Analysis of the Rosenblatt process

Analysis of the Rosenblatt process

We analyze the Rosenblatt process which is a selfsimilar process with stationary increments and which appears as limit in the so-called Non Central Limit Theorem (Dobrushin and Majòr (1979), Taqqu (1979)). This process is non-Gaussian and it lives in the second Wiener chaos. We give its representati...

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Veröffentlicht in:Probability and statistics 2008-01, Vol.12, p.230-257
1. Verfasser: Tudor, Ciprian A.
Format: Artikel
Sprache:eng
Schlagworte:
60G12
60G15
60H05
60H07
Brownian motion
Calculus
Central limit theorem
fractional Brownian motion
Hydrology
Integrals
Intervals
Malliavin calculus
Mathematical analysis
Mathematical models
Mathematics
Non Central Limit Theorem
Non-Gaussian
Probability
Representations
Rosenblatt process
Skorohod integral
Statistics
stochastic calculus via regularization
Stochasticity
Studies
Theorems
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Beschreibung
Zusammenfassung:We analyze the Rosenblatt process which is a selfsimilar process with stationary increments and which appears as limit in the so-called Non Central Limit Theorem (Dobrushin and Majòr (1979), Taqqu (1979)). This process is non-Gaussian and it lives in the second Wiener chaos. We give its representation as a Wiener-Itô multiple integral with respect to the Brownian motion on a finite interval and we develop a stochastic calculus with respect to it by using both pathwise type calculus and Malliavin calculus.
ISSN:1292-8100
1262-3318
DOI:10.1051/ps:2007037