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Existence and stability of periodic solutions of a third-order non-linear autonomous system simulating immune response in animals

Published online by Cambridge University Press:  14 February 2012

In-Ding Hsü
Affiliation:
State University of New York at Buffalo
Nicholas D. Kazarinoff
Affiliation:
State University of New York at Buffalo

Synopsis

A 3 × 3 autonomous, non-linear system of ordinary differential equations modelling the immune response in animals to invasion by active self-replicating antigens has been introduced by G. I. Bell and studied by G. H. Pimbley Jr. Using Hopf's theorem on bifurcating periodic solutions and a stability criterion of Hsu and Kazarinoff, we obtain existence of a family of unstable periodic solutions bifurcating from one steady state of a reduced 2×2 form of the 3×3 system. We show that no periodic solutions bifurcate from the other steady state. We also prove existence and exhibit a stability criterion for families of periodic solutions of the full 3×3 system. We provide two numerical examples. The second shows existence of orbitally stable families of periodic solutions of the 3×3 system.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 1977

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References

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