A Multiplicative Wavelet-based Model for Simulation of a Random Process
Abstract
We consider a random process Y(t)=\X(t)\, where X(t) is a centered second-order process which correlation function R(t,s) can be represented as ∫R u(t,y)u(s,y) dy. A multiplicative wavelet-based representation is found for Y(t). We propose a model for simulation of the process Y(t) and find its rates of convergence to the process in the spaces C([0,T]) and Lp([0,T]) for the case when X(t) is a strictly sub-Gaussian process.
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