γ = 0 for all γâ??s. This motivates us to determine a commutative ring, not necessarily local, in which every (proper) ideal is a direct sum of local modules. We prove that such a ring is exactly a finite direct product of local rings R with the unique maximal ideal M in the above-mentioned form. Moreover, we characterize more precisely certain commutative rings such as Noetherian rings, reduced rings, Rickart rings, semi-Artinian rings and self-injective rings, in which every (proper) ideal is a direct sum of local modules.

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