Home | Quick Search | Advanced Search | Bibliography submission | Bibliography submission using bibtex | Bibliography submission using bibtex file | Links | Help | Internal

Details:

   
TitleAlgebraic analysis of bifurcation and limit cycles for biological systems.
Author(s) Wei Niu, Dongming Wang
TypeBook, Chapter in Book, Conference Proceeding
AbstractIn this paper, we show how to analyze bifurcation and limit cycles for biological systems by using an algebraic approach based on triangular decomposition, Gröbner bases, discriminant varieties, real solution classification, and quantifier elimination by partial CAD. The analysis of bifurcation and limit cycles for a concrete two-dimensional system, the self-assembling micelle system with chemical sinks, is presented in detail. It is proved that this system may have a focus of order 3, from which three limit cycles can be constructed by small perturbation. The applicability of our approach is further illustrated by the construction of limit cycles for a two-dimensional Kolmogorov prey-predator system and a three-dimensional Lotka–Volterra system.
ISBN978-3-540-85100-4/pbk
URL http://link.springer.com/chapter/10.1007%2F978-3-540-85101-1_12
LanguageEnglish
Pages156--171
PublisherBerlin: Springer
Year2008
Edition0
Translation No
Refereed No
Webmaster