AbstractWe study the global stability, the boundedness character, and the periodic nature of the positive solutions of the difference equationxn+1=α+xn−1/xn, where α∈[0,∞), and where the initial conditionsx−1andx0are arbitrary positive real numbers
AbstractThe aim of this work is to investigate the global stability, periodic nature, oscillation an...
We investigate the global stability character of the equilibrium points and the period-two solutions...
AbstractTwo sufficient conditions are obtained for the global asymptotic stability of the following ...
AbstractIn this work we investigate the global behavior of the difference equation xn+1=α+xn−1xnk,n=...
AbstractWe study the behavior of all positive solutions of the difference equation in the title, whe...
AbstractIn this paper, we investigate the global behavior of the difference equation xn+1=αxn−1β+γxn...
AbstractWe investigate the behavior of solutions of the equation in the title under the hypotheses t...
AbstractWe study the global stability, the boundedness character, and the periodic nature of the pos...
AbstractIn this paper, we investigate the global behavior and boundedness of the difference equation...
AbstractOur aim in this paper is to investigate the boundedness, the persistence, the global attract...
AbstractIn this note, we investigate the periodic character of solutions of the nonlinear, second-or...
AbstractWe obtain a general global attractivity result for a difference equation of the formxn+1=f(x...
AbstractA sufficient condition is obtained to guarantee the global asymptotic stability of the follo...
AbstractIn this paper we study the behavior of the recursive sequence xn+1=axn+bxnxn−1cxn+dxn−1,n=0,...
AbstractIn this paper we study the oscillatory behavior, the boundedness of the solutions, and the g...
AbstractThe aim of this work is to investigate the global stability, periodic nature, oscillation an...
We investigate the global stability character of the equilibrium points and the period-two solutions...
AbstractTwo sufficient conditions are obtained for the global asymptotic stability of the following ...
AbstractIn this work we investigate the global behavior of the difference equation xn+1=α+xn−1xnk,n=...
AbstractWe study the behavior of all positive solutions of the difference equation in the title, whe...
AbstractIn this paper, we investigate the global behavior of the difference equation xn+1=αxn−1β+γxn...
AbstractWe investigate the behavior of solutions of the equation in the title under the hypotheses t...
AbstractWe study the global stability, the boundedness character, and the periodic nature of the pos...
AbstractIn this paper, we investigate the global behavior and boundedness of the difference equation...
AbstractOur aim in this paper is to investigate the boundedness, the persistence, the global attract...
AbstractIn this note, we investigate the periodic character of solutions of the nonlinear, second-or...
AbstractWe obtain a general global attractivity result for a difference equation of the formxn+1=f(x...
AbstractA sufficient condition is obtained to guarantee the global asymptotic stability of the follo...
AbstractIn this paper we study the behavior of the recursive sequence xn+1=axn+bxnxn−1cxn+dxn−1,n=0,...
AbstractIn this paper we study the oscillatory behavior, the boundedness of the solutions, and the g...
AbstractThe aim of this work is to investigate the global stability, periodic nature, oscillation an...
We investigate the global stability character of the equilibrium points and the period-two solutions...
AbstractTwo sufficient conditions are obtained for the global asymptotic stability of the following ...
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