Characterization of the spectra of periodically correlated processes. (English) Zbl 1003.60037
The main result proves that a tempered distribution \(F\) on \(R^{2}\) is the spectrum of a periodically correlated process with period \(T>0\) if and only if \(F\) is positive definite and \(F = \sum_{k} F_{k}\), where, for each integer \(k\), \(F_{k}\) is a uniformly bounded complex measure on \(R^{2}\) supported on the line \(L_{k}= \{ (s,s + 2 \pi k)/T: s \in R\}\). The form of each \(F_{k}\) is also derived. Some previous work of the author [Stud. Math. 136, No. 1, 71-86 (1999; Zbl 0947.60032)] plays a key role in the proof.
Reviewer: James Tomkins (Regina)
MSC:
| 60G12 | General second-order stochastic processes |
| 60G10 | Stationary stochastic processes |
| 42A75 | Classical almost periodic functions, mean periodic functions |
Keywords:
periodically correlated process; correlation function; spectrum of a distribution; tempered distribution; positive definite distributionCitations:
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