On (p1(x), p2(x))-Laplace Equations

Abstract

In this paper, we investigate the (p1(x), p2(x))-Laplace operator, the properties of the corresponding integral functional and weak solutions to the related differential equations. We show that the integral functional admits a derivative of type (S+) which induces a homeomorphism between duality space pairs. As applications of the above results, we gave some existence results of the (p1(x), p2(x))-Laplace equation -div(|∇ u|p1(x)-2∇ u)-div(|∇ u|p2(x)-2∇ u)=f(x,u) in a bounded smooth domain ⊂RN with Dirichlet boundary condition.