English

On Nilary Group Rings

Rings and Algebras 2020-12-29 v3

Abstract

In a ring AA an ideal II is called (principally) nilary if for any two (principal) ideals V,WV, W in AA with VWI,VW\subseteq I, then either VnIV^n\subseteq I or WmI,W^m\subseteq I, for some positive integers mm and nn depending on VV and W;W; a ring AA is called (principally) nilary if the zero ideal is a (principally) nilary ideal~\cite{Birkenmeier2013133}. Let GG be a group and AA be a ring with unity. It is natural to ask when the group ring A[G]A[G] is a (principally) nilary ring. We proved that, if A[G]A[G] is a (principally) nilary ring, then the ring AA is a (principally) nilary ring; also, we proved that if A[G]A[G] is a (principally) nilary ring and GG is a torsion group, then AA is a (principally) nilary ring and GG is a pp-group and pp is nilpotent in A;A; the converse, let GG be an abelian or locally finite group, if AA is a principally nilary ring and GG is a pp-group and pp is nilpotent in AA then A[G]A[G] is a principally nilary ring. Also, for a finite group G,G, we proved that, A[G]A[G] is a (principally) nilary ring iff AA is a (principally) nilary ring and GG is a pp-group and pp is nilpotent in A.A. Finally, we show that if FF is a field of prime characteristic pp and GG is a finite (abelian or locally finite) pp-group, then the group algebra F[G]F[G] is a (principally) nilary ring.

Keywords

Cite

@article{arxiv.1412.3571,
  title  = {On Nilary Group Rings},
  author = {Omar A. Al-Mallah and Hafed M. Al-Nogashi},
  journal= {arXiv preprint arXiv:1412.3571},
  year   = {2020}
}

Comments

this paper contains some mistakes

R2 v1 2026-06-22T07:27:31.298Z