English

The Cauchy problem and the martingale problem for integro-differential operators with non-smooth kernels

Probability 2007-05-23 v1 Analysis of PDEs

Abstract

We consider the linear integro-differential operator LL defined by Lu(x)=\Rn(u(x+y)u(x)1[1,2](α)1{y2}(y)yu(x))k(x,y)\sdy. Lu(x) =\int_\Rn (u(x+y) - u(x) - 1_{[1,2]}(\alpha) 1_{\{|y|\leq 2\}}(y)y \cdot \nabla u(x)) k(x,y) \sd y . Here the kernel k(x,y)k(x,y) behaves like ydα|y|^{-d-\alpha}, α(0,2)\alpha \in (0,2), for small yy and is H\"older-continuous in the first variable, precise definitions are given below. The aim of this work is twofold. On one hand, we study the unique solvability of the Cauchy problem corresponding to LL. On the other hand, we study the martingale problem for LL. The analytic results obtained for the deterministic parabolic equation guarantee that the martingale problem is well-posed. Our strategy follows the classical path of Stroock-Varadhan. The assumptions allow for cases that have not been dealt with so far.

Keywords

Cite

@article{arxiv.math/0610445,
  title  = {The Cauchy problem and the martingale problem for integro-differential operators with non-smooth kernels},
  author = {H. Abels M. Kassmann},
  journal= {arXiv preprint arXiv:math/0610445},
  year   = {2007}
}