New regularity estimates for fully nonlinear elliptic equations

Abstract

We establish new quantitative Hessian integrability estimates for viscosity supersolutions of fully nonlinear elliptic operators. As a corollary, we show that the optimal Hessian power integrability = (λ, , n) in the celebrated W2, -regularity estimate satisfies (1+ 23(1- λ ) )n-1 n4 · ( λ ) n-1 nλ(n-1) +λ, where n 3 is the dimension and 0< λ < are the ellipticity constants. In particular, ( λ ) n-1 (λ, , n) blows-up, as n∞; previous results yielded fast decay of such a quantity. The upper estimate improves the one obtained by Armstrong, Silvestre, and Smart in arXiv:1103.3677