Existence and stability of periodic solution to delayed nonlinear differential equations
From MaRDI portal
Publication:1722208
DOI10.1155/2014/156948zbMath1470.34178OpenAlexW2142701601WikidataQ59035581 ScholiaQ59035581MaRDI QIDQ1722208
Huicheng Wang, Xiang Gu, Patricia J. Y. Wong, Yong-Hui Xia
Publication date: 14 February 2019
Published in: Abstract and Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2014/156948
Stability theory of functional-differential equations (34K20) Periodic solutions to functional-differential equations (34K13)
Related Items
Periodic solutions of multispecies mutualism system with infinite delays ⋮ Periodic solutions of a stage-structured plant-hare model with toxin-determined functional responses
Cites Work
- Global asymptotic stability of an almost periodic nonlinear ecological model
- Global analysis of an impulsive delayed Lotka-Volterra competition system
- Harmless delays for uniform persistence
- Bifurcation analysis for a regulated logistic growth model
- Average conditions for permanence and extinction in nonautonomous Gilpin-Ayala competition model
- Retracted: Bifurcation analysis in the delayed Leslie-Gower predator-prey system
- Dynamic of a non-autonomous predator-prey system with infinite delay and diffusion
- Discrete delay, distributed delay and stability switches
- Coincidence degree, and nonlinear differential equations
- Existence and global attractivity of positive periodic solutions to periodic \(n\)-species Lotka-Volterra competition systems with several deviating arguments
- Global attractivity of an almost periodic \(N\)-species nonlinear ecological competitive model
- Stability and global Hopf bifurcation in a delayed predator-prey system
- New Conditions on the Existence and Stability of Periodic Solution in Lotka–Volterra's Population System
- PERIODIC SOLUTION OF CERTAIN NONLINEAR DIFFERENTIAL EQUATIONS: VIA TOPOLOGICAL DEGREE THEORY AND MATRIX SPECTRAL THEORY
- Global Models of Growth and Competition
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
