Oscillation criteria for forced second order differential equations with mixed nonlinearities

Some new criteria for the oscillation of certain difference equations with mixed nonlinearities are established. The main tool in the proofs is an inequality due to Hardy, Littlewood, and Pólya.

By using the Riccati technique and the variational principle, new oscillation criteria are given for second-order quasi-linear differential equations with an oscillatory forcing term, which improve and generalize some new results from the literature. An (α + 1)-degree functional is involved in the o

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

In this paper, we are concerned with the oscillations in a class of forced second-order differential equations with nonlinear damping terms. By using an inequality due to Hardy et al., several new interval oscillation criteria for the equations are established. These criteria are different from most