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On the asymptotic behaviour of the solutions of a class of non-linear differential equations

Published online by Cambridge University Press:  24 October 2008

F. G. Friedlander
Affiliation:
The UniversityManchester 13

Extract

1. This paper is concerned with certain asymptotic properties of the solutions of the differential equation

where dots indicate differentiation with respect to t, k is a small parameter, and f(x, ẋ, t) satisfies certain conditions which will be formulated below. Equations of this type occur frequently in non-linear mechanics; for k = 0 a system satisfying (1·1) behaves as a harmonic oscillator. To ensure the existence and uniqueness of the solutions of (1·1) it must be assumed that the right-hand side is bounded and satisfies a Lipschitz condition, at least for finite x, ẋ and say all t ≥ 0. The parameter k may be considered as a measure of the ‘smallness’ of the upper bound, and of the Lipschitz constant, of the right-hand side, and need not have any intrinsic physical significance.

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 1950

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References

REFERENCES

(1)Kryloff, N. and Bogoljuboff, N. Introduction to non-linear mechanics, trans, by Lefschetz, S.. Annals of Mathematics Studies, no. 11 (Princeton, 1943), p. 24.Google Scholar
(2)Kryloff, N. and Bogoljuboff, N. Loc. cit. p. 93.Google Scholar