On the asymptotic and oscillatory behavior of solutions of third-order neutral dynamic equations on time scales

被引:0
作者
Ercan Tunç
Orhan Özdemir
机构
[1] Gaziosmanpasa University,Department of Mathematics, Faculty of Arts and Sciences
来源
Advances in Difference Equations | / 2017卷
关键词
third-order; neutral dynamic equations; oscillation; asymptotic behavior; time scales; 34K11; 34N05; 39A10;
D O I
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中图分类号
学科分类号
摘要
The oscillatory and asymptotic behavior results for a class of third-order nonlinear neutral dynamic equations on time scales are presented. The results obtained can be extended to more general third-order neutral dynamic equations of the type considered here. Examples are provided to illustrate the applicability of the results.
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  • [1] Agarwal RP(2003)The oscillation of certain higher-order functional differential equations Math. Comput. Model. 37 705-728
  • [2] Grace SR(2012)Oscillation and asymptotic behavior of third-order nonlinear retarded dynamic equations Appl. Math. Comput. 219 3600-3609
  • [3] O’Regan D(2014)A Philos-type theorem for third-order nonlinear retarded dynamic equations Appl. Math. Comput. 249 527-531
  • [4] Agarwal RP(2013)Hille and Nehari type criteria for third-order delay dynamic equations J. Differ. Equ. Appl. 19 1563-1579
  • [5] Bohner M(2010)Oscillation of third-order neutral differential equations Math. Comput. Model. 52 215-226
  • [6] Tang S(2008)Asymptotic behavior and oscillation of solutions of third-order nonlinear neutral delay dynamic equations on time scales Can. Appl. Math. Q. 16 19-43
  • [7] Li T(2010)Oscillation of third order nonlinear functional dynamic equations on time scales Differ. Equ. Dyn. Syst. 18 199-227
  • [8] Zhang C(2012)On the oscillation of third order neutral delay dynamic equations on time scales Comput. Math. Appl. 63 775-782
  • [9] Agarwal RP(2016)Oscillatory behavior of a third-order neutral dynamic equation with distributed delays Electron. J. Qual. Theory Differ. Equ. 2016 49-72
  • [10] Bohner M(2013)Oscillation theory of third-order nonlinear functional differential equations Hiroshima Math. J. 43 1573-1586
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