An Lp-theory for a class of non-local elliptic equations related to nonsymmetric measurable kernels

Abstract

We study the integro-differential operators L with kernels K(y) = a(y) J(y), where J(y)dy is a L\'evy measure on d (i.e. ∫d(1 |y|2)J(y)dy<∞) and a(y) is an only measurable function with positive lower and upper bounds. Under few additional conditions on J(y), we prove the unique solvability of the equation Lu-λ u=f in Lp-spaces and present some Lp-estimates of the solutions.