The behavior of positive solutions of a nonlinear second-order difference equation
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Publication:938346
DOI10.1155/2008/653243zbMath1146.39018OpenAlexW2034590304WikidataQ58644381 ScholiaQ58644381MaRDI QIDQ938346
Kenneth S. Berenhaut, Stevo Stević
Publication date: 19 August 2008
Published in: Abstract and Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/54553
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Related Items (7)
Existence and asymptotic behavior of positive solutions of functional differential equations of delayed type ⋮ Two classes of positive solutions of first order functional differential equations of delayed type ⋮ On global attractivity of a class of nonautonomous difference equations ⋮ On a higher-order difference equation ⋮ Weighted asymptotically periodic solutions of linear Volterra difference equations ⋮ On the recursive sequence \(x_{n+1}=A+(x_{n - 1}^p/x_n^q)\) ⋮ On boundedness of solutions of the difference equation \(x_{n+1}=(px_n+qx_{n - 1})/(1+x_n)\) for \(q>1+p>1\)
Cites Work
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- On boundedness of the solutions of the difference equation \(x_{n+1}=x_{n-1}/(p+x_{n})\)
- On the rational recursive sequence \(y_n = A + \frac{y_{n-1}}{y_{n-m}}\) for smalla
- On the recursive sequence \(x_{n+1}=\alpha+x_{n-1}/x_n\)
- Asymptotic behavior of a nonlinear difference equation
- On asymptotic behaviour of the difference equation \(x_{n+1} = \alpha+\frac{x_{n-1}^p}{x_n^p}\).
- 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 \(x_{n+1}=\frac{\alpha+\beta x_{n-1}}{1+g(x_n)}\)
- On the recursive sequence \(x_{n+1}=x_{n-1}/g(x_n)\)
- On the recursive sequence \(x_{n+1}=\alpha+\frac{x^p_{n-1}}{x_n^p}\)
- On global periodicity of a class of difference equations
- On the recursive sequence \(x_{n}=1+\sum _{i=1}^{k}\alpha_i x_{n - p_{i}}/\sum _{j=1}^{m} \beta _{j}x_{n - q_j}\)
- On the recursive sequence \(x_{n+1}=A+x_{n}^{p}/x_{n-1}^{p}\)
- A global convergence result for a higher order difference equation
- On the recursive sequence \(x_{n+1}=\frac{\alpha+\beta x_{n-k}}{f(x_n,\dots,x_{n-k+1})}\)
- On convergence of a recursive sequence \(x_{n+1}= f(x_{n-1},x_n)\)
- A note on the difference equation
- The behaviour of the positive solutions of the difference equation
- Recursively Generated Periodic Sequences
- On the Recursive Sequencexn+1=
- Asymptotic 2–periodic difference equations with diagonally self–invertible responses
- Short Note: A Note on Periodic Character of a Difference Equation
- Periodic solutions of the rational difference equation
- Global Periodicity Of
- Periodicity of some classes of holomorphic difference equations
- On the recursive sequence
- Some periodic and non-periodic recursions
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