Oscillation of Two-Term Differential Equations through Asymptotics

This paper discusses a class of second-order nonlinear differential equations. By using the generalized Riccati technique and the averaging technique, new oscillation criteria are obtained for all solutions of the equation to be oscillatory. Asymptotic behavior for forced equations is also discussed

## Abstract Oscillation criteria for self‐adjoint fourth‐order differential equations were established for various conditions on the coefficients __r__(__x__) > 0, __q__(__x__) and __p__(__x__). However, most of these results deal with the case when lim~__x__ → ∞~∫^__x__^~1~__q__(__s__) __ds__ < +

The oscillatory behavior of solutions of the neutral differential equations with a superlinear neutral term is studied in the case when α > 1. Two almost "sharp" oscillatory and non-oscillatory criteria are obtained.