New stability conditions for linear difference equations using Bohl–Perron type theorems
DOI10.1080/10236190903146938zbMath1222.39014arXiv0906.3239OpenAlexW2094993263MaRDI QIDQ3016318
Leonid Berezansky, Elena Braverman
Publication date: 15 July 2011
Published in: Journal of Difference Equations and Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0906.3239
exponential stabilitypositive solutionlinear delay difference equationspositive fundamental function
Discrete version of topics in analysis (39A12) Growth, boundedness, comparison of solutions to difference equations (39A22) Stability theory for difference equations (39A30) Linear difference equations (39A06)
Cites Work
- Unnamed Item
- Periodicity and stability of linear Volterra difference systems
- Discrete Halanay-type inequalities and applications.
- On explicit conditions for the asymptotic stability of linear higher order difference equations
- On exponential dichotomy, Bohl--Perron type theorems and stability of difference equations
- Global asymptotic stability in a perturbed higher-order linear difference equation.
- Asymptotic stability for a linear difference equation with variable delay
- A global attractivity criterion for nonlinear non-autonomous difference equations
- Asymptotic estimates and exponential stability for higher-order monotone difference equations
- Asymptotic behavior of Volterra difference equation
- A note on explicit stability conditions for autonomous higher order difference equations
- Nonoscillation of linear delay difference equations with positive and negative coefficients
- Global attractivity in a delay difference equation
- Uniform asymptoic stability in linear volterra difference equations
- Boundedness and Stability for Higher Order Difference Equations*
- Global stability of a linear nonautonomous delay difference equation1
- Sufficient conditions for the global stability of nonautonomous higher order difference equations
This page was built for publication: New stability conditions for linear difference equations using Bohl–Perron type theorems
