Note on an eigenvalue problem with applications to a Minkowski type regularity problem in Rn

Abstract

We consider existence and uniqueness of homogeneous solutions u > 0 to certain PDE of p-Laplace type, p fixed, n - 1 <p< ∞, n ≥ 2, when u is a solution in K(α)⊂Rn where \[ K (α) := \ x = (x1, …, xn ): x1 > α \, | x| \ for fixed\, \, α ∈ (0, π ], \] with continuous boundary value zero on ∂ K ( α ) \0\. In our main result we show that if u has continuous boundary value 0 on ∂ K ( π ) then u is homogeneous of degree 1 - (n-1)/p when p > n - 1. Applications of this result are given to a Minkowski type regularity problem in Rn when n=2,3.