$Mean-square consistency of the $f$-truncated $\text{M}^2$-periodogram$

Mean-square consistency of the $f$-truncated $\text{M}^2$-periodogram

The paper deals with the problem of estimating the M$^2$ (i.e. multivariate and multidimensional) spectral density function of a stationary random process or random field. We propose the $f$-truncated periodogram, i.e. a truncated periodogram where the truncation point is a suitable function $f$ of...

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Hauptverfasser:	Falconi, Lucia, Ferrante, Augusto, Zorzi, Mattia
Format:	Artikel
Sprache:	eng
Schlagworte:	Mathematics - Optimization and Control Mathematics - Statistics Theory Statistics - Theory
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Beschreibung
Zusammenfassung:	The paper deals with the problem of estimating the M$^2$ (i.e. multivariate and multidimensional) spectral density function of a stationary random process or random field. We propose the $f$-truncated periodogram, i.e. a truncated periodogram where the truncation point is a suitable function $f$ of the sample size. We discuss the asymptotic consistency of the estimator and we provide three concrete problems that can be solved using the proposed approach. Simulation results show the effectiveness of the procedure.
DOI:	10.48550/arxiv.2208.11980