An Application of the Theory of Viscosity Solutions to Higher Order Differential Equations

Abstract

We directly apply the theory of viscosity solutions to partial differential equations of order greater than two. We prove that there exists a solution in C2,α(BR) C(BR) for the inhomogeneous ∞-Bilaplacian equation on a ball BR⊂ Rn: ∞2 u:=( u)3 |D( u)|2 =f(x) with Navier Boundary conditions (u=g∈ C(∂ BR), u =0 on ∂ BR). We also prove that there exists a solution in C1,α(Rn) for all α>0 to the eigenvalue problem on Rn: ∞2 u =-λ u+f(x) whenever n≥ 3, λ<0, and f(x) is continuous, bounded, and supported on an annulus.