The following pages link to (Q3639735):
Displaying 12 items.
- On the period-two cycles of \(x_{n + 1} = (\alpha + \beta x_n + \gamma x_{n - k})/(A + Bx_n + Cx_{n - k})\) (Q369752) (← links)
- New method to obtain periodic solutions of period two and three of a rational difference equation (Q494897) (← links)
- On the dynamics of the nonlinear rational difference equation \(x_{n+1}=Ax_{n}+Bx_{n-k}+Cx_{n-l}+\frac{bx_{n-k}}{dx{n-k}-ex{n-1}}\) (Q900495) (← links)
- On the rational recursive sequence \(x_{n+1}=Ax_{n}+Bx_{n-k}+\frac{\beta x_{n}+\gamma x_{n-k}}{cx_{n}+Dx_{n-k}}\) (Q983686) (← links)
- On the rational recursive sequence \(y_n = A + \frac{y_{n-1}}{y_{n-m}}\) for smalla (Q998594) (← links)
- On the solutions of some nonlinear systems of difference equations (Q1648765) (← links)
- On the difference equation \(x_{n+1}=ax_{n-l}+bx_{n-k}+f ( x_{n-l},x_{n-k} )\) (Q1716309) (← links)
- On the rational recursive two sequences \(x_{n+1}=ax_{n-k}+bx_{n-k}/(cx_n+\delta dx_{n-k})\) (Q2431298) (← links)
- Global stability of a higher order rational recursive sequence (Q2506334) (← links)
- On the rational recursive sequence $ \ x_{n+1}=\Big ( A+\sum _{i=0}^k\alpha _ix_{n-i}\Big ) \Big / \sum _{i=0}^k\beta _ix_{n-i} $ (Q3392727) (← links)
- (Q3837530) (← links)
- On the rational difference equation y n + 1 = α 0 y n + α 1 y n − p + α 2 y n − q + α 3 y n − r + α 4 y n − s β 0 y n + β 1 y n − p + β 2 y n − q + β 3 y n − r + β 4 y n − s (Q5225339) (← links)