A Discrete Construction for Gaussian Markov Processes

Abstract

In the L\'evy construction of Brownian motion, a Haar-derived basis of functions is used to form a finite-dimensional process WN and to define the Wiener process as the almost sure path-wise limit of WN when N tends to infinity. We generalize such a construction to the class of centered Gaussian Markov processes X which can be written Xt = g(t) · ∫0t f(t) dWt with f and g being continuous functions. We build the finite-dimensional process XN so that it gives an exact representation of the conditional expectation of X with respect to the filtration generated by Xk/2N for 0 ≤ k ≤ 2N. Moreover, we prove that the process XN converges in distribution toward X.