Kenneth Falconer, Yimin Xiao
Published 2012-12-11, updated 2013-11-22Version 2
We show that for certain Gaussian random processes and fields X:R^N to R^d, D_q(mu_X) = min{d, D_q(mu)/alpha} a.s. for an index alpha which depends on Holder properties and strong local nondeterminism of X, where q>1, where D_q denotes generalized q-dimension and where mu_X is the image of the measure mu under X. In particular this holds for index-alpha fractional Brownian motion, for fractional Riesz-Bessel motions and for certain infinity scale fractional Brownian motions.
Integral representation of random variables with respect to Gaussian processes
On the characteristics of a class of Gaussian processes within the white noise space setting
Uniform convergence of compactly supported wavelet expansions of Gaussian random processes
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