Discontinuous elliptic problems involving the p(x)-Laplacian

## Abstract In this paper, we review the development of local discontinuous Galerkin methods for elliptic problems. We explain the derivation of these methods and present the corresponding error estimates; we also mention how to couple them with standard conforming finite element methods. Numerical

## Abstract Two results on the existence and uniqueness for the __p__(__x__)‐Laplacian‐Dirichlet problem −__div__(|∇__u__|^__p__(__x__) − 2^∇__u__) = __f__(__x__, __u__) in Ω, __u__ = 0 on ∂Ω, are obtained. The first one deals with the case that __f__(__x__, __u__) is nonincreasing in __u__. The se

We consider resonance problems at an arbitrary eigenvalue of the p-Laplacian, and prove the existence of weak solutions assuming a standard Landesman Lazer condition. We use variational arguments to characterize certain eigenvalues and then to establish the solvability of the given boundary value pr

We consider a boundary problem for an elliptic system of differential equations in a bounded region Ω ⊂ R n and where the spectral parameter is multiplied by a discontinuous weight function ω(x) = diag(ω1(x), . . . , ωN (x)). The problem is considered under limited smoothness assumptions and under a