Existence of densities for stochastic differential equations driven by L\'evy processes with anisotropic jumps

Abstract

We study existence of densities for solutions to stochastic differential equations with H\"older continuous coefficients and driven by a d-dimensional L\'evy process Z=(Zt)t≥ 0, where, for t>0, the density function ft of Zt exists and satisfies, for some (αi)i=1,…,d⊂(0,2) and C>0, align* t 0t1/αi∫ Rd|ft(z+eih)-ft(z)|dz≤ C|h|,\ \ h∈ R,\ \ i=1,…,d. align* Here e1,…,ed denote the canonical basis vectors in Rd. The latter condition covers anisotropic (α1,…,αd)-stable laws but also particular cases of subordinate Brownian motion. To prove our result we use some ideas taken from DF13.