Abstract In this paper, we present the asymptotic behavior of the solutions for a general class of difference equations. We introduce general theorems in order to study the stability and periodicity of the solutions. Moreover, we use a new technique to study the existence of periodic solutions of this general equation. By using our general results, we can study many special cases that have not been studied previously and some problems that were raised previously. Some numerical examples are provided to illustrate the new results
We investigate the asymptotic behavior, the oscillatory character and the periodic nature of solutio...
In this paper, we discuss the global behavior of all solutions of the difference equation Xn+1 = XnX...
Abstract This paper is concerned about the dynamic behavior for the following high order nonlinear d...
Abstract In this paper, we study the asymptotic behavior of the solutions of a new class of differen...
In this article, we investigate the dynamics of the solutions of the following non-linear difference...
AbstractIn this article, we study the periodicity, the boundedness and the global stability of the p...
In this article, we study the periodicity, the boundedness and the global stability of the positive ...
AbstractThe main objective of this paper is to study the global stability of the positive solutions ...
In this section, we present some open problems and conjectures about some interesting types of diffe...
We consider the difference equation xn+1 = βnxn xn−1, where {βn}∞n=0 is a pos-itive periodic sequenc...
We investigate the periodic nature, the boundedness character and the global asymptotic stability of...
We investigate the global behavior of nonnegative solutions of the difference equation xn+1 = δxn−m ...
Abstract: In this article, we study the periodicity, the boundedness and the global stability of the...
The aim of this paper is to investigate the global asymptotic stability and the periodic character f...
Journal of Applied Mathematics & Computing, Vol. 25 (2007), No. 1 - 2, pp. 375 - 382The dynamics of...
We investigate the asymptotic behavior, the oscillatory character and the periodic nature of solutio...
In this paper, we discuss the global behavior of all solutions of the difference equation Xn+1 = XnX...
Abstract This paper is concerned about the dynamic behavior for the following high order nonlinear d...
Abstract In this paper, we study the asymptotic behavior of the solutions of a new class of differen...
In this article, we investigate the dynamics of the solutions of the following non-linear difference...
AbstractIn this article, we study the periodicity, the boundedness and the global stability of the p...
In this article, we study the periodicity, the boundedness and the global stability of the positive ...
AbstractThe main objective of this paper is to study the global stability of the positive solutions ...
In this section, we present some open problems and conjectures about some interesting types of diffe...
We consider the difference equation xn+1 = βnxn xn−1, where {βn}∞n=0 is a pos-itive periodic sequenc...
We investigate the periodic nature, the boundedness character and the global asymptotic stability of...
We investigate the global behavior of nonnegative solutions of the difference equation xn+1 = δxn−m ...
Abstract: In this article, we study the periodicity, the boundedness and the global stability of the...
The aim of this paper is to investigate the global asymptotic stability and the periodic character f...
Journal of Applied Mathematics & Computing, Vol. 25 (2007), No. 1 - 2, pp. 375 - 382The dynamics of...
We investigate the asymptotic behavior, the oscillatory character and the periodic nature of solutio...
In this paper, we discuss the global behavior of all solutions of the difference equation Xn+1 = XnX...
Abstract This paper is concerned about the dynamic behavior for the following high order nonlinear d...