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On some oscillation criteria for a class of neutral type functional differential equations

Published online by Cambridge University Press:  17 February 2009

A.I. Zahariev  and
D. D. Bainov
A.I. Zahariev
Affiliation:
University of Plovdiv, “P. Hilendarski”, 7000 Plovdiv, Bulgaria.
D. D. Bainov
Affiliation:
University of Plovdiv, “P. Hilendarski”, 7000 Plovdiv, Bulgaria.
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Abstract

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The present paper proves criteria for oscillation of the soultions of functional differential equations of the type

where λ, τ > 0.

Type
Research Article
Information
The ANZIAM Journal , Volume 28 , Issue 2 , October 1986 , pp. 229 - 239
Copyright
Copyright © Australian Mathematical Society 1986

References

Referenes

[1]Kiguradze, I.T., “On the oscillaiton of the solutions of equations u(m) + a(t) sing u|u|n = 0Math. Studies 65 (1964), 172187 (in Russian).Google Scholar
[2]Kiguradze, I.T., “Some singular boundary-value problems for ordinary differential equations” Izdat. Tbilisk. Univ., Tbilisi (1975), 325 (in Russian).Google Scholar
[3]Kolesov, Ju. S. and Kubyskin, E.P., “A two-frequency approach to the problem ‘predatorprey’”, in Investigations on stability and theory of oscillations (Jaroslavl, 1979), 111121 (in Russian).Google Scholar
[4]Kolesov, Ju. S. and Svitra, D., “A study of the two-frequency oscillations in the problem ‘predator-prey’”, in Differential euqtions and their applications No.24, (Vil'njus, Mokslas, 1979), 4966.Google Scholar
[5]Nicolis, G. and Portnow, J., “Chemical oscillationsChem. Rev. 73 (1974), 365384.CrossRefGoogle Scholar
[6]Noyes, R.M. and Field, R.J., “Osciallatory chemical reactionsAnn. Rev. Phys. Chem. 25 (1974), 95119.CrossRefGoogle Scholar
[7]Pavlidis, T., Biological oscillaitons; their mathematical analysis (Academic Press, New York, 1974).Google Scholar
[8]Shevelo, V.N. and Vareh, N.V., “On some oscillatory theorems for higher order differential equationsMath. Physics. No. 13 (1973), 183189 (in Russian).Google Scholar
[9]Zahariev, A.I. and Bainov, D.D., “Oscillation properties of the solutions of a class of neutral type functional-differential equationsBull. Austral. Math. Soc. 22 (1980), 365372.CrossRefGoogle Scholar
[10]Zaharov, A.A., Kolesov, Ju. S., Spoloinov, A.N. and Fedotov, N.B., “Theoretical explanations of the 10-year cycle of oscillations of mammal's populations in Canada and Jakutija” in Investigations on stablility and theory of oscillations, (Jaroslav', 1980), 82131 (in Russian).Google Scholar