Solution manifolds which are almost graphs
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Publication:2048502
DOI10.1016/j.jde.2021.05.024zbMath1503.34112OpenAlexW3163014463MaRDI QIDQ2048502
Publication date: 6 August 2021
Published in: Journal of Differential Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jde.2021.05.024
General theory of functional-differential equations (34K05) Graph representations (geometric and intersection representations, etc.) (05C62) Functional-differential equations with state-dependent arguments (34K43)
Related Items (4)
On solution manifolds of differential systems with discrete state-dependent delays ⋮ Solution manifolds of differential systems with discrete stated-dependent delays are almost graphs ⋮ Persistence of Periodic Orbits under State-dependent Delayed Perturbations: Computer-assisted Proofs ⋮ Explicit abstract neutral differential equations with state-dependent delay: existence, uniqueness and local well-posedness
Cites Work
- Unnamed Item
- On a differential equation with state-dependent delay. A center-unstable manifold connecting an equilibrium and a periodic orbit
- Center-stable manifolds for differential equations with state-dependent delays
- Boundary layer phenomena for differential-delay equations with state- dependent time lags. I
- Introduction to functional differential equations
- Periodic solutions for functional differential equations with multiple state-dependent time lags
- The solution manifold and \(C^{1}\)-smoothness for differential equations with state-dependent delay.
- Stable periodic motion of a system with state dependent delay.
- Boundary layer phenomena for differential-delay equations with state-dependent time lags: III.
- Delay equations. Functional-, complex-, and nonlinear analysis
- A periodic solution with non-simple oscillation for an equation with state-dependent delay and strictly monotonic negative feedback
- Solutions with dense short segments from regular delays
- Global stability of a competitive model with state-dependent delay
- The Poincaré-Bendixson theorem for a class of delay equations with state-dependent delay and monotonic feedback
- A periodic solution of a differential equation with state-dependent delay
- Superstability and rigorous asymptotics in singularly perturbed state-dependent delay-differential equations
- Parabolic partial differential equations with discrete state-dependent delay: classical solutions and solution manifold
- Smoothness issues in differential equations with state-dependent delay
- Slowly oscillating periodic solutions of autonomous state-dependent delay equations
- Boundary layer phenomena for differential-delay equations with state dependent time lags: II.
- Corrigendum to "A state-dependent delay equation with chaotic solutions" [Electron. J. Qual. Theory Differ. Equ. 2019, No. 22, 1–20]
- The two-dimensional attractor of a differential equation with state-dependent delay
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