On the difference equation \(x_{n+1}=\frac{a+bx_{n-k}^{cx_n-m}}{1+g(x_{n-1})}\)
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Publication:2471330
DOI10.1007/BF02832347zbMath1137.39009OpenAlexW1982389669MaRDI QIDQ2471330
Publication date: 22 February 2008
Published in: Journal of Applied Mathematics and Computing (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02832347
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Cites Work
- Linearized oscillations in nonautonomous delay differential equations
- Global attractivity in the recursive sequence \(x_{n+1}=(\alpha-\beta x_{n})/(\gamma-x_{n-1})\)
- On the recursive sequence \(x_{n+1}=\frac{A}{\prod^ k_{i=0}x_{n-i}}+\frac{1}{\prod^{2(k+1)}_{j=k+2}x_{n-j}}\).
- On the recursive sequence \(x_{n+1}= -1/x_n+ A/x_{n-1}\)
- Periodicity and attractivity of a nonlinear higher order difference equation
- On the recursive sequence \(x_{n+1}=\frac{\alpha+\beta x_{n-1}}{1+g(x_n)}\)
- On the recursive sequence \(x_{n+1}=x_{n-1}/g(x_n)\)
- The recursive sequence \(x_{n+1} = g(x_{n},x_{n-1})/(A + x_{n})\)
- Global stability for a class of difference equation
- Periodicity and attractivity for a rational recursive sequence
- A Note on the Difference Equation x n +1 = ∑ i =0 k α i x n − i p i
- On the Recursive Sequencexn+1=α+ (βxn−1)/(1 +g(xn))
- Asymptotic behavior of a sequence defined by iteration with applications
- Stability of the recursive sequence \(x_{n+1}=(\alpha-\beta x_n)/(\gamma+x_{n-1})\)
- A global convergence result with applications to periodic solutions
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