Malliavin smoothness on the Lévy space with Hölder continuous or $BV$ functionals

Published 11 Jun 2018 in math.PR | (1806.04178v2)

Abstract: We consider Malliavin smoothness of random variables $f(X_1)$, where $X$ is a pure jump L\'evy process and $f$ is either bounded and H\"older continuous or of bounded variation. We show that Malliavin differentiability and fractional differentiability of $f(X_1)$ depend both on the regularity of $f$ and the Blumenthal-Getoor index of the L\'evy measure.

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Eija Laukkarinen

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