Non-symmetric stable operators: regularity theory and integration by parts

Abstract

We study solutions to Lu=f in ⊂ Rn, being L the generator of any, possibly non-symmetric, stable L\'evy process. On the one hand, we study the regularity of solutions to Lu=f in , u=0 in c, in C1,α domains~. We show that solutions u satisfy u/dγ∈ C(), where d is the distance to ∂, and γ=γ(L,) is an explicit exponent that depends on the Fourier symbol of operator L and on the unit normal to the boundary ∂. On the other hand, we establish new integration by parts identities in half spaces for such operators. These new identities extend previous ones for the fractional Laplacian, but the non-symmetric setting presents some new interesting features. Finally, we generalize the integration by parts identities in half spaces to the case of bounded C1,α domains. We do it via a new efficient approximation argument, which exploits the H\"older regularity of u/dγ. This new approximation argument is interesting, we believe, even in the case of the fractional Laplacian.