Existence results for perturbations of the p-Laplacian

Consider the radially symmetric p-Laplacian for p 2 under zero Dirichlet boundary conditions. The main result of the present paper is that under appropriate conditions a solution of a perturbed (radially symmetric) p-Laplacian can be compared with the solution of the unperturbed one. As a consequenc

In this paper we study the existence of nontrivial solutions for the problem < < py 2 N ⌬ u s u u in a bounded smooth domain ⍀ ; ‫ޒ‬ , with a nonlinear boundary p < < py 2 Ž . condition given by ٌu Ѩ urѨ s f u on the boundary of the domain. The proofs are based on variational and topological argumen

In this paper, using Mountain Pass Lemma and Linking Argument, we prove the existence of nontrivial weak solutions for the Dirichlet problem of the superlinear p-Laplacian equation with indeÿnite weights in the case where the eigenvalue parameter ∈ (0; 2), 2 is the second positive eigenvalue of the