Abstract
Consider on a manifold the solution $X$ of a stochastic differential equation driven by a Lévy process without Brownian part. Sufficient conditions for the smoothness of the law of $X_{t}$ are given, with particular emphasis on noncompact manifolds. The result is deduced from the case of affine spaces by means of a localisation technique. The particular cases of Lie groups and homogeneous spaces are discussed.
Citation
Jean Picard. Catherine Savona. "Smoothness of the law of manifold-valued Markov processes with jumps." Bernoulli 19 (5A) 1880 - 1919, November 2013. https://doi.org/10.3150/12-BEJ434
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