4.3 Article

Kernel representation formula: From complex to real Wiener-Itô integrals and vice versa

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ELSEVIER
DOI: 10.1016/j.spa.2023.104241

Keywords

Complex Wiener-Ito integral; Two-dimensional real Wiener-Ito integral; Generalized Stroock's formula; Stochastic heat equation with dispersion

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This paper characterizes the relation between the real and complex Wiener-Ito integrals, providing explicit expressions for the kernels of their real and imaginary parts, and obtaining a representation formula for a two-dimensional real Wiener-Ito integral through a finite sum of complex Wiener-Ito integrals. The main tools used are a recursion technique and Malliavin derivative operators. As an application, the regularity of the stationary solution of the stochastic heat equation with dispersion is investigated.
We characterize the relation between the real and complex Wiener-Ito integrals. Given a complex multiple Wiener-Ito integral, we get explicit expressions for the kernels of its real and imaginary parts. Conversely, considering a two-dimensional real Wiener-Ito integral, we obtain the representation formula by a finite sum of complex Wiener-Ito integrals. The main tools are a recursion technique and Malliavin derivative operators. As an application to stochastic processes, we investigate the regularity of the stationary solution of the stochastic heat equation with dispersion.(c) 2023 Elsevier B.V. All rights reserved.

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