Lq estimates for nonlocal p-Laplacian type equations with BMO kernel coefficients in divergence form

Abstract

We study s-fractional p-Laplacian type equations with discontinuous kernel coefficients in divergence form to establish Ws+σ,q estimates for any choice of pairs ( σ,q) with q∈(p,∞) and σ∈(0,\sp-1,1-s\) under the assumption that the associated kernel coefficients have small BMO seminorms near the diagonal. As a consequence, we find in the literature an optimal fractional Sobolev regularity of such a non-homogeneous nonlocal equation when the right-hand side is presented by a suitable fractional operator. Our results are new even in the linear case.