• Title/Summary/Keyword: idempotent element and R-flatness

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SOME RESULTS ON PP AND PF-MODULES

  • KHAKSARI, AHMAD
    • Honam Mathematical Journal
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    • v.28 no.3
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    • pp.377-386
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    • 2006

  • For a commutative ring with unity R, it is proved that R is a PF-ring if and only if the annihilator, $ann_R(a)$, for each $a{\in}R$ is a pure ideal in R. Also it is proved that the polynomial ring, R[x], is a PF-ring if and only if R is a PF-ring. Finally, we prove that M as an R-module is PF-module if and only if M[x] is a PF R[x]-module. Also M is a PP R-module if and only if M[x] is a PP R[x]-module.

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