Note on an eigenvalue problem with applications to a Minkowski type regularity problem in $\mathbb{R}$^n (1906.01576v2)

Abstract: We consider existence and uniqueness of homogeneous solutions $ u > 0 $ to certain PDE of $p$-Laplace type, $ p $ fixed, $ n - 1 <p< \infty, n \geq 2, $ when $ u $ is a solution in $K(\alpha)\subset\mathbb{R}^n$ where \[ K (\alpha) := \{ x = (x_1, \dots, x_n ): x_1 > \cos \alpha \, | x| } \quad \mbox{for fixed}\, \, \alpha \in (0, \pi ], ] with continuous boundary value zero on $ \partial K ( \alpha ) \setminus {0}$. In our main result we show that if $ u $ has continuous boundary value $0$ on $ \partial K ( \pi )$ 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 $ \mathbb{R}^{n}$ when $n=2,3$.