Stochastic Calculus with Respect to Gaussian Processes
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Open Access
- 1 April 2001
- journal article
- Published by Institute of Mathematical Statistics in The Annals of Probability
- Vol. 29 (2) , 766-801
- https://doi.org/10.1214/aop/1008956692
Abstract
In this paper we develop a stochastic calculus with respect to a Gaussian process of the form $B_t = \int^t_0 K(t, s)\, dW_s$, where $W$ is a Wiener process and $K(t, s)$ is a square integrable kernel, using the techniques of the stochastic calculus of variations. We deduce change-of-variable formulas for the indefinite integrals and we study the approximation by Riemann sums.The particular case of the fractional Brownian motion is discussed.
Keywords
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