Nonexistence of Positive Solutions of a Class of Nonlinear Delay Partial Difference Equations

We develop criteria for the nonexistence of eventually positive negative and Ž . nondecreasing nonincreasing solutions of the partial difference equation ٌ ٌ y m, n q P m, n, y m q k, n q l s Q m, n, y m q k, n q l

Necessary and sufficient conditions are obtained for existence of positive solutions of a nonlinear difference equation. Relations between this equation and an advanced type nonlinear difference equation are also discussed.

In this paper, two interesting oscillation criteria are obtained for all solutions of Ž . the nonlinear delay difference equations of the form y y y q p f y s 0, n s 0, 1, 2, . . . . Some applications are given to demonstrate the advantage of results obtained in this paper. Our results also improve

We consider Dirichlet boundary value problems for a class of nonlinear ordinary differential equations motivated by the study of radial solutions of equations which are perturbations of the p -Laplacian.

## Abstract In this study, we consider a class of wave equations with strong damping and source terms associated with initial and Dirichlet boundary conditions. We establish a blow up result for certain solutions with nonpositive initial energy as well as positive initial energy. This further impro