Extensions of Baer and Principally Projective Modules

Year 2012, Volume: 25 Issue: 4, 863 - 867, 25.02.2012

Sait Halicioglu , Burcu Ungor Abdullah Harmancı

Abstract

In this note, we investigate extensions of Baer and principally projective modules. Let R be an arbitrary ring with identity and M a right R-module. For an abelian module M, we show that M is Baer (resp. principally projective) if and only if the polynomial extension of M is Baer (resp. principally projective) if and only if the power series extension of M is Baer (resp. principally projective) if and only if the Laurent polynomial extension of M is Baer (resp. principally projective) if and only if the Laurent power series extension of M is Baer (resp. principally projective). 

Keywords

abelian modules, Baer modules, principally projective modules.

References

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