Bifurcation analysis in a two-dimensional neutral differential equation
DOI10.1155/2013/367589zbMath1277.34105OpenAlexW2149660700WikidataQ58916058 ScholiaQ58916058MaRDI QIDQ369896
Publication date: 19 September 2013
Published in: Abstract and Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2013/367589
Transformation and reduction of functional-differential equations and systems, normal forms (34K17) Neutral functional-differential equations (34K40) Periodic solutions to functional-differential equations (34K13) Bifurcation theory of functional-differential equations (34K18) Invariant manifolds of functional-differential equations (34K19)
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Bifurcation analysis in a neutral differential equation
- Normal forms for NFDEs with parameters and application to the lossless transmission line
- Bifurcation in two-dimensional neural network model with delay
- Hopf bifurcation for neutral functional differential equations
- Applications of centre manifold theory
- Introduction to functional differential equations
- On a planar system modelling a neuron network with memory
- Global continua of periodic solutions to some difference-differential equations of neutral type
- Stability and bifurcation in a neural network model with two delays.
- Self-sustained oscillations in a ring array of coupled lossless transmission lines
- Hopf bifurcation calculations for scalar neutral delay differential equations
- Slowly oscillating periodic solutions for a delayed frustrated network of two neurons
This page was built for publication: Bifurcation analysis in a two-dimensional neutral differential equation
