Belousov-Zhabotinsky type reactions: the non-linear behavior of chemical systems
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Publication:830823
DOI10.1007/s10910-021-01223-9zbMath1466.92300OpenAlexW3135069445MaRDI QIDQ830823
Alessandro Monteverde, Marco Piumetti, Andrea Cassani
Publication date: 10 May 2021
Published in: Journal of Mathematical Chemistry (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10910-021-01223-9
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Qualitative analysis and Hopf bifurcation of a generalized Lengyel-Epstein model ⋮ Hopf Bifurcation and Self-Organization Pattern of a Modified Brusselator Model ⋮ Solvability of the symmetric nonlinear functional differential equations
Cites Work
- Spatial chaos on surface and its associated bifurcation and Feigenbaum problem
- Bifurcation analysis of the Oregonator model
- 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
- Mathematical biology. Vol. 2: Spatial models and biomedical applications.
- Route to chaos and some properties in the boundary crisis of a generalized logistic mapping
- Super-critical and sub-critical bifurcations in a reaction-diffusion Schnakenberg model with linear cross-diffusion
- Methodology for a nullcline-based model from direct experiments: applications to electrochemical reaction models
- Numerical Experiments on the Turing Instability in the Oregonator Model
- The chemical basis of morphogenesis
- On invariant surfaces and bifurcation of periodic solutions of ordinary differential equations
- A simple method of parameter space determination for diffusion-driven instability with three species
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