Integral Oscillation Criteria for Second-Order Linear Neutral Delay Dynamic Equations on Time Scales


  •  Hassan Agwo    
  •  Manahel Al-Sosui    

Abstract

In this paper we present several sufficient conditions for
oscillation of the second-order linear neutral delay dynamic
equation
\begin{eqnarray}
(y(t)+p(t)y(t-\tau))^{\Delta\Delta}+q(t)y(t-\delta)=0 \nonumber
\end{eqnarray}
on a time scale $\mathbb{T}$. Here $p(t) , q(t)$ are
\textit{rd}-continuous functions defined on on a time scale
$\mathbb{T}$. Our results as a special case when $\mathbb{T=R}$ and
$\mathbb{T=N}$ improve some well-known oscillation results for
second-order neutral delay differential and difference equations.


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