Failure of Fatou type theorems for solutions to PDE of p-Laplace type in domains with flat boundaries

Abstract

Let Rn denote Euclidean n space and given k a positive integer let k ⊂ Rn , 1 ≤ k < n - 1, n ≥ 3, be a k-dimensional plane with 0 ∈ k. If n-k < p <∞, we first study the Martin boundary problem for solutions to the p-Laplace equation (called p-harmonic functions) in Rn k relative to \0\. We then use the results from our study to extend the work of Wolff on the failure of Fatou type theorems for p-harmonic functions in R2+ to p-harmonic functions in Rn k when n-k < p <∞. Finally, we discuss generalizations of our work to solutions of p -Laplace type PDE (called A-harmonic functions).