Heat kernel estimates for non-symmetric stable-like processes

Abstract: Let $d\ge1$ and $0<\alpha<2$. Consider the integro-differential operator [ \mathcal{L}f(x) =\int_{\mathbb{R}^{d}\backslash{0}}\left[f(x+h)-f(x)-\chi_{\alpha}(h)\nabla f(x)\cdot h\right]\frac{n(x,h)}{|h|^{d+\alpha}}\mathrm{d}h+\mathbf{1}_{\alpha>1}b(x)\cdot\nabla f(x), ] where $\chi_{\alpha}(h):=\mathbf{1}{\alpha>1}+\mathbf{1}{\alpha=1}\mathbf{1}{{|h|\le1}}$, $b:\mathbb{R}^{d}\to\mathbb{R}^{d}$ is bounded measurable, and $n:\mathbb{R}^{d}\times\mathbb{R}^{d}\to\mathbb{R}$ is measurable and bounded above and below respectively by two positive constants. Further, we assume that $n(x,h)$ is H\"older continuous in $x$, uniformly with respect to $h\in\mathbb{R}^{d}$. In the case $\alpha=1,$ we assume additionally $\int{\partial B_{r}}n(x,h)h\mathrm{d}S_{r}(h)=0$, $\forall r \in (0,\infty)$, where $\mathrm{d}S_{r}$ is the surface measure on $\partial B_{r}$, the boundary of the ball with radius $r$ and center $0$. In this paper, we establish two-sided estimates for the heat kernel of the Markov process associated with the operator $\mathcal{L}$. This extends a recent result of Z.-Q. Chen and X. Zhang.