Denseness of certain smooth L\'evy functionals in 1,2
Abstract
The Malliavin derivative for a L\'evy process (Xt) can be defined on the space 1,2 using a chaos expansion or in the case of a pure jump process also via an increment quotient operator sole-utzet-vives. In this paper we define the Malliavin derivative operator on the class S of smooth random variables f(Xt1, ..., Xtn), where f is a smooth function with compact support. We show that the closure of L2() ⊃eq S L2( ) yields to the space 1,2. As an application we conclude that Lipschitz functions map from 1,2 into 1,2.
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