Inhomogeneous Dirichlet problems involving the infinity-Laplacian

Abstract

Our purpose in this paper is to provide a self contained account of the inhomogeneous Dirichlet problem ∞ u=f(x,u) where u takes a prescribed continuous data on the boundary of bounded domains. We employ a combination of Perron's method and a priori estimates to give general sufficient conditions on the right hand side f that would ensure existence of viscosity solutions to the Dirichlet problem. Examples show that these sufficient conditions may not be relaxed. We also identify a class of inhomogeneous terms for which the corresponding Dirichlet problem has no solution in any domain with large in-radius. Several results, which are of independent interest, are developed to build towards the main results. The existence theorems provide substantial improvement of previous results, including our earlier results BMO on this topic.