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Periodic solutions of special differential equations: an example in non-linear functional analysis

Published online by Cambridge University Press:  14 November 2011

Roger D. Nussbaum
Roger D. Nussbaum
Affiliation:
Department of Mathematics, Rutgers, The State University of New Jersey, U.S.A.
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Synopsis

We consider differential-delay equations which can be written in the form

The functions fi and gk are all assumed odd. The equation

is a special case of such equations with q = N + 1 (assuming f is an odd function). We obtain an essentially best possible theorem which ensures the existence of a non-constant periodic solution x(t) with the properties (1) x(t)≧0 for 0≦tq, (2) x(–t) = –x(t) for all t and (3) x(t + q) = –x(t) for all t. We also derive uniqueness and constructibility results for such special periodic solutions. Our theorems answer a conjecture raised in [8].

Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , Volume 81 , Issue 1-2 , 1978 , pp. 131 - 151
Copyright
Copyright © Royal Society of Edinburgh 1978

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References

1Amann, H.Fixed point equations and nonlinear eigenvalue problems in ordered Banach spaces. SIAM Rev. 18 (1976), 620709.CrossRefGoogle Scholar
2Bushell, P. J.Hilbert's metric and positive contraction mappings in a Banach space. Arch. Rational Mech. Anal. 52 (1973), 330338.Google Scholar
3Dancer, E. N.Global solution branches for positive mappings. Arch. Rational Mech. Anal. 52 (1973), 181192.CrossRefGoogle Scholar
4Dancer, E. N.On the structure of solutions of non-linear eigenvalue problems. Indiana Univ. Math. J. 23 (1974), 10691076.Google Scholar
5Dancer, E. N.Solution branches for mappings in cones and applications. Bull. Austral. Math. Soc. 11 (1974), 131143.Google Scholar
6Ize, J.Bifurcation theory for Fredholm operators. Mem. Amer. Math. Soc. 7 (1976), 174.Google Scholar
7Jones, G. S.Periodic motions in Banach space and applications to functional-differential equations. Contributions to Differential Equations 3 (1964), 75106.Google Scholar
8Kaplan, J. and Yorke, J.Ordinary differential equations which yield periodic solutions of differential delay equations. J. Math. Anal. Appl. 48 (1974), 317324.CrossRefGoogle Scholar
9Krasnosel'skii, M. A.Fixed points of cone-compressing or cone-extending operators. Soviet Math. Dokl. 1 (1960), 12851288.Google Scholar
10Krasnosel'skii, M. A.Positive Solutions of Operator Equations (Groningen: Noordhoff, 1964).Google Scholar
11Krein, M. G. and Rutman, M. A.Linear operators leaving invariant a cone in a Banach space. Amer. Math. Soc. Transl. 26 (1950).Google Scholar
12Nussbaum, R. D.Periodic solutions of some nonlinear, autonomous functional differential equations. II. J. Differential Equations 14 (1973), 360394.CrossRefGoogle Scholar
13Nussbaum, R. D.A global bifurcation theorem with applications to functional differential equations. J. Functional Analysis 19 (1975), 319339.Google Scholar
14Nussbaum, R. D. Differential-delay equations with two time lags, submitted for publication.Google Scholar
15Rabinowitz, P.Some global results for nonlinear eigenvalue problems. J. Functional Analysis 7 (1971), 487513.CrossRefGoogle Scholar
16Schaefer, H. H.Topological Vector Spaces (New York: Springer, 1971).Google Scholar
17Thompson, A. C.On certain contraction mappings in a partially ordered vector space. Proc. Amer. Math. Soc. 14 (1963), 438443.Google Scholar
18Turner, R. E. L.Transversality and cone maps. Arch. Rational Mech. Anal. 58 (1975), 151179.Google Scholar