Oscillation criteria for second-order delay differential equations

In this paper, several new oscillation criteria for the second-order nonlinear neutral delay differential equation are established. These oscillation criteria extend and improve some known results. An interesting example illustrating the importance of our results is also provided.

In this paper, we present new interval oscillation criteria related to integral averaging technique for second order partial differential equations with delays that are different from most known ones in the sense that they are based on the information only on a sequence of subintervals of [t 0 , ∞),

Some new sufficient conditions for the oscillation criteria are given for the forced second-order nonlinear differential equations with delayed argument in the form, ## • " (t) + q (t) f (z (~-(t))) = e (t) The results are based on the information only on a sequence of subintervals of [to, oc) ra

## Abstract Sufficient conditions are established for oscillation of second order super half linear equations containing both delay and advanced arguments of the form equation image where __ϕ~δ~__ (__u__) = |__u__ |^__δ__ –1^__u__; __α__ > 0, __β__ ≥ __α__, and __γ__ ≥ __α__ are real numbers; __k