Abstract

The real-time estimation of polar motion (PM) is needed for the navigation of Earth satellite and interplanetary spacecraft. However, it is impossible to have real-time information due to the complexity of the measurement model and data processing. Various prediction methods have been developed. However, the accuracy of PM prediction is still not satisfactory even for a few days in the future. Therefore, new techniques or a combination of the existing methods need to be investigated for improving the accuracy of the predicted PM. There is a well-introduced method called Copula, and we want to combine it with singular spectrum analysis (SSA) method for PM prediction. In this study, first, we model the predominant trend of PM time series using SSA. Then, the difference between PM time series and its SSA estimation is modeled using Copula-based analysis. Multiple sets of PM predictions which range between 1 and 365 days have been performed based on an IERS 08 C04 time series to assess the capability of our hybrid model. Our results illustrate that the proposed method can efficiently predict PM. The improvement in PM prediction accuracy up to 365 days in the future is found to be around 40% on average and up to 65 and 46% in terms of success rate for the {hbox{PM}}_{x} and {hbox{PM}}_{y}, respectively.

Highlights

  • Polar motion (PM) describes the movement of the Earth’s rotation axis w.r.t the Earth surface

  • The PM is not provided in real time due to the complexity of the measurement model and data processing; PM coordinates are available with a delay of hours to days (Bizouard and Gambis 2009; Schuh and Behrend 2012)

  • We examined the combination of singular spectrum analysis (SSA) and Copula-based analysis to predict PM

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Summary

Introduction

Polar motion (PM) describes the movement of the Earth’s rotation axis w.r.t the Earth surface. Since the 1960s, highly accurate PM coordinates can be obtained by different space geodesy techniques. These techniques include: Satellite Laser Ranging (SLR) (Coulot et al 2010), Lunar Laser Ranging (LLR) (Dickey et al 1985), Doppler Orbitography and Radiopositioning Integrated by Satellite (DORIS) (Angermann et al 2010), Global Navigation Satellite Systems (GNSS) (Dow et al.2009; Byram and Hackman 2012), and very-long-baseline interferometry (VLBI) (Schuh and Schmitz-Hübsch 2000; Nilsson et al 2010, 2011, 2014). Accurate real-time PM is needed for high-precision satellite navigation and positioning and spacecraft tracking (Kalarus et al 2010; Stamatakos 2017). It is essential to predict the PM parameters precisely

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