[KSCI] Korea Science Citation Index Service

http://dx.doi.org/10.4134/BKMS.2007.44.1.087

A GENERALIZATION OF INSERTION-OF-FACTORS-PROPERTY

Hwang, Seo-Un (Department of Mathematics Pusan National University)
Jeon, Young-Cheol (Department of Mathematics Korea Science Academy)
Park, Kwang-Sug (Department of Mathematics Education Pusan National University)

Publication Information

Bulletin of the Korean Mathematical Society / v.44, no.1, 2007 , pp. 87-94 More about this Journal

Abstract

We in this note introduce the concept of g-IFP rings which is a generalization of IFP rings. We show that from any IFP ring there can be constructed a right g-IFP ring but not IFP. We also study the basic properties of right g-IFP rings, constructing suitable examples to the situations raised naturally in the process.

Keywords

g-IFP ring; IFP ring; annihilator; 2-primal ring;

Citations & Related Records

Times Cited By Web Of Science : 0 (Related Records In Web of Science)
Times Cited By SCOPUS : 1

Reference
Cited By SCOPUS

1	H. E. Bell, Near-rings in which each element is a power of itself, Bull. Austral. Math. Soc. 2 (1970), 363-368 DOI
2	Y. Hirano, Some studies on strongly $\pi$ -regular rings, Math. J. Okayama Univ. 20 (1978), no. 2, 141-149
3	N. K. Kim and Y. Lee, Extensions of reversible rings, J. Pure Appl. Algebra 185 (2003), no. 1-3, 207-223 DOI ScienceOn
4	J. Lambek, Lectures on Rings and Modules, Blaisdell, Waltham, 1966
5	G. Marks, Direct product and power series formations over 2-primal rings, in (eds. S. K. Jain, S. T. Rizvi) Advances in Ring Theory, Trends in Math., Birkhauser, Boston (1997), 239-245
6	G. F. Birkenmeier, H. E. Heatherly, and E. K. Lee, Completely prime ideals and as-sociated radicals, Proc. Biennial Ohio State-Denison Conference 1992, edited by S. K. Jain and S. T. Rizvi, World Scientific, Singapore-New Jersey-London-Hong Kong (1993), 102-129
7	J. M. Habeb, A note on zero commutative and duo rings, Math. J. Okayama Univ. 32 (1990), 73-76
8	L. Motais de Narbonne, Anneaux semi-commutatifs et uniseriels; anneaux dont les ideaux principaux sont idempotents, In: Proceedings of the 106th National Congress of Learned Societies (Perpignan, 1981), Bib. Nat., Paris (1982), 71-73
9	G. Shin, Prime ideals and sheaf representation of a pseudo symmetric ring, Trans. Amer. Math. Soc. 184 (1973), 43-60 DOI ScienceOn
10	Y. Lee, H. K. Kim, and C. Huh, Questions on 2-primal rings, Comm. Algebra 26 (1998), no. 2, 595-600 DOI ScienceOn
11	K. R. Goodearl, von Neumann Regular Rings, Pitman, London, 1979 DOI