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Non-linear boundary value problems for systems of differential equations†

Published online by Cambridge University Press:  14 February 2012

H. W. Knobloch  and
K. Schmitt
H. W. Knobloch
Affiliation:
Mathematisches Institut, Am Hubland, Würzburg
K. Schmitt
Affiliation:
Department of Mathematics, University of Utah
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Synopsis

The paper deals with boundary value problems for second-order vector differential equations x″ = f (t, x, x′). Given a region Ω in (t, x)-space we ask whether there exists a solution x(t) of the problem satisfying (t, x(t)) ∊Ω. We arrive at a rather general type of conditions which are sufficient in order that Ω has the desired property. One of these conditions is geometric in nature and depends upon the boundary data only. The second condition can be expressed in terms of inequalities and depends upon the values of f on ∂Ω. These inequalities turn out to be the common background of a variety of conditions which can be found in the literature on boundary value problems and which in the case of a scalar equation reduce to the well-known properties of upper and lower solutions.

Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , Volume 78 , Issue 1-2 , 1977 , pp. 139 - 159
Copyright
Copyright © Royal Society of Edinburgh 1977

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References

1Bebernes, J. W.A simple alternative problem for finding periodic solutions of second order ordinary differential systems. Proc. Atner. Math. Soc. 42 (1974), 121127.CrossRefGoogle Scholar
2Bebernes, J. W. and Schmitt, K.An existence theorem for periodic boundary value problems for systems of second order differential equations. Arch. Math. (Brno) 8 (1972), 173176.Google Scholar
3Bebernes, J. W. and Schmitt, K.Periodic boundary value problems for systems of second order differential equations. J. Differential Equations 13 (1973), 3247.CrossRefGoogle Scholar
4Gustafson, G. B. and Schmitt, K.Periodic solutions of hereditary differential systems. J. Differential Equations 13 (1973), 567587.CrossRefGoogle Scholar
5Hartman, P.On boundary value problems for systems of ordinary nonlinear second order differential equations. Trans. Amer. Math. Soc. 96 (1960), 493509.CrossRefGoogle Scholar
6Hartman, P.Ordinary differential equations (New York: Interscience, 1964).Google Scholar
7Hukuhara, M.Families Kneseriennes et le probleme aux limites. Pub!. Res. Inst. Math. Sci. Ser. A 4 (1968), 131147.CrossRefGoogle Scholar
8Knobloch, H. W.Eine neue Methode zur Approximation periodischer Losungen nicht linearer Differentialgleichungen zweiter Ordnung. Math. Z. 82 (1963), 177197.CrossRefGoogle Scholar
9Knobloch, H. W.On the existence of periodic solutions of second order vector differential equations. J. Differential Equations 9 (1971), 6785.CrossRefGoogle Scholar
10Mawhin, J.Existence of periodic solutions for higher order differential systems that are not of class D. J. Differential Equations 8 (1970), 523530.CrossRefGoogle Scholar
11Mawhin, J.Boundary value problems for nonlinear second order vector differential equations. J. Differential Equations 16 (1974), 257269.CrossRefGoogle Scholar
12Schmitt, K.Periodic solutions of nonlinear second order differential equations. Math. Z. 98 (1967), 200207.CrossRefGoogle Scholar
13Schmitt, K.Periodic solutions of systems of second order differential equations. J. Differential Equations 11 (1972), 180192.CrossRefGoogle Scholar
14Schmitt, K. and Thompson, R.Boundary value problems for infinite systems of second order differential equations. J. Differential Equations 18 (1975), 277295.CrossRefGoogle Scholar
15Schwartz, J. T.Nonlinear functional analysis (New York: Gordon and Breach, 1969).Google Scholar