English

When an $\mathscr{S}$-closed submodule is a direct summand

Rings and Algebras 2015-03-17 v1

Abstract

It is well known that a direct sum of CLS-modules is not, in general, a CLS-module. It is proved that if M=M1M2M=M_1\oplus M_2, where M1M_1 and M2M_2 are CLS-modules such that M1M_1 and M2M_2 are relatively ojective (or M1M_1 is M2M_2-ejective), then MM is a CLS-module and some known results are generalized. Tercan [8] proved that if a module M=M1M2M=M_{1}\oplus M_{2} where M1M_{1} and M2M_{2} are CS-modules such that M1M_{1} is M2M_{2}-injective, then MM is a CS-module if and only if Z2(M)Z_{2}(M) is a CS-module. Here we will show that Tercan's claim is not true.

Cite

@article{arxiv.1005.0132,
  title  = {When an $\mathscr{S}$-closed submodule is a direct summand},
  author = {Yongduo Wang and Dejun Wu},
  journal= {arXiv preprint arXiv:1005.0132},
  year   = {2015}
}

Comments

8 pages

R2 v1 2026-06-21T15:17:31.158Z