Filtering Problem for Random Processes with Stationary Increments

Abstract

This paper deals with the problem of optimal mean-square filtering of the linear functionals A=∫0∞a(t)(-t)dt and AT=∫0Ta(t)(-t)dt which depend on the unknown values of random process (t) with stationary nth increments from observations of process (t)+η(t) at points t≤0, where η(t) is a stationary process uncorrelated with (t). We propose the values of mean-square errors and spectral characteristics of optimal linear estimates of the functionals when spectral densities of the processes are known. In the case where we can operate only with a set of admissible spectral densities relations that determine the least favorable spectral densities and the minimax spectral characteristics are proposed.

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