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Volume 36, Issue 3
New Oscillation Criteria for Third-Order Half-Linear Advanced Differential Equations

Jianli Yao, Xiaoping Zhang & Jiangbo Yu

Ann. Appl. Math., 36 (2020), pp. 309-330.

Published online: 2021-01

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  • Abstract

The theme of this article is to provide some sufficient conditions for the asymptotic property and oscillation of all solutions of third-order half-linear differential equations with advanced argument of the form

                     $(r_2(t)((r_1(t)(y′(t))^α)′)^β)′ + q(t)y^γ(σ(t)) = 0$,    $t ≥ t_0 > 0,$

where $∫^∞ r_1^{-\frac{1}{α}}(s)ds < ∞$ and $∫^∞r_2^{-\frac{1}{β}}(s)ds < ∞$. The criteria in this paper improve and complement some existing ones. The results are illustrated by two Euler-type differential equations.

  • Keywords

third-order differential equation, advanced argument, oscillation, asymptotic behavior, noncanonical operators.

  • AMS Subject Headings

  • Copyright

COPYRIGHT: © Global Science Press

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@Article{AAM-36-309, author = {Yao , JianliZhang , Xiaoping and Yu , Jiangbo}, title = {New Oscillation Criteria for Third-Order Half-Linear Advanced Differential Equations}, journal = {Annals of Applied Mathematics}, year = {2021}, volume = {36}, number = {3}, pages = {309--330}, abstract = {

The theme of this article is to provide some sufficient conditions for the asymptotic property and oscillation of all solutions of third-order half-linear differential equations with advanced argument of the form

                     $(r_2(t)((r_1(t)(y′(t))^α)′)^β)′ + q(t)y^γ(σ(t)) = 0$,    $t ≥ t_0 > 0,$

where $∫^∞ r_1^{-\frac{1}{α}}(s)ds < ∞$ and $∫^∞r_2^{-\frac{1}{β}}(s)ds < ∞$. The criteria in this paper improve and complement some existing ones. The results are illustrated by two Euler-type differential equations.

}, issn = {}, doi = {https://doi.org/}, url = {http://global-sci.org/intro/article_detail/aam/18595.html} }
TY - JOUR T1 - New Oscillation Criteria for Third-Order Half-Linear Advanced Differential Equations AU - Yao , Jianli AU - Zhang , Xiaoping AU - Yu , Jiangbo JO - Annals of Applied Mathematics VL - 3 SP - 309 EP - 330 PY - 2021 DA - 2021/01 SN - 36 DO - http://doi.org/ UR - https://global-sci.org/intro/article_detail/aam/18595.html KW - third-order differential equation, advanced argument, oscillation, asymptotic behavior, noncanonical operators. AB -

The theme of this article is to provide some sufficient conditions for the asymptotic property and oscillation of all solutions of third-order half-linear differential equations with advanced argument of the form

                     $(r_2(t)((r_1(t)(y′(t))^α)′)^β)′ + q(t)y^γ(σ(t)) = 0$,    $t ≥ t_0 > 0,$

where $∫^∞ r_1^{-\frac{1}{α}}(s)ds < ∞$ and $∫^∞r_2^{-\frac{1}{β}}(s)ds < ∞$. The criteria in this paper improve and complement some existing ones. The results are illustrated by two Euler-type differential equations.

Jianli Yao, Xiaoping Zhang & Jiangbo Yu. (2021). New Oscillation Criteria for Third-Order Half-Linear Advanced Differential Equations. Annals of Applied Mathematics. 36 (3). 309-330. doi:
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