English

Fully bounded noetherian rings and Frobenius extensions

Rings and Algebras 2007-05-23 v3

Abstract

Let i:ARi: A\to R be a ring morphism, and χ:RA\chi: R\to A a right RR-linear map with χ(χ(r)s)=χ(rs)\chi(\chi(r)s)=\chi(rs) and χ(1R)=1A\chi(1_R)=1_A. If RR is a Frobenius AA-ring, then we can define a trace map \tr:AAR\tr: A\to A^R. If there exists an element of trace 1 in AA, then AA is right FBN if and only if ARA^R is right FBN and AA is right noetherian. The result can be generalized to the case where RR is an II-Frobenius AA-ring, and the condition on the trace can be replaced by a weaker condition. We recover results of Garc\'{\i}a and del R\'{\i}o and by D\v{a}sc\v{a}lescu, Kelarev and Torrecillas on actions of group and Hopf algebras on FBN rings as special cases. We also obtain applications to extensions of Frobenius algebras, and to Frobenius corings with a grouplike element.

Keywords

Cite

@article{arxiv.math/0503686,
  title  = {Fully bounded noetherian rings and Frobenius extensions},
  author = {S. Caenepeel and T. Guédénon},
  journal= {arXiv preprint arXiv:math/0503686},
  year   = {2007}
}

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15 pages