Continuity in law with respect to the Hurst index of some additive functionals of sub-fractional Brownian motion |
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| Authors: | M. Ait Ouahra A. Sghir |
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| Affiliation: | 1. Faculté des Sciences, Laboratoire de Modélisation Stochastique et Déterministe et URAC 04, Université Mohammed Premier, Oujda, Marocouahra@gmail.com;3. Faculté des Sciences Meknès, équipe EDP et Calcul Scientifique, Université Moulay Ismail, Zitoune, Maroc |
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| Abstract: | In this article, first, we prove some properties of the sub-fractional Brownian motion introduced by Bojdecki et al. [Statist. Probab. Lett. 69(2004):405–419]. Second, we prove the continuity in law, with respect to small perturbations of the Hurst index, in some anisotropic Besov spaces, of some continuous additive functionals of the sub-fractional Brownian motion. We prove that our result can be obtained easily, by using the decomposition in law of the sub-fractional Brownian motion given by Bardina and Bascompte [Collect. Math. 61(2010):191–204] and Ruiz de Chavez and Tudor [Math. Rep. 11(2009):67–74], without using the result of Wu and Xiao [Stoch. Proc. Appl. 119(2009):1823–1844] by connecting the sub-fractional Brownian motion to its stationary Gaussian process through Lamperti’s transform. This decomposition in law leads to a better understanding and simple proof of our result. |
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| Keywords: | Anisotropic Besov spaces limit theorem tightness continuity in law fractional Brownian motion sub-fractional Brownian motion local time fractional derivative slowly varying function |
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