Oscillation criteria for third-order semi-canonical differential equations with unbounded neutral coefficients
Abstract
In this paper, we investigate the oscillatory behavior of solutions to a class of third-order differential equations of the form
\[\mathcal{L}z(t)+f(t)y^\beta(\sigma(t))=0\]
where \(\mathcal{L}z(t)=(p(t)(q(t)z^{\prime}(t))^{\prime})^{\prime}\) is a semi-canonical operator and \(z(t)=y(t)+g(t)y(\tau(t))\). The main idea is to convert the semi-canonical operator into canonical form and then obtain some new sufficient conditions for the oscillation of all solutions. The obtained results essentially improve and complement to the known results. Examples are provided
to illustrate the main results.
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Agarwal, R.P., Grace, S.R., O'Regan, D., Oscillation Theory for Di erence and Functional Di erential Equations, Kluwer Academic, Derdrecht, 2000.
Baculkov a, B., Dzurina, J., Oscillation of third-order neutral differential equations, Math. Comput. Model., 52(2010), 215-226.
Baculkov a, B., Rani, B., Selvarangam, S., Thandapani, E., Properties of Kneser's solutions for half-linear third-order neutral differential equations, Acta Math. Hungar., 152(2017), 525-533.
Chatzarakis, G.E., D zurina, J., Jadlovska, I., Oscillatory properties of third-order neutral delay differential equations with noncanonical operators, Mathematics, 7(2019), no. 12, 1-12.
Chatzarakis, G.E., Grace, S.R., Jadlovsk a, I., Li, T., Tun c, E., Oscillation criteria for third-order Emden-Fowler differential equations with unbounded neutral coeffcients, Complexity, 2019(2019), Article ID 5691758, 1-7.
Chatzarakis, G.E., Srinivasan, R., Thandapani, E., Oscillation results for third-order quasi-linear Emden-Fowler differential equations with unbounded neutral coeffcients, Tatra Mt. Math. Publ., 80(2021), 1-14.
Do sl a, Z., Li ska, P., Comparison theorems for third-order neutral differential equations, Electron. J. Differential Equations, 2016(2016), no. 38, 1-13.
D zurina, J., Grace, S.R., Jadlovsk a, I., On nonexistence of Kneser solutions of third-order neutral delay di erential equations, Appl. Math. Lett., 88(2019), 193-200.
Graef, J.R., Tun c, E., Grace, S.R., Oscillatory and asymptotic behavior of a third-order nonlinear neutral differential equation, Opuscula Math., 37(2017), 839-852.
Jiang, Y., Jiang, C., Li, T., Oscillatory behavior of third-order nonlinear neutral delay differential equations, Adv. Di er. Equ., 2016(2016), Article ID 171, 1-12.
Koplatadze, R.G., Chanturiya, T.A., Oscillating and monotone solutions of first-order differential equations with deviating argument, (Russian), Di er. Uravn., 18(1982), 1463-
Li, T., Zhang, C., Properties of third-order half-linear dynamic equations with an unbounded neutral coeffent, Adv. Di er. Equ., 2013(2013), Article ID 333, 1-8.
Mihalkova, B., Kostikova, E., Boundedness and oscillation of third-order neutral differential equations, Tatra Mt. Math. Publ., 43(2009), 137-144.
Philos, Ch.G, On the existence of nonoscillatory solutions tending to zero at 1 for differential equations with positive delays, Arch. Math. (Basel), 36(1981), 168-178.
Sakamoto, T., Tanaka, S., Eventually positive solutions of first order nonlinear differential equations with a deviating argument, Acta Math. Hungar., 127(2010), 17-33.
Sun, Y., Zhao, Y., Oscillatory behavior of third-order neutral delay differential equations with distributed deviating arguments, J. Inequal. Appl., 2019(2019), Article ID 207, 1-16.
Thandapani, E., Li, T., On the oscillation of third-order quasi-linear neutral functional differential equations, Arch. Math. (Brno), 47(2011), 181-199.
Trench,W.F., Canonical forms and principal systems for general disconjugate equations, Trans. Amer. Math. Soc., 184(1974), 319-327.
Tun c, E., Oscillatory and asymptotic behavior of third-order neutral differential equations with distributed deviating arguments, Electron. J. Di erential Equations, 2017(2017), no. 16, 1-12.
Tun c, E., Sahin, S., Graef, J.R., Pinelas, S., New oscillation criteria for third-order di erential equations with bounded and unbounded neutral coe cients, Electron J. Qual. Theory Di er. Equ., 2021(2021), no. 46, 1-13.
DOI: http://dx.doi.org/10.24193/subbmath.2024.1.08
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