• Publications
  • Influence
On the rational difference equation yn+1=A+yn-k/yn
TLDR
We find conditions for the global asymptotic stability of the unique negative equilibrium y- = 1 + A of the equation yn+1 = A + yn/yn-k, where y-k is locally stable and y is a global attractor. Expand
On the difference equation yx+a=A + yn/yn-k with A
TLDR
We find conditions for global asymptotic stability of the unique negative equilibrium y ¯ = 1 + A of the equation (0.1) y n + 1 = A + y n y n - k . Expand
On-continuity and strong-continuity
P. E. Long and D. A. Carnahan in (6) and Noiri in (10) studied several prop- erties of a.c.S,a.c.H and weak continuity. In this paper it is shown that results similar to those in the above mentionedExpand
Dynamics of a higher order rational difference equation
TLDR
We investigate a nonlinear rational difference equation of higher order. Expand
On the rational difference equation yn+1=A+(yn/yn-k)
TLDR
We find conditions for the global asymptotic stability of the unique negative equilibrium y 1⁄4 1þ A of the equation 0096-3 doi:10.1016/j.amc.2005.10.047 rresponding author. Expand
On weakly projective and weakly injective modules
The purpose of this paper is to further the study of weakly injective and weakly projective modules as a generalization of injective and projective modules. For a locally q.f.d. module M, thereExpand
On $\theta $-closed sets and some forms of continuity
In this paper, we further the study of $\theta $-compactness a generalization of quasi-H-closed sets and its applications to some forms of continuity using $\theta $-open and $\delta $-open sets.Expand
On the difference equation
The Number of Ring Homomorphisms from Zm[i] x Zn into Zk[i]
In this paper we generalize the results in [2] on the number of ring homomorphisms. We compute the number of ring homomorphisms from Zm[i] x Zn into Zk[i] and the number of ring homomorphisms fromExpand
...
1
2
3
4
...