A note on one-dimensional symmetry for Hamilton-Jacobi equations with extremal Pucci operators and application to Bernstein type estimate

Abstract

We prove a Liouville-type theorem that is one-dimensional symmetry and classification results for non-negative Lq-viscosity solutions of the equation equation* -Mλ, (D2u) |Du|p=0, x∈ R+n, equation* with boundary condition u(x,0)=M≥ 0, x∈ Rn-1, where Mλ, are the Pucci's operators with parameters λ, ∈ R+ 0<λ≤ and p>1. The results are an extension of the results by Porreta and Ver\'on in arXiv:0805.2533 for the case p∈ (1,2] and by o Filippucci, Pucci and Souplet in arXiv:1906.05161 for the case p>2, both for the Laplacian case (i.e. λ==1). As an application in the case p>2, we prove a sharp Bernstein estimation for Lq-viscosity solutions of the fully nonlinear equation equation* -Mλ, (D2u)= |Du|p+f(x), x∈ , ecuacion1 equation* with boundary condition u=0 on ∂ , where ⊂ Rn.