The martingale problem for geometric stable-like processes

Abstract

We prove that the martingale problem is well posed for pure-jump L\'evy-type operators of the form ( Lf)(x) = ∫ Rd \0\ (f(x+h)-f(x) - (∇ f(x) · h)1\|h\| < 1)K(x,h) dh, where K(x,·) is a jump kernel of the form K(x,h) l(\|h\|)\|h\|d for each x ∈ Rd,\|h\|<1, and l is a positive function that is slowly varying at 0, under suitable assumptions on K. This includes jump kernels such as those of α-geometric stable processes, α ∈ (0,2].

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