Huili Tang
Published 2007-12-26, updated 2008-06-22Version 2
Let $L$ be the operator defined on $C^2$ functions by $$L f(x)=\int[f(x+h)-f(x)-1_{(|h|\leq 1)}\nabla f(x)\cdot h]\frac{n(x,h)}{|h|^{d+\alpha(x)}}dh.$$ This is an operator of variable order and the corresponding process is of pure jump type. We consider the martingale problem associated with $L$. Sufficient conditions for existence and uniqueness are given. Transition density estimates for $\alpha$-stable processes are also obtained.
Uniqueness in law for stable-like processes of variable order
Well-posedness of the martingale problem for non-local perturbations of Lévy-type generators
The Cauchy problem and the martingale problem for integro-differential operators with non-smooth kernels
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