Existence results of sign-changing solutions for singular one-dimensional -Laplacian problems

This paper concerns the positive solutions of boundary value problems for the one-dimensional singular p-Laplacian. By the classical method of elliptic regularization, we obtain some existence results which generalize some results of [W. Zhou, X. Wei, Positive solutions to BVPs for a singular differ

We consider the boundary value problem involving the one-dimensional p-Laplacian where p > 1. We establish sharp conditions for the existence of solutions with prescribed numbers of zeros in terms of the ratio f (s)/s p-1 at infinity and zero. Our argument is based on the shooting method together w

A p-Laplacian system with Dirichlet boundary conditions is investigated. By analysis of the relationship between the Nehari manifold and fibering maps, we will show how the Nehari manifold changes as λ, µ varies and try to establish the existence of multiple positive solutions.