Solutions for Neumann boundary value problems involving (p1(x), p2(x))-Laplace operators

Abstract

In this paper we study the nonlinear Neumann boundary value problem of the following equations -div(|∇ u|p1(x)-2∇ u)-div(|∇ u|p2(x)-2∇ u)+|u|p1(x)-2u+|u|p2(x)-2u=λ f(x,u) in a bounded smooth domain ⊂RN with Neumann boundary condition given by |∇ u|p1(x)-2∂ u∂+|∇ u|p2(x)-2∂ u∂=μ g(x,u) on ∂. Under appropriate conditions on the source and boundary nonlinearities, we obtain a number of results on existence and multiplicity of solutions by variational methods in the framework of variable exponent Lebesgue and Sobolev spaces.