Boundary regularity for fully nonlinear integro-differential equations

Abstract

We study fine boundary regularity properties of solutions to fully nonlinear elliptic integro-differential equations of order 2s, with s∈(0,1). We consider the class of nonlocal operators L*⊂ L0, which consists of infinitesimal generators of stable L\'evy processes belonging to the class L0 of Caffarelli-Silvestre. For fully nonlinear operators I elliptic with respect to L*, we prove that solutions to I u=f in , u=0 in Rn, satisfy u/ds∈ Cs+γ(), where d is the distance to ∂ and f∈ Cγ. We expect the class L* to be the largest scale invariant subclass of L0 for which this result is true. In this direction, we show that the class L0 is too large for all solutions to behave like ds. The constants in all the estimates in this paper remain bounded as the order of the equation approaches 2. Thus, in the limit s1 we recover the celebrated boundary regularity result due to Krylov for fully nonlinear elliptic equations.