On the existence of periodic solutions of a certain third-order differential equation

J. O. C. Ezeilo

doi:10.1017/S0305004100034678

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In this paper we shall be concerned with the differential equation

in which a and b are constants, p(t) is a continuous periodic function of t with a least period ω, and dots indicate differentiation with respect to t. The function h(x) is assumed continuous for all x considered, so that solutions of (1) exist satisfying any assigned initial conditions. In an earlier paper (2) explicit hypotheses on (1) were established, in the two distinct cases:

under which every solution x(t) of (1) satisfies

where t0 depends on the particular x chosen, and D is a constant depending only on a, b, h and p. These hypotheses are, in the case (2),

or, in the case (3),

In what follows here we shall refer to (2) and (H1) collectively as the (boundedness) hypotheses (BH1), and to (3) and (H2) as the hypotheses (BH2). Our object is to examine whether periodic solutions of (1) exist under the hypotheses (BH1), (BH2).

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Crossref Citations

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Eze, Everestus Obinwanne Obasi, Uchenna Emmanuel Ezugorie, Godwin and Hannah, Enyiduru Ekwomchi 2023. Existence, uniqueness, boundedness and stability of periodic solutions of a certain second-order nonlinear differential equation with damping and resonance effects. Biometrical Letters, Vol. 60, Issue. 2, p. 109.

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On the existence of periodic solutions of a certain third-order differential equation

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