Local bounds for nonlinear higher-order vector fields for the p-Laplace equation

Abstract

We study higher regularity for weak solutions of the p-Laplace equation -p u = f in a domain ⊂ Rn for p sufficiently close to 2. For m 3, assuming that f satisfies suitable Sobolev and H\"older regularity conditions, we prove that the nonlinear quantity |∇ u|m-2∇ u belongs to Wm-1,qloc(), and that |∇ u|m-2 D2u belongs to Wm-2,qloc(), for any q 2. Furthermore, we obtain uniform L∞ bounds for the weighted (m-1)-th derivatives of |∇ u|m-2∇ u and the weighted (m-2)-th derivatives of |∇ u|m-2 D2u, providing quantitative control even near critical points of ∇ u.