On the rational recursive sequence .

Zayed, E.M.E.; Shamardan, A.B.; Nofal, T.A.

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Global attractivity in a higher order nonlinear difference equation.

Yan, Xingxue, Li, Wantong, Sun, Hongrui (2002)

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Attractivity in a nonlinear delay difference equation.

He, Wan-Sheng, Li, Wan-Tong (2004)

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On the rational recursive sequence $x_{n + 1} = (A + \sum_{i = 0}^{k} α_{i} x_{n - i}) / (B + \sum_{i = 0}^{k} β_{i} x_{n - i})$ .

Zayed, E.M.E., El-Moneam, M.A. (2007)

International Journal of Mathematics and Mathematical Sciences

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Global stability of a rational difference equation.

Tang, Guo-Mei, Hu, Lin-Xia, Ma, Gang (2010)

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Dynamics of a higher-order nonlinear difference equation.

Tang, Guo-Mei, Hu, Lin-Xia, Jia, Xiu-Mei (2010)

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On the rational recursive sequence $x_{n + 1} = (A + \sum_{i = 0}^{k} α_{i} x_{n - i}) / \sum_{i = 0}^{k} β_{i} x_{n - i}$

E. M. E. Zayed, M. A. El-Moneam (2008)

Mathematica Bohemica

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The main objective of this paper is to study the boundedness character, the periodic character, the convergence and the global stability of positive solutions of the difference equation $x_{n + 1} = (A + \sum_{i = 0}^{k} α_{i} x_{n - i}) / \sum_{i = 0}^{k} β_{i} x_{n - i}, n = 0, 1, 2, \dots$ where the coefficients $A$ , $α_{i}$ , $β_{i}$ and the initial conditions $x_{- k}, x_{- k + 1}, \dots, x_{- 1}, x_{0}$ are positive real numbers, while $k$ is a positive integer number.

On the difference equation $x_{n + 1} = a x_{n} - b x_{n} / (c x_{n} - d x_{n - 1})$ .

Elabbasy, E.M., El-Metwally, H., Elsayed, E.M. (2006)

Advances in Difference Equations [electronic only]

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Rate of convergence of solutions of rational difference equation of second order.

Kalabušić, S., Kulenović, M.R.S. (2004)

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Asymptotic behavior of equilibrium point for a family of rational difference equations.

Wang, Chang-You, Shi, Qi-Hong, Wang, Shu (2010)

Advances in Difference Equations [electronic only]

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On the rational recursive sequence $x_{n + 1} = \frac{α_{0} x_{n} + α_{1} x_{n - l} + α_{2} x_{n - k}}{β_{0} x_{n} + β_{1} x_{n - l} + β_{2} x_{n - k}}$

E. M. E. Zayed, M. A. El-Moneam (2010)

Mathematica Bohemica

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The main objective of this paper is to study the boundedness character, the periodicity character, the convergence and the global stability of positive solutions of the difference equation $x_{n + 1} = \frac{α_{0} x_{n} + α_{1} x_{n - l} + α_{2} x_{n - k}}{β_{0} x_{n} + β_{1} x_{n - l} + β_{2} x_{n - k}}, n = 0, 1, 2, \dots$ where the coefficients $α_{i}, β_{i} \in (0, \infty)$ for $i = 0, 1, 2,$ and $l$ , $k$ are positive integers. The initial conditions $x_{- k}, \dots, x_{- l}, \dots, x_{- 1}, x_{0}$ are arbitrary positive real numbers such that $l < k$ . Some numerical experiments are presented.

Displaying similar documents to “On the rational recursive sequence x n + 1 = ( α - β x n ) / ( γ - δ x n - x n - k ) .”

Displaying similar documents to “On the rational recursive sequence $x_{n + 1} = (α - β x_{n}) / (γ - δ x_{n} - x_{n - k})$ .”