On the existence of foliations by solutions to the exterior Dirichlet problem for the minimal surface equation

Abstract

Given an exterior domain with C2,α boundary in Rn, n≥3, we obtain a 1-parameter family uγ∈ C∞() , γ ≤π/2, of solutions of the minimal surface equation such that, if γ <π/2, uγ∈ C∞( ) C2,α( ) , uγ|∂=0 with ∂ ∇ uγ =γ and, if γ =π/2, the graph of uγ is contained in a C1,1 manifold Mγ⊂×R with ∂ Mγ=∂. Each of these functions is bounded and asymptotic to a constant \[ cγ= x →∞uγ( x) . \] The mappings γ→ uγ( x) (for fixed x∈) and γ→ cγ are strictly increasing and bounded. The graphs of these functions foliate the open subset of Rn+1 \[ \ ( x,z) ∈×R, -uπ /2( x) <z<uπ/2( x) \ . \] Moreover, if Rn satisfies the interior sphere condition of maximal radius and if ∂ is contained in a ball of minimal radius , then \[ [ 0,σn] ⊂[ 0,cπ/2] ⊂[ 0,σn] , \] where \[ σn=∫1∞dtt2( n-1) -1. \] One of the above inclusions is an equality if and only if =, is the exterior of a ball of radius and the solutions are radial.