Spectral Analysis of Multi-dimensional Self-similar Markov Processes

Abstract

In this paper we consider a discrete scale invariant (DSI) process \X(t), t∈ R+\ with scale l>1. We consider to have some fix number of observations in every scale, say T, and to get our samples at discrete points αk, k∈ W where α is obtained by the equality l=αT and W=\0, 1,...\. So we provide a discrete time scale invariant (DT-SI) process X(·) with parameter space \αk, k∈ W\. We find the spectral representation of the covariance function of such DT-SI process. By providing harmonic like representation of multi-dimensional self-similar processes, spectral density function of them are presented. We assume that the process \X(t), t∈ R+\ is also Markov in the wide sense and provide a discrete time scale invariant Markov (DT-SIM) process with the above scheme of sampling. We present an example of DT-SIM process, simple Brownian motion, by the above sampling scheme and verify our results. Finally we find the spectral density matrix of such DT-SIM process and show that its associated T-dimensional self-similar Markov process is fully specified by \RjH(1),RjH(0),j=0, 1,..., T-1\ where RjH(τ) is the covariance function of jth and (j+τ)th observations of the process.