Nonlinear discrete boundary value problems for the discrete -Laplacian with potential term

Multiple solutions for a discrete boundary value problem involving the p-Laplacian are established. Our approach is based on critical point theory.

We are concerned with the nonlinear discrete periodic boundary value problem where r is a positive parameter. Optimal interval will be given to the parameter r to ensure that (P) has at least one positive solution.

This paper proves the existence, multiplicity, and nonexistence of symmetric positive solutions to nonlinear boundary value problems with Laplacian operator. We improve and generalize some relative results. Our analysis mainly relies on the fixed point theorem of cone expansion and compression of no

A new concept of a pair of upper and lower solutions is introduced for a class of discrete boundary value problems without monotone nonlinearities. Some comparison results are established. An existence and enclosing theorem for the solutions is given in terms of upper and lower solutions. A new mono