Relaxation Cycles in the Generalized Logistic Equation with Delay
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Publication:6072315
DOI10.33581/1561-4085-2022-25-4-377-380OpenAlexW4313245433MaRDI QIDQ6072315
A. O. Tolbey, Sergey A. Kaschenko
Publication date: 13 October 2023
Published in: Nonlinear Phenomena in Complex Systems (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.33581/1561-4085-2022-25-4-377-380
Cites Work
- Unnamed Item
- Delay differential equations: with applications in population dynamics
- The Hopf bifurcation and its applications. With contributions by P. Chernoff, G. Childs, S. Chow, J. R. Dorroh, J. Guckenheimer, L. Howard, N. Kopell, O. Lanford, J. Mallet-Paret, G. Oster, O. Ruiz, S. Schecter, D. Schmidt, and S. Smale
- Periodic solutions of nonlinear equations generalizing logistic equations with delay
- Theory and applications of partial functional differential equations
- Bifurcations in a delay logistic equation under small perturbations
- Estimation of the region of global stability of the equilibrium state of the logistic equation with delay
- A non-linear difference-differential equation.
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