Characterization of the (fractional) Malliavin-Watanabe-Sobolev spaces Dα,2 via the Bargmann-Segal norm

Abstract

Motivated by an open question going back to P.Malliavin and P.-A.Meyer (and closely related to the foundational work of S.Watanabe) on whether Malliavin-Watanabe-Sobolev regularity admits a characterization in terms of a holomorphic Laplace image similar as for Hida distributions, we establish a characterization of the spaces Dα,2 for all α∈R via the Bargmann-Segal norm of the S-transform. More precisely, we express Dα,2-regularity, α > 0, of F∈ L2(μ), as well as dual regularity of distributions, in terms of integrability, differentiability and growth properties of the function \[ (0,1) λ ∫S'C |SF(λ u)|2\,d(u) \] involving integer-order derivatives in λ for α∈N and Riemann-Liouville fractional derivatives/integrals for non-integer α. Here is the Gaussian Bargmann-Segal measure. This yields practical criteria for both positive and negative (including fractional) orders of Malliavin regularity and thereby bridges Malliavin calculus and Bargmann-Segal techniques from white noise analysis. Applications are worked out for Donsker's delta, self-intersection local times of Gaussian processes, and Gauss kernels.

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