Well-posedness of the martingale problem for non-local perturbations of L\'evy-type generators

Abstract

Let L be a L\'evy-type generator whose L\'evy measure is controlled from below by that of a non-degenerate α-stable (0<α<2) process. In this paper, we study the martingale problem for the operator Lt=L+Kt, with Kt being a time-dependent non-local operator defined by \[ Ktf(x):=∫Rd\0\[f(x+y)-f(x)-1α>11\|y|1\y·∇ f(x)]M(t,x,dy), \] where M(t,x,·) is a L\'evy measure on Rd\0\ for each (t,x)∈ R+ × Rd. We show that if \[ t≥0,x∈Rd∫Rd\0\1|y|βM(t,x,dy)<∞ \] for some 0<β<α, then the martingale problem for Lt is well-posed.