New Comparison Theorems for the Even-Order Neutral Delay Differential Equation

The aim of this study was to examine the asymptotic properties and oscillation of the even-order neutral differential equations. The results obtained are based on the Riccati transformation and the theory of comparison with first- and second-order delay equations. Our results improve and complement some well-known results. We obtain Hille and Nehari type oscillation criteria to ensure the oscillation of the solutions of the equation. One example is provided to illustrate these results.

[1]  Calogero Vetro,et al.  Pairs of nontrivial smooth solutions for nonlinear Neumann problems , 2020, Appl. Math. Lett..

[2]  Clemente Cesarano,et al.  Qualitative Behavior of Solutions of Second Order Differential Equations , 2019, Symmetry.

[3]  Zeev Nehari,et al.  Oscillation criteria for second-order linear differential equations , 1957 .

[4]  B. Baculíková,et al.  On the oscillation of higher-order delay differential equations , 2012, Journal of Mathematical Sciences.

[5]  Clemente Cesarano,et al.  Oscillation of Fourth-Order Functional Differential Equations with Distributed Delay , 2019, Axioms.

[6]  M. Postolache,et al.  Improved Conditions for Oscillation of Functional Nonlinear Differential Equations , 2020, Mathematics.

[7]  S. Furuichi,et al.  New Comparison Theorems for the Nth Order Neutral Differential Equations with Delay Inequalities , 2020, Mathematics.

[8]  C. Vetro An elliptic equation on n-dimensional manifolds , 2020 .

[9]  Clemente Cesarano,et al.  Asymptotic Properties of Solutions of Fourth-Order Delay Differential Equations , 2019, Symmetry.

[10]  Osama Moaaz,et al.  Oscillation criteria for even-order neutral differential equations with distributed deviating arguments , 2019, Advances in Difference Equations.

[11]  E. Elabbasy,et al.  Oscillation of solutions to fourth-order delay differential equations with middle term , 2019, Open Journal of Mathematical Sciences.

[12]  C. Philos,et al.  On the existence of nonoscillatory solutions tending to zero at ∞ for differential equations with positive delays , 1981 .

[13]  Ravi P. Agarwal,et al.  Oscillation criteria for second-order retarded differential equations , 1997 .

[14]  Jurang Yan,et al.  Oscillation behavior of even order neutral differential equations with variable coefficients , 2006, Appl. Math. Lett..

[15]  Quanxin Zhang,et al.  Oscillation of even-order half-linear functional differential equations with damping , 2011, Comput. Math. Appl..

[16]  Osama Moaaz,et al.  A New Approach in the Study of Oscillation Criteria of Even-Order Neutral Differential Equations , 2020, Mathematics.

[17]  Osama Moaaz,et al.  New Results for Oscillatory Behavior of Fourth-Order Differential Equations , 2020, Symmetry.

[18]  Osama Moaaz,et al.  Oscillation of higher-order differential equations with distributed delay , 2019, Journal of Inequalities and Applications.

[19]  A. Zafer,et al.  Oscillation criteria for even order neutral differential equations , 1998 .

[20]  Clemente Cesarano,et al.  A Philos-Type Oscillation Criteria for Fourth-Order Neutral Differential Equations , 2020, Symmetry.

[21]  Li Gao,et al.  Oscillation criteria for even-order half-linear functional differential equations with damping , 2011, Appl. Math. Lett..

[22]  Chenghui Zhang,et al.  Oscillation of fourth-order neutral differential equations with p-Laplacian like operators , 2014 .

[23]  Osama Moaaz,et al.  Asymptotic and Oscillatory Behavior of Solutions of a Class of Higher Order Differential Equation , 2019, Symmetry.

[24]  O. Moaaz,et al.  Oscillation Theorems for Nonlinear Differential Equations of Fourth-Order , 2020, Mathematics.