Sharp regularity estimates for second order fully nonlinear parabolic equations

Abstract

We prove sharp regularity estimates for viscosity solutions of fully nonlinear parabolic equations of the form equationMeqEq ut- F(D2u, Du, X, t) = f(X,t) in Q1, equation where F is elliptic with respect to the Hessian argument and f ∈ Lp,q(Q1). The quantity (n, p, q):=np+2q determines to which regularity regime a solution of Meq belongs. We prove that when 1< (n,p,q) < 2-εF, solutions are parabolic-H\"older continuous for a sharp, quantitative exponent 0< α(n,p,q) < 1. Precisely at the critical borderline case, (n,p,q)= 1, we obtain sharp Log-Lipschitz regularity estimates. When 0< (n,p,q) <1, solutions are locally of class C1+ σ, 1+ σ2 and in the limiting case (n,p,q) = 0, we show C1, Log-Lip regularity estimates provided F has "better" a priori estimates.