Smooth bifurcation of symmetric periodic solutions of functional differential equations
- 30 November 1989
- journal article
- Published by Elsevier in Journal of Differential Equations
- Vol. 82 (1) , 109-155
- https://doi.org/10.1016/0022-0396(89)90170-8
Abstract
No abstract availableThis publication has 12 references indexed in Scilit:
- Exact formulae for periodic solutions of $$\dot x(t + 1) = \alpha x(t) + bx^3 (t))$$Zeitschrift für angewandte Mathematik und Physik, 1986
- Circulant matrices and differential-delay equationsJournal of Differential Equations, 1985
- Global bifurcation of periodic solutions to some autonomous differential delay equationsApplied Mathematics and Computation, 1983
- Asymptotic analysis of delay differential equationsmanuscripta mathematica, 1982
- Effective computation of periodic orbits and bifurcation diagrams in delay equationsNumerische Mathematik, 1980
- Existence of periodic solutions of one-dimensional differential-delay equationsTohoku Mathematical Journal, 1978
- Oscillation and Chaos in Physiological Control SystemsScience, 1977
- Ordinary differential equations which yield periodic solutions of differential delay equationsJournal of Mathematical Analysis and Applications, 1974
- Bifurcation from simple eigenvaluesJournal of Functional Analysis, 1971
- CIRCULAR CAUSAL SYSTEMS IN ECOLOGYAnnals of the New York Academy of Sciences, 1948