Approximation at First and Second Order of m-order Integrals of the Fractional Brownian Motion and of Certain Semimartingales

Let X be the fractional Brownian motion of any Hurst index H in (0,1) (resp. a semimartingale) and set alpha=H (resp. alpha=1/2). If Y is a continuous process and if m is a positive integer, we study the existence of the limit, as epsilon tends to 0, of the approximations Iepsilon(Y,X) :={int_0^t Ys ((Xs+epsilon-Xs)/(epsilon)alpha)mds, t>=0} of m-order integral of Y with respect to X. For these two choices of X, we prove that the limits are almost sure, uniformly on each compact interval, and are in terms of the m-th moment of the Gaussian standard random variable. In particular, if m is an odd integer, the limit equals to zero. In this case, the convergence in distribution, as epsilon tends to 0, of (epsilon)-½Iepsilon(1,X) is studied. We prove that the limit is a Brownian motion when X is the fractional Brownian motion of index H in (0,1/2], and it is in term of a two dimensional standard Brownian motion when X is a semimartingale.

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Source ISSN: 1083-6489
Author Gradinaru, Mihai, Nourdin, Ivan
Maintainer CCSD
Last Updated May 7, 2026, 23:26 (UTC)
Created May 7, 2026, 23:26 (UTC)
Identifier hal-00091322
Language en
Rights https://about.hal.science/hal-authorisation-v1/
contributor Institut Élie Cartan de Nancy (IECN) ; Institut National de Recherche en Informatique et en Automatique (Inria)-Université Henri Poincaré - Nancy 1 (UHP)-Université Nancy 2-Institut National Polytechnique de Lorraine (INPL)-Centre National de la Recherche Scientifique (CNRS)
creator Gradinaru, Mihai
date 2003-05-07T00:00:00
harvest_object_id 49caea0a-179b-4690-8928-1bc15e888f91
harvest_source_id 3374d638-d20b-4672-ba96-a23232d55657
harvest_source_title test moissonnage SELUNE
metadata_modified 2025-11-04T00:00:00
set_spec type:ART