Redefined generalized fuzzy ideals of near-rings

被引：0

作者：

Jian-ming Zhan

Yun-qiang Yin

机构：

[1] Hubei Institute for Nationalities,Department of Mathematics

[2] East China Institute of Technology,College of Mathematics and Information Sciences

来源：

Applied Mathematics-A Journal of Chinese Universities | 2010年 / 25卷

关键词：

Near-ring; subnear-ring (ideal); -fuzzy subnear-ring (ideal); prime (semiprime) (∈, ∈ ∨ q)-fuzzy subnear-ring (ideal); 16Y30; 16Y99;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

With a new idea, we redefine generalized fuzzy subnear-rings (ideals) of a near-ring and investigate some of its related properties. Some new characterizations are given. In particular, we introduce the concepts of strong prime (or semiprime) (∈, ∈ ∨ q)-fuzzy ideals of near-rings, and discuss the relationship between strong prime (or semiprime) (∈, ∈ ∨ q)-fuzzy ideals and prime (or semiprime) (∈, ∈ ∨ q)-fuzzy ideals of near-rings.

引用

页码：341 / 348

页数：7

共 18 条

[1] Abou-Zaid A.(1996)On fuzzy subnear-rings Fuzzy Sets and Systems 81 383-393
[2] Bhakat S. K.(1996)(∈, ∈ ∨ Fuzzy Sets and Systems 80 359-368
[3] Das P.(2006))- Soft Computing 10 206-211
[4] Davvaz B.(1998)(∈, ∈ ∨ Bull Korean Math Soc 35 343-348
[5] Hong S. M.(1996)) Bull Korean Math Soc 33 593-601
[6] Jun Y. B.(2003)Fuzzy ideals in near-rings Fuzzy Sets and Systems 38 205-211
[7] Kim H. S.(2009)On fuzzy ideals of near-rings Appl Math J Chinese Univ, Ser. B 24 343-349
[8] Kim S. D.(2007)Generalized fuzzy groups and many valued applications Inform Sci 177 876-886
[9] Kim H. S.(2005)Generalized fuzzy ideals of near-rings Sci Math Jpn 61 219-223
[10] Yuan X. H.(undefined)Fuzzy h-ideals of hemirings undefined undefined undefined-undefined

← 1 2 →