A remark on C1,α-regularity for differential inequalities in viscosity sense

Abstract

We prove interior C1,α-regularity for solutions \[ - ≤ F(D2 u) ≤ \] where is a constant and F is fully nonlinear, 1-homogeneous, uniformly elliptic. The proof is based on a reduction to the homogeneous equation F(D2u) = 0 by a blow-up argument -- i.e. just like what is done in the case of viscosity solutions F(D2 u) = f for f ∈ L∞. However it was not clear to us that the above inequality implies F(D2 u) = f for some bounded f (as would be the case for linear equations in distributional sense by approximation). Nor were we able to find the literature on C1,α-regularity for viscosity inequalities. So we thought this result might be worth recording.