On Almost Primary Ideals 1 Introduction Page 1 International Journal of Algebra, Vol. 5, 2011,
no. 13, 627 - 636 On Almost Primary Ideals Adil Kadir Jabbar and Chwas Abas Ahmed …

Let R be a ring such that every zero divisor x is expressible as a sum of a nilpotent element
and a potent element of R: x= a+ b, where a is nilpotent, b is potent, and ab= ba. We call …

A note on semi-prime rings Page 1 Monatshefle f/it Mh. Math. 101, 173-182 (1986) Mcd tik 9 by
Springer-Verlag 1986 A Note on Semi-prime Rings By Roger Yue Chi Ming, Paris (Received …

The structure of rings without proper essential left ideals is described, as well as that of rings
having an essential minimal left ideal. _ In the recent radical theoretical paper [4] …

An element k of a ring R is called left minimal if Rk is a minimal left ideal of R. A ring R is
called a left strongly DS, DS ring and MFS ring, respectively if for every left minimal element …

In this paper, we introduce the notion of strong IFP and weak IFP near-rings. Weak IFP near-
ring is a generalization of IFP near-ring. We study the basic properties of right weak IFP near …

A nonzero ring is called a UN-ring if every nonunit is a product of a unit and a nilpotent
element. We show that all simple Artinian rings are UN-rings and that the UN-rings whose …