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Article

Došlá, Šárka ; Anděl, Jiří
Weakly stationary processes with non–positive autocorrelations. (English). Kybernetika, vol. 46 (2010), issue 1, pp. 114-124
MSC: 60G10, 60G99, 60K99, 62H20, 62M10 | MR 2666898 | Zbl 1187.62142
Keywords:
non-positive autocorrelations; linear process
Summary:
We deal with real weakly stationary processes ${\{X_t,\ t\in\mathbb{Z}\}}$ with non-positive autocorrelations $\{r_k\}$, i. e.~it is assumed that $r_k\le 0$ for all $k=1,2,\dots$. We show that such processes have some special interesting properties. In particular, it is shown that each such a process can be represented as a linear process. Sufficient conditions under which the resulting process satisfies $r_k\le 0$ for all $k=1,2,\dots$ are provided as well.
References:
[1] J. Beran: Statistics for Long-Memory Processes. Chapman & Hall, New York 1994. MR 1304490 | Zbl 0869.60045
[2] L. Bondesson: On a minimum correlation problem. Statist. Probab. Lett. 62 (2003), 361–370. MR 1973311 | Zbl 1116.60326
[3] P. Brockwell and R. Davis: Time Series: Theory and Methods. Second edition. Springer, New York 1991. MR 1093459
[4] I. Gichman and A. V. Skorochod: Vvedenije v teoriju slučajnych processov. Nauka, Moskva 1965.
[5] Y. Katznelson: An Introduction to Harmonic Analysis. Third edition. Cambridge University Press, Cambridge 2004. MR 2039503 | Zbl 1055.43001
[6] K. Meister and L. Bondesson: Some Real Time Sampling Methods. Technical Report 2, Dept. of Math. Statist., Umeåa Univ. 2001.
[7] A. Zygmund: Trigonometric Series. Third edition. Cambridge University Press, Cambridge 2002. MR 1963498 | Zbl 1084.42003
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