Asymptotic behaviour of solutions to non-commensurate fractional-order planar systems
DOI10.1007/S13540-022-00065-9zbMath1503.34011arXiv2205.01744OpenAlexW4229062795WikidataQ114016979 ScholiaQ114016979MaRDI QIDQ2110527
Hoang The Tuan, Kai Diethelm, Ha Duc Thai
Publication date: 21 December 2022
Published in: Fractional Calculus \& Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2205.01744
global attractivityasymptotic behaviour of solutionsMittag-Leffler stabilityfractional order planar systems
Fractional derivatives and integrals (26A33) Stability theory of functional-differential equations (34K20) Stability of solutions to ordinary differential equations (34D20) Fractional ordinary differential equations (34A08) Functional-differential equations with fractional derivatives (34K37)
Related Items (2)
Cites Work
- Unnamed Item
- Which functions are fractionally differentiable?
- Stability of fractional-order nonlinear dynamic systems: Lyapunov direct method and generalized Mittag-Leffler stability
- The analysis of fractional differential equations. An application-oriented exposition using differential operators of Caputo type
- Fractional differential equations. An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications
- Coprime factorizations and stability of fractional differential systems
- Numerical solution of fractional differential equations: a survey and a software tutorial
- Asymptotic behavior of solutions of linear multi-order fractional differential systems
- Exact stability and instability regions for two-dimensional linear autonomous multi-order systems of fractional-order differential equations
- Stability and resonance analysis of a general non-commensurate elementary fractional-order system
- Stability of scalar nonlinear fractional differential equations with linearly dominated delay
- On asymptotic properties of solutions to fractional differential equations
- A stability test for non-commensurate fractional order systems
- Linearized asymptotic stability for fractional differential equations
- Stability and Performance Analysis for Positive Fractional-Order Systems With Time-Varying Delays
- Applications in Physics, Part A
- Applications in Control
- A Qualitative Theory of Time Delay Nonlinear Fractional-Order Systems
- Stability of two‐component incommensurate fractional‐order systems and applications to the investigation of a FitzHugh‐Nagumo neuronal model
- Mittag-Leffler Functions, Related Topics and Applications
- Applications in Engineering, Life and Social Sciences, Part B
- Applications in Engineering, Life and Social Sciences, Part B
- Positivity and stability of mixed fractional‐order systems with unbounded delays: Necessary and sufficient conditions
This page was built for publication: Asymptotic behaviour of solutions to non-commensurate fractional-order planar systems
