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Non-resonance for linear differential systems

Published online by Cambridge University Press:  14 November 2011

M.S.P. Eastham  and
J.B. McLeod
M.S.P. Eastham
Affiliation:
King's College (University of London), Strand, London WC2R 2LS, U.K.
J.B. McLeod
Affiliation:
Mathematical Institute, St Giles, Oxford OX1 3LB, U.K.
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Synopsis

The existence of a set of real numbers σ, depending only on ∧0, is established such that if λ ∉ σ, the system Y'=(i∧0 + R)Y can be transformed into a system Z' = (i∧ + S)Z of the Levinson form. Here ∧0 and ∧ are real diagonal matrices, with ∧0 constant, and R(x) = ξ(x)T(λx). The scalar factor ξ(x) is o(l) (x →∞) and T belongs to a certain class of periodic matrices. The consequences for non-resonance, and the necessity of this class, are discussed.

Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , Volume 111 , Issue 1-2 , 1989 , pp. 103 - 122
Copyright
Copyright © Royal Society of Edinburgh 1989

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References

1Atkinson, F. V.. The asymptotic solution of second-order differential equations. Ann. Mat. Pura Appl. 37 (1954), 347378.CrossRefGoogle Scholar
2Becker, R. I.. Asymptotic expansions of second-order linear differential equations having conditionally integrable coefficients. J. London Math. Soc. (2) 20 (1979), 472484.CrossRefGoogle Scholar
3Cassell, J. S.. The asymptotic integration of some oscillatory differential equations. Quart. J. Math. (Oxford) Ser. (2) 33 (1982), 281296.CrossRefGoogle Scholar
4Eastham, M. S. P.. The asymptotic solution of linear differential systems. Mathematika 32 (1985), 131138.CrossRefGoogle Scholar
5Eastham, M. S. P. and El-Sharif, N. S. A.. Resonant perturbations of harmonic oscillation. J. London Math. Soc. (2) 34 (1986), 291299.CrossRefGoogle Scholar
6Harris, W. A. and Lutz, D. A.. Asymptotic integration of adiabatic oscillators. J. Math. Anal. Appl. 51 (1975), 7693.CrossRefGoogle Scholar
7Harris, W. A. and Lutz, D. A.. A unified theory of asymptotic integration. J. Math. Anal. Appl. 57 (1977), 571586.CrossRefGoogle Scholar
8Hartman, P.. On a class of perturbations of the harmonic oscillator. Proc. Amer. Math. Soc. 19 (1968), 533540.CrossRefGoogle Scholar
9Kelman, R. B. and Madsen, N. K.. Stable motions of the linear adiabatic oscillator. J. Math. Anal. Appl. 21 (1968), 458465.CrossRefGoogle Scholar
10Levinson, N.. The asymptotic nature of solutions of linear differential equations. Duke Math. J. 15(1948), 111126.CrossRefGoogle Scholar
11Samokhin, Yu. A. and Fomin, V. N.. Asymptotic integration of a system of differential equations with oscillatory decreasing coefficients. Problems in the modern theory of periodic motions 5, 4550 (Bibl. Trudov Izhevsk Mat. Sem. Izhevsk, 1981); Math. Reviews 86 (1986), 34098.Google Scholar