Emilio Rossi Ferrucci, Thomas Cass
Published 2022-07-18Version 1
We compute the Wiener chaos decomposition of the signature for a class of Gaussian processes, which contains fractional Brownian motion (fBm) with Hurst parameter H in (1/4, 1). At level 0, our result yields an expression for the expected signature of such processes, which determine their law [CL16]. In particular, this formula simultaneously extends both the one for 1/2 < H-fBm [BC07] and the one for Brownian motion (H = 1/2) [Faw03], to the general case H > 1/4, thereby resolving an established open problem. Other processes studied include continuous and centred Gaussian semimartingales.
Riemann-Skorohod and Stratonovich integrals for Gaussian processes
Non-central limit of densities of some functionals of Gaussian processes
Two Types of Gaussian Processes and their Application to Statistical Estimations for Non-ergodic Vasicek Model
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