Non-recursive representation of an autoregressive process within the Magic Square

Publikation: Beitrag in Buch/Bericht/Sammelwerk/KonferenzbandBeitrag in Buch/SammelwerkForschungPeer-Review

Autoren

  • Ina Loth
  • Boris Kargoll
  • Wolf-Dieter Schuh

Organisationseinheiten

Externe Organisationen

  • Rheinische Friedrich-Wilhelms-Universität Bonn
Forschungs-netzwerk anzeigen

Details

OriginalspracheEnglisch
Titel des SammelwerksIX Hotine-Marussi Symposium on Mathematical Geodesy
UntertitelProceedings of the Symposium in Rome, June 18 – 22, 2018
Herausgeber/-innenPavel Novák, Mattia Crespi, Nico Sneeuw, Fernando Sansò
ErscheinungsortCham
Herausgeber (Verlag)Springer Verlag
Seiten183-189
Seitenumfang7
Auflage1.
ISBN (elektronisch)978-3-030-54267-2
ISBN (Print)978-3-030-54266-5, 978-3-030-54269-6
PublikationsstatusVeröffentlicht - 22 März 2019

Publikationsreihe

NameInternational Association of Geodesy Symposia
Band151
ISSN (Print)0939-9585
ISSN (elektronisch)2197-9359

Abstract

A stochastic process can be represented and analysed by four different quantities in the time and frequency domain: (1) the process itself, (2) its autocovariance function, (3) the spectral representation of the stochastic process and (4) its spectral distribution or the spectral density function, if it exits. These quantities and their relationships can be clearly represented by the “Magic Square”, where the quantities build the corners of this square and the connecting lines indicate the transformations into each other.

The real-valued, time-discrete, one-dimensional and covariance-stationary autoregressive process of order p (AR(p) process) is a frequently used stochastic process for instance to model highly correlated measurement series with constant sampling rate given by satellite missions. In this contribution, a reformulation of an AR(p) to a moving average process with infinite order is presented. The Magic Square of this reformulated process can be seen as an alternative representation of the four quantities in time and frequency, which are usually given in the literature. The results will be evaluated by discussing an AR(1) process as example

ASJC Scopus Sachgebiete

Zitieren

Non-recursive representation of an autoregressive process within the Magic Square. / Loth, Ina; Kargoll, Boris; Schuh, Wolf-Dieter.
IX Hotine-Marussi Symposium on Mathematical Geodesy: Proceedings of the Symposium in Rome, June 18 – 22, 2018. Hrsg. / Pavel Novák; Mattia Crespi; Nico Sneeuw; Fernando Sansò. 1. Aufl. Cham: Springer Verlag, 2019. S. 183-189 (International Association of Geodesy Symposia ; Band 151).

Publikation: Beitrag in Buch/Bericht/Sammelwerk/KonferenzbandBeitrag in Buch/SammelwerkForschungPeer-Review

Loth, I, Kargoll, B & Schuh, W-D 2019, Non-recursive representation of an autoregressive process within the Magic Square. in P Novák, M Crespi, N Sneeuw & F Sansò (Hrsg.), IX Hotine-Marussi Symposium on Mathematical Geodesy: Proceedings of the Symposium in Rome, June 18 – 22, 2018. 1. Aufl., International Association of Geodesy Symposia , Bd. 151, Springer Verlag, Cham, S. 183-189. https://doi.org/10.1007/1345_2019_60
Loth, I., Kargoll, B., & Schuh, W.-D. (2019). Non-recursive representation of an autoregressive process within the Magic Square. In P. Novák, M. Crespi, N. Sneeuw, & F. Sansò (Hrsg.), IX Hotine-Marussi Symposium on Mathematical Geodesy: Proceedings of the Symposium in Rome, June 18 – 22, 2018 (1. Aufl., S. 183-189). (International Association of Geodesy Symposia ; Band 151). Springer Verlag. https://doi.org/10.1007/1345_2019_60
Loth I, Kargoll B, Schuh WD. Non-recursive representation of an autoregressive process within the Magic Square. in Novák P, Crespi M, Sneeuw N, Sansò F, Hrsg., IX Hotine-Marussi Symposium on Mathematical Geodesy: Proceedings of the Symposium in Rome, June 18 – 22, 2018. 1. Aufl. Cham: Springer Verlag. 2019. S. 183-189. (International Association of Geodesy Symposia ). doi: 10.1007/1345_2019_60
Loth, Ina ; Kargoll, Boris ; Schuh, Wolf-Dieter. / Non-recursive representation of an autoregressive process within the Magic Square. IX Hotine-Marussi Symposium on Mathematical Geodesy: Proceedings of the Symposium in Rome, June 18 – 22, 2018. Hrsg. / Pavel Novák ; Mattia Crespi ; Nico Sneeuw ; Fernando Sansò. 1. Aufl. Cham : Springer Verlag, 2019. S. 183-189 (International Association of Geodesy Symposia ).
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