[Bremaud P. (2002) Mathematical Principles of Signal Processing: Fourier and Wavelet Analysis, Springer Verlag Inc., New York.]Search in Google Scholar
[Brillinger D.R. (1975) Time Series — Data Analysis and Theory, Holt, Rinehart and Winston Inc., New York.]Search in Google Scholar
[Candès E.J., Charlton Ph.R., Helgason H. (2008) Detecting Highly Oscillatory Signals by Chirplet Path Pursuit, Applied and Computational Harmonic Analysis, Vol. 24, No. 1, 14-40.]Search in Google Scholar
[Fabert O. (2004) Effiziente Wavelet Filterung mit hoher Zeit-Frequenz-Auflösung, Veröffentlichungen der Deutschen Geodätischen Kommission, Reihe A — Theoretische Geodäsie, Heft 119, Verlag der Bayerischen Akademie der Wissenschaften, München.]Search in Google Scholar
[Fabert O., Schmidt M. (2003) Wavelet Filtering with High Time-Frequency Resolution and Effective Numerical Implementation Applied on Polar Motion, Artificial Satellites — Journal of Planetary Geodesy, Vol. 38, No. 1, 3-13.]Search in Google Scholar
[Forbes A.M.G. (1988) Fourier Transform Filtering: A Cautionary Note, Journal of Geophysical Research, Vol. 93, No. C6, 6958-6962.]Search in Google Scholar
[Gasquet C., Witomski P. (1999) Fourier Analysis and Applications — Filtering, Numerical Computation, Wavelets, Springer Verlag Inc., New York.]Search in Google Scholar
[Gibson P.C., Lamoureux M.P., and Margrave G.F. (2006) Letter to the Editor: Stockwell and Wavelet Transforms, The Journal of Fourier Analysis and Applications, Vol. 12, Issue 6, 713-721.]Search in Google Scholar
[Hasan T. (1983) Complex Demodulation: Some Theory and Applications, In Brillinger D.R. and Krishnaiah P.R. (Editors), Handbook of Statistics, Vol. 3 — Time Series in the Frequency Domain, Elsevier Science Publishers, Amsterdam, 125-156.]Search in Google Scholar
[Hoggar S.D. (2006) Mathematics of Digital Images — Creation, Compression, Restoration, Recognition, Cambridge University Press, Cambridge.10.1017/CBO9780511810787]Search in Google Scholar
[Kołaczek B. (1992) Variations of Short Periodical Oscillations of Polar Motion with Periods Ranging from 10-140 Days, Report No. 419, Department of Geodetic Science and Surveying, The Ohio State University, Columbus, Ohio, USA.]Search in Google Scholar
[Kołaczek B. and Kosek W. (1993) Variations of 80-120 Days Oscillations of Polar Motion and Atmospheric Angular Momentum, Proceedings of the 7th International Symposium — Geodesy and Physics of the Earth, IAG Symposium No. 112, Potsdam, Germany, 5-10 October 1992, Edited by H. Montag and Ch. Reigber, Springer Verlag, 439-442.]Search in Google Scholar
[Koopmans L.H. (1974) Spectral Analysis of Time Series, Academic Press, New York.]Search in Google Scholar
[Kosek W. (1995) Time Variable Band Pass Filter Spectra of Real and Complex-Valued Polar Motion Series, Artificial Satellites — Planetary Geodesy, Vol. 30, No. 1, 27-43.]Search in Google Scholar
[Kosek W. (2004) Possible Excitation of the Chandler Wobble by Variable Geophysical Annual Cycle, Artificial Satellites — Journal of Planetary Geodesy, Vol. 39, No. 2, 135-145.]Search in Google Scholar
[Kosek W., Kaczkowski J. (1994) Short Periodic Oscillations in x and y Pole Coordinates of the SLR and VLBI Techniques Detected After Filtering with the Kalman Filter, Proceedings of the 3rd Orlov Conference — Study of the Earth as Planet by Methods of Astronomy, Astrophysics and Geodesy, Odessa, 1992, Main Astronomical Observatory, Kiev, 288-297.]Search in Google Scholar
[Kosek W., Nastula J., Kołaczek B. (1995) Variability of Polar Motion Oscillations with Periods from 20 to 150 Days in 1979-1991, Bulletin Géodésique, Vol. 69, No. 4, 308-319.]Search in Google Scholar
[Kosek W., Popiński W. (1999) Comparison of Spectro-Temporal Analysis Methods on Polar Motion and its Atmospheric Excitation, Artificial Satellites — Journal of Planetary Geodesy, Vol. 34, No. 2, 65-75.]Search in Google Scholar
[Kulesh M., Holschneider M., Diallo M.S. (2008) Geophysical Wavelet Library: Applications of the Continuous Wavelet Transform to the Polarization and Dispersion Analysis of Signals, Computers & Geosciences, Vol. 34, No. 12, 1732-1752.]Search in Google Scholar
[Nastula J., Korsun A., Kołaczek B., Kosek W., Hozakowski W. (1993) Variations of the Chandler and Annual Wobbles of Polar Motion in 1846-1988 and their Prediction, Manuscripta Geodaetica, Vol. 18, 131-135.]Search in Google Scholar
[Newland D.E. (1993) Harmonic Wavelet Analysis, Proceedings of the Royal Society of London, Series A, Vol. 443, 203-225.]Search in Google Scholar
[Newland D.E. (1994) Harmonic and Musical Wavelets, Proceedings of the Royal Society of London, Series A, Vol. 444, 605-620.]Search in Google Scholar
[Newland D.E. (1998) Time-Frequency and Time-Scale Signal Analysis by Harmonic Wavelets, In Procházka A., Uhliř J., Rayner P.J., Kingsbury N.G. (Editors), Signal Analysis and Prediction, Birkhäuser, Boston, 3-26.]Search in Google Scholar
[Pan Ch. (1998) Spectral Ringing Suppression and Optimal Windowing for Attenuation and Q Measurements, Geophysics, Vol. 63, No. 2, 632-636.]Search in Google Scholar
[Pan Ch. (2001) Gibbs Phenomenon Removal and Digital Filtering Directly through the Fast Fourier Transform, IEEE Transactions on Signal Processing, Vol. 49, No. 2, 444-448.]Search in Google Scholar
[Park J. (1992) Envelope Estimation for Quasi-Periodic Geophysical Signals in Noise: A Multi-taper Approach, In Walden A.T. and Guttorp P. (Editors), Statistics in the Environmental and Earth Sciences, London, 189-219.]Search in Google Scholar
[Popiński W. (1997) On Consistency of Discrete Fourier Analysis of Noisy Time Series, Artificial Satellites — Journal of Planetary Geodesy, Vol. 32, No. 3, 131-142.]Search in Google Scholar
[Popiński W., Kosek W. (1995) The Fourier Transform Band Pass Filter and its Application for Polar Motion Analysis, Artificial Satellites — Planetary Geodesy, Vol. 30, No. 1, 9-25.]Search in Google Scholar
[Popiński W., Kosek W. (2000) Comparison of Various Spectro-Temporal Coherence Functions between Polar Motion and Atmospheric Excitation Functions, Artificial Satellites — Journal of Planetary Geodesy, Vol. 35, No. 4, 191-207.]Search in Google Scholar
[Popiński W., Kosek W. (1999) Spectral Analysis of Sea Surface Topography Observed by TOPEX/POSEIDON Altimetry Using Two-Dimensional Fourier Transform, Report Nr 40 — Space Research Centre PAS, Warsaw 1999.]Search in Google Scholar
[Press W.H., Flannery B.P., Teukolsky S.A., Vetterling W.T. (1992) Numerical Recipes — The Art of Scientific Computing, Cambridge University Press, Cambridge.]Search in Google Scholar
[Sejdić E., Djurović I. and Jiang J. (2009) Time-Frequency Feature Representation Using Energy Concentration: An Overview of Recent Advances, Digital Signal Processing, Vol. 19, Nr. 1, 153-183.]Search in Google Scholar
[Singleton R.C. (1969) An Algorithm for Computing the Mixed Radix Fast Fourier Transform, IEEE Transactions on Audio and Electroacoustics, Vol. 17, No. 2, 93-103.]Search in Google Scholar
[Speed T.P. (1985) Some Practical and Statistical Aspects of Filtering and Spectrum Estimation, In Price J. F. (Editor), Fourier Techniques and Applications, Plenum Press, New York, 101-118.10.1007/978-1-4613-2525-3_6]Search in Google Scholar
[Stockwell R.G. (2007) Why to Use the S-Transform?, In Fields Institute Communications — Vol. 52 — Pseudo-differential Operators: Partial Differential Equations and Time-Frequency Analysis, Edited by L. Rodino, B.-W. Schulze, M.W. Wong, 279-309.]Search in Google Scholar
[Stockwell R.G., Mansinha L., and Lowe R.P. (1996) Localization of the Complex Spectrum: The S Transform, IEEE Transactions on Signal Processing, Vol. 44, No. 4, 998-1001.]Search in Google Scholar
[Van Milligen B.Ph. (1999) Wavelets, Non-linearity and Turbulence in Fusion Plasmas, In Van den Berg J.C. (Editor), Wavelets in Physics, Cambridge University Press, Cambridge, 227-262.]Search in Google Scholar
