Global bifurcation of periodic solutions to some autonomous differential delay equations
- 1 August 1983
- journal article
- Published by Elsevier in Applied Mathematics and Computation
- Vol. 13 (1-2) , 185-211
- https://doi.org/10.1016/0096-3003(83)90037-1
Abstract
No abstract availableThis publication has 11 references indexed in Scilit:
- Numerical integration of the Davidenko equationPublished by Springer Nature ,1981
- Effective computation of periodic orbits and bifurcation diagrams in delay equationsNumerische Mathematik, 1980
- Uniqueness and nonuniqueness for periodic solutions of x′(t) = −g(x(t − 1))Journal of Differential Equations, 1979
- The Leray-Schauder continuation method is a constructive element in the numerical study of nonlinear eigenvalue and bifurcation problemsPublished by Springer Nature ,1979
- Periodic solutions of nonlinear autonomous functional differential equationsLecture Notes in Mathematics, 1979
- Oscillation and Chaos in Physiological Control SystemsScience, 1977
- The range of periods of periodic solutions of x′(t) = − αf(x(t − 1))Journal of Mathematical Analysis and Applications, 1977
- On the Stability of a Periodic Solution of a Differential Delay EquationSIAM Journal on Mathematical Analysis, 1975
- Periodic solutions of some nonlinear autonomous functional differential equationsAnnali di Matematica Pura ed Applicata (1923 -), 1974
- Periodic solutions of nonlinear functional differential equationsJournal of Differential Equations, 1971