Optimal regularity of stable solutions to nonlinear equations involving the p-Laplacian

Abstract

We consider the equation -p u=f(u) in a smooth bounded domain of Rn , where p is the p-Laplace operator. Explicit examples of unbounded stable energy solutions are known if n≥ p+4p/(p-1). Instead, when n<p+4p/(p-1), stable solutions have been proved to be bounded only in the radial case or under strong assumptions on f. In this article we solve a long-standing open problem: we prove an interior Cα bound for stable solutions which holds for every nonnegative f∈ C1 whenever p≥2 and the optimal condition n<p+4p/(p-1) holds. When p∈(1,2), we obtain the same result under the non-sharp assumption n<5p. These interior estimates lead to the boundedness of stable and extremal solutions to the associated Dirichlet problem when the domain is strictly convex. Our work extends to the p-Laplacian some of the recent results of Figalli, Ros-Oton, Serra, and the first author for the classical Laplacian, which have established the regularity of stable solutions when p=2 in the optimal range n<10.