Add to ORKGDifference equations arise in many fields of mathematics, both as discrete analogs of continuous behavior (analysis, numerical approximations) and as independent models for discrete behavior (population dynamics, economics, biology, ecology, etc.). In recent years, many models - especially in mathematical biology - are based on higher order nonlinear difference equations. As a result, there has been much focus on the existence of periodic solutions of certain classes of these equations and the asymptotic behavior of these periodic solutions. In this dissertation, we study the existence and global attractivity of both periodic and quasiperiodic solutions of two different higher order nonlinear difference equations. Both equations arise in bi...
This self-contained monograph provides systematic, instructive analysis of second-order rational di...
This self-contained monograph provides systematic, instructive analysis of second-order rational dif...
We investigate the global character of the difference equation of the form xn+1 = f(xn, xn –1), n = ...
summary:Consider the following higher order difference equation \begin{equation*} x(n+1)= f\big (n,x...
summary:Consider the following higher order difference equation \begin{equation*} x(n+1)= f\big (n,x...
Consider the following higher order difference equation \begin{equation*} x(n+1)= f(n,x(n))+g(n,x(n...
We investigate the periodic nature, the boundedness character, and the global attractivity of the po...
We investigate asymptotic behavior and periodic nature of positive solutions of the difference equat...
In this article, we study a higher-order nonlinear difference equation. By using critical point the...
In this paper, we systematically explore the periodicity of some dynamic equations on time scales, w...
AbstractThe existence of a periodic solution for a class of nonlinear delay difference equations wit...
We investigate the local stability, prime period-two solutions, boundedness, invariant intervals, an...
In this paper, we study the global attractivity for a class of periodic difference equation with del...
Abstract Based on a continuation theorem of Mawhin, the existence of a periodic solution for a highe...
This self-contained monograph provides systematic, instructive analysis of second-order rational dif...
This self-contained monograph provides systematic, instructive analysis of second-order rational di...
This self-contained monograph provides systematic, instructive analysis of second-order rational dif...
We investigate the global character of the difference equation of the form xn+1 = f(xn, xn –1), n = ...
summary:Consider the following higher order difference equation \begin{equation*} x(n+1)= f\big (n,x...
summary:Consider the following higher order difference equation \begin{equation*} x(n+1)= f\big (n,x...
Consider the following higher order difference equation \begin{equation*} x(n+1)= f(n,x(n))+g(n,x(n...
We investigate the periodic nature, the boundedness character, and the global attractivity of the po...
We investigate asymptotic behavior and periodic nature of positive solutions of the difference equat...
In this article, we study a higher-order nonlinear difference equation. By using critical point the...
In this paper, we systematically explore the periodicity of some dynamic equations on time scales, w...
AbstractThe existence of a periodic solution for a class of nonlinear delay difference equations wit...
We investigate the local stability, prime period-two solutions, boundedness, invariant intervals, an...
In this paper, we study the global attractivity for a class of periodic difference equation with del...
Abstract Based on a continuation theorem of Mawhin, the existence of a periodic solution for a highe...
This self-contained monograph provides systematic, instructive analysis of second-order rational dif...
This self-contained monograph provides systematic, instructive analysis of second-order rational di...
This self-contained monograph provides systematic, instructive analysis of second-order rational dif...
We investigate the global character of the difference equation of the form xn+1 = f(xn, xn –1), n = ...