Multiplicity Results for the 1-Dimensional Generalized p-Laplacian

We consider the p-Laplacian problem , where p u = div ∇u p-2 ∇u , λ is a constant in a certain range, and a ∈ L N/p ∩ L ∞ is nonnegative a ≡ 0. Using the principle of symmetric criticality, existence and multiplicity are proved under suitable conditions on a and f .

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

## Abstract We consider a class of elliptic inclusions under Dirichlet boundary conditions involving multifunctions of Clarke's generalized gradient. Under conditions given in terms of the first eigenvalue as well as the Fučik spectrum of the __p__ ‐Laplacian we prove the existence of a positive, a