Add to ORKGAbstract In this paper, we consider the nonlinear difference equation , where with and and the initial values with . We give sufficient conditions under which every positive solution of this equation converges to a ( not necessarily prime ) 2-periodic solution, which extends and includes corresponding results obtained in the recent literature.</p
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...
AbstractIn this note, we consider the nonlinear difference equation, xn+1=f(xn,xn−k),n=0,1,... where...
AbstractIn this note, we investigate the periodic character of solutions of the nonlinear, second-or...
We give a remark about the periodic character of positive solutions of the difference equation xn+1 ...
Based on a continuation theorem of Mawhin, positive periodic solutions are found for difference equa...
Based on a continuation theorem of Mawhin, positive periodic solutions are found for difference equa...
WOS: 000079460000010We prove the existence of positive solutions of second-order nonlinear differenc...
WOS: 000317232100001We give a remark about the periodic character of positive solutions of the diffe...
Based on a continuation theorem of Mawhin, positive periodic solutions are found for difference equa...
AbstractWe prove the existence of positive solutions of second-order nonlinear difference equations ...
AbstractWe show that every solution of the difference equation xn+1=max{1xn,Axn−1},n=0,1,..., where...
This paper studies the boundedness, global asymptotic stability, and periodicity of positive solutio...
AbstractIn this paper, we use the upper and lower solutions method to show that there existsa λ*, su...
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...
AbstractIn this note, we consider the nonlinear difference equation, xn+1=f(xn,xn−k),n=0,1,... where...
AbstractIn this note, we investigate the periodic character of solutions of the nonlinear, second-or...
We give a remark about the periodic character of positive solutions of the difference equation xn+1 ...
Based on a continuation theorem of Mawhin, positive periodic solutions are found for difference equa...
Based on a continuation theorem of Mawhin, positive periodic solutions are found for difference equa...
WOS: 000079460000010We prove the existence of positive solutions of second-order nonlinear differenc...
WOS: 000317232100001We give a remark about the periodic character of positive solutions of the diffe...
Based on a continuation theorem of Mawhin, positive periodic solutions are found for difference equa...
AbstractWe prove the existence of positive solutions of second-order nonlinear difference equations ...
AbstractWe show that every solution of the difference equation xn+1=max{1xn,Axn−1},n=0,1,..., where...
This paper studies the boundedness, global asymptotic stability, and periodicity of positive solutio...
AbstractIn this paper, we use the upper and lower solutions method to show that there existsa λ*, su...
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...
We establish conditions for the existence of periodic solutions of nonlinear, second-order differenc...