Open Problems and Conjectures
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Publication:5693607
DOI10.1080/10236190500044197zbMath1071.39502OpenAlexW4252280046WikidataQ122916196 ScholiaQ122916196MaRDI QIDQ5693607
Elias Camouzis, Eugene P. Quinn, Gerasimos E. Ladas
Publication date: 26 September 2005
Published in: Journal of Difference Equations and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/10236190500044197
Related Items (19)
Global analysis of solutions of \(x_{n+1}= \frac{\beta x_n + \delta x_{n-2}}{A+Bx_n+Cx_{n-1}}\) ⋮ On the boundedness character of rational equations, part 3 ⋮ On the asymptotic behavior of a system of two rational difference equations ⋮ On the dynamics of \(x_{n+1}= \frac {\delta x-{n-2}+x_{n-3}}{A+x_{n-3}}\) ⋮ On the boundedness character of some rational difference equations ⋮ On the rational \((k+1, k+1)\)-type difference equation ⋮ Progress report on the boundedness character of third-order rational equations ⋮ The global attractivity of the rational difference equation \(y_n = \frac{y_{n-k}+y_{n-m}}{1+y_{n-k}y_{n-m}}\) ⋮ Open Problems and Conjectures ⋮ On the boundedness and local stability of ⋮ On second-order rational difference equations, part 1 ⋮ On second-order rational difference equations, Part 2 ⋮ On third-order rational difference equations, part 1 ⋮ Global dynamics of a \(3 \times 6\) system of difference equations ⋮ On the boundedness of some rational difference equations ⋮ On the boundedness character of rational equations, part 1 ⋮ On the boundedness character of rational equations, part 2 ⋮ When does local asymptotic stability imply global attractivity in rational equations? ⋮ When does periodicity destroy boundedness in rational equations?
Cites Work
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- Open Problems and Conjectures
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- Open problems and conjectures
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