Fractional Sobolev regularity for fully nonlinear elliptic equations

Abstract

We prove higher-order fractional Sobolev regularity for fully nonlinear, uniformly elliptic equations in the presence of unbounded source terms. More precisely, we show the existence of a universal number 0< <1, depending only on ellipticity constants and dimension, such that if u is a viscosity solution of F(D2u) = f(x) ∈ Lp, then u∈ W1+,p, with appropriate estimates. Our strategy suggests a sort of fractional feature of fully nonlinear diffusion processes, as what we actually show is that F(D2u) ∈ Lp (-)θ u ∈ Lp, for a universal constant 12 < θ <1. We believe our techniques are flexible and can be adapted to various models and contexts.