Abstract
This article focuses on simulating fractional Brownian motion
(fBm). Despite the availability of several exact simulation
methods, attention has been paid to approximate simulation (i.e.,
the output is approximately fBm), particularly because of possible
time savings. In this article, we study the class of approximate
methods that are based on the spectral properties of fBm's
stationary incremental process, usually called fractional Gaussian
noise (fGn). The main contribution is a proof of asymptotical
exactness (in a sense that is made precise) of these spectral
methods. Moreover, we establish the connection between the spectral
simulation approach and a widely used method, originally proposed
by Paxson, that lacked a formal mathematical justification.
The insights enable us to evaluate the Paxson method in more
detail. It is also shown that spectral simulation is related
to the fastest known exact method.
Publisher
Cambridge University Press (CUP)
Subject
Industrial and Manufacturing Engineering,Management Science and Operations Research,Statistics, Probability and Uncertainty,Statistics and Probability
Cited by
58 articles.
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