Large deviation principle for fractional Brownian motion with respect to capacity

Large deviation principle for fractional Brownian motion with respect to capacity

We show that the fractional Brownian motion (fBM) defined via the Volterra integral representation with Hurst parameter H≥12 is a quasi-surely defined Wiener functional on the classical Wiener space, and we establish the large deviation principle (LDP) for such an fBM with respect to (p,r)-capacity...

Täydet tiedot

Bibliografiset tiedot
Päätekijät: Jiawei, L, Qian, Z
Aineistotyyppi: Journal article
Kieli:English
Julkaistu: Springer 2020
Kuvaus
Yhteenveto:We show that the fractional Brownian motion (fBM) defined via the Volterra integral representation with Hurst parameter H≥12 is a quasi-surely defined Wiener functional on the classical Wiener space, and we establish the large deviation principle (LDP) for such an fBM with respect to (p,r)-capacity on the classical Wiener space in Malliavin’s sense.

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