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Abramovich, Y.I., Spencer, N.K. and Turley, M.D. (2007). Time-varying autoregressive (TVAR) models for multiple radar observations, IEEE Transactions on Signal Processing 55(4): 1298–1311.Search in Google Scholar
Baillie, D.C. and Mathew, J. (1996). A comparison of autoregressive modeling techniques for fault diagnosis of rolling element bearings, Mechanical Systems and Signal Processing 10(1): 1–17.Search in Google Scholar
Barbieri, M., Bosso, A., Conficoni, C., Diversi, R., Sartini, M. and Tilli, A. (2018). An onboard model-of-signals approach for condition monitoring in automatic machines, in M. Zelm et al. (Eds), Enterprise Interoperability: Smart Services and Business Impact of Enterprise Interoperability, Wiley Online Library, London, pp. 263–269.Search in Google Scholar
Barbieri, M., Diversi, R. and Tilli, A. (2019). Condition monitoring of ball bearings using estimated AR models as logistic regression features, Proceedings of the 18th European Control Conference (ECC 2019), Naples, Italy, pp. 3904–3909.Search in Google Scholar
Barbieri, M., Nguyen, K.T., Diversi, R., Medjaher, K. and Tilli, A. (2021). RUL prediction for automatic machines: A mixed edge-cloud solution based on model-of-signals and particle filtering techniques, Journal of Intelligent Manufacturing 32(5): 1421–1440.Search in Google Scholar
Basseville, M. (1988). Detecting changes in signals and systems—A survey, Automatica 24(3): 309–326.Search in Google Scholar
Bobillet, W., Diversi, R., Grivel, E., Guidorzi, R., Najim, M. and Soverini, U. (2007). Speech enhancement combining optimal smoothing and errors-in-variables identification of noisy AR processes, IEEE Transactions on Signal Processing 55(12): 5564–5578.Search in Google Scholar
Box, G.E., Jenkins, G.M., Reinsel, G.C. and Ljung, G.M. (2015). Time Series Analysis: Forecasting and Control, John Wiley & Sons, Hoboken.Search in Google Scholar
Cadzow, J. (1982). Spectral estimation: An overdetermined rational model equation approach, Proceedings of the IEEE 70(9): 907–939.Search in Google Scholar
Chan, Y. and Langford, R. (1982). Spectral estimation via the high-order Yule–Walker equations, IEEE Transactions on Acoustics, Speech, and Signal Processing 30(5): 689–698.Search in Google Scholar
Davila, C.E. (1998). A subspace approach to estimation of autoregressive parameters from noisy measurements, IEEE Transactions on Signal Processing 46(2): 531–534.Search in Google Scholar
Davila, C.E. (2001). On the noise-compensated Yule–Walker equations, IEEE Transactions on Signal Processing 49(6): 1119–1121.Search in Google Scholar
Diversi, R. (2018). Identification of multichannel AR models with additive noise: A Frisch scheme approach, Proceedings of the 26th European Signal Processing Conference (EUSIPCO 2018), Rome, Italy, pp. 1252–1256.Search in Google Scholar
Diversi, R., Guidorzi, R. and Soverini, U. (2008). Identification of autoregressive models in the presence of additive noise, International Journal of Adaptive Control and Signal Processing 22(5): 465–481.Search in Google Scholar
Diversi, R., Soverini, U. and Guidorzi, R. (2005). A new estimation approach for AR models in presence of noise, IFAC Proceedings Volumes 38(1): 160–165.Search in Google Scholar
Esfandiari, M., Vorobyov, S.A. and Karimi, M. (2020). New estimation methods for autoregressive process in the presence of white observation noise, Signal Processing 171(6): 107480.Search in Google Scholar
Friedlander, B. (1984). The overdetermined recursive instrumental variable method, IEEE Transactions on Automatic Control 29(4): 353–356.Search in Google Scholar
Grivel, E., Gabrea, M. and Najim, M. (2002). Speech enhancement as a realisation issue, Signal Processing 44(12): 1963–1978.Search in Google Scholar
Guidorzi, R., Diversi, R., Vincenzi, L., Mazzotti, C. and Simioli, V. (2014). Structural monitoring of a tower by means of MEMS-based sensing and enhanced autoregressive models, European Journal of Control 20(1): 4–13.Search in Google Scholar
Güler, I., Kiymik, M.K., Akin, M. and Alkan, A. (2001). AR spectral analysis of EEG signals by using maximum likelihood estimation, Computers in Biology and Medicine 31(6): 441–450.Search in Google Scholar
Haykin, S.S. and Steinhardt, A.O. (1992). Adaptive Radar Detection and Estimation, Wiley-Interscience, New York.Search in Google Scholar
Hilgert, N. and Vila, J.-P. (1999). D-step ahead Kalman predictor for controlled autoregressive processes with random coefficients, International Journal of Applied Mathematics and Computer Science 9(1): 207–217.Search in Google Scholar
Jia, L.J., Kanae, S., Yang, Z.J. and Wada, K. (2003). On bias compensation estimation for noisy AR process, Proceedings of the 42nd IEEE Conference on Decision and Control (CDC 2003), Maui, USA, pp. 405–410.Search in Google Scholar
Kay, S. (1979). The effects of noise on the autoregressive spectral estimator, IEEE Transactions on Acoustics, Speech, and Signal Processing 27(5): 478–485.Search in Google Scholar
Kay, S. (1980). Noise compensation for autoregressive spectral estimates, IEEE Transactions on Acoustics, Speech, and Signal Processing 28(3): 292–303.Search in Google Scholar
Kay, S.M. (1988). Modern Spectral Estimation, Prentice-Hall, Englewood Cliffs.Search in Google Scholar
Kovacevic, B.D., Milosavljevic, M.M. and Veinovic, M.D. (1995). Robust recursive AR speech analysis, Signal Processing 44(6): 125–138.Search in Google Scholar
Labarre, D., Grivel, E., Berthoumieu, Y., Todini, E. and Najim, M. (2006). Consistent estimation of autoregressive parameters from noisy observations based on two interacting Kalman filters, Signal Processing 86(10): 2863–2876.Search in Google Scholar
Lim, J. and Oppenheim, A. (1978). All-pole modeling of degraded speech, IEEE Transactions on Acoustics, Speech, and Signal Processing 26(3): 197–210.Search in Google Scholar
Lipiec, B., Mrugalski, M., Witczak, M. and Stetter, R. (2022). Towards a health-aware fault tolerant control of complex systems: A vehicle fleet case, International Journal of Applied Mathematics and Computer Science 32(4): 619–634, DOI: 10.34768/amcs-2022-0043.Search in Google Scholar
Ljung, L. (1999). System Identification—Theory for the User, Prentice-Hall, Upper Saddle River.Search in Google Scholar
Mahmoudi, A. and Karimi, M. (2010). Parameter estimation of autoregressive signals from observations corrupted with colored noise, Signal Processing 90(1): 157–164.Search in Google Scholar
Mahmoudi, A. and Karimi, M. (2011). Inverse filtering based method for estimation of noisy autoregressive signals, Signal Processing 91(7): 1659–1664.Search in Google Scholar
Paliwal, K. (1988). A noise-compensated long correlation matching method for AR spectral estimation of noisy signals, Signal Processing 15(4): 437–440.Search in Google Scholar
Pardey, J., Roberts, S.K. and Tarassenko, L. (1996). A review of parametric modelling techniques for EEG analysis, Medical Engineering & Physics 18(1): 2–11.Search in Google Scholar
Petitjean, J., Diversi, R., Grivel, E., Guidorzi, R. and Roussilhe, P. (2009). Recursive errors-in-variables approach for AR parameter estimation from noisy observations. Application to radar sea clutter rejection, Proceedings of the 2009 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP 2009), Taipei, Taiwan, pp. 3401–3404.Search in Google Scholar
Petitjean, J., Grivel, E., Bobillet, W. and Roussilhe, P. (2010). Multichannel AR parameter estimation from noisy observations as an errors-in-variables issue, Signal, Image and Video Processing 4: 209–220.Search in Google Scholar
Rouffet, T., Grivel, E., Vallet, P., Enderli, C. and Kemkemian, S. (2015). Combining two phase codes to extend the radar unambiguous range and get a trade-off in terms of performance for any clutter, Proceedings of the 2015 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP 2015), Brisbane, Australia, pp. 1822–1826.Search in Google Scholar
Sakai, H. and Arase, M. (1979). Recursive parameter estimation of an autoregressive process disturbed by white noise, International Journal of Control 30(6): 949–966.Search in Google Scholar
Sikora, M. and Sikora, B. (2012). Improving prediction models applied in systems monitoring natural hazards and machinery, International Journal of Applied Mathematics and Computer Science 22(2): 477–491, DOI: 10.2478/v10006-012-0036-3.Search in Google Scholar
Söderström, T. and Stoica, P. (1989). System Identification, Prentice-Hall, Inc., Hemel Hempstead.Search in Google Scholar
Stoica, P. and Moses, R. (2005). Spectral Analysis of Signals, Pearson Prentice Hall, Upper Saddle River.Search in Google Scholar
Treichler, J.R. (1979). Transient and convergent behaviour of the adaptive line enhancer, IEEE Transactions on Acoustics, Speech and Signal Processing 27(2): 53–62.Search in Google Scholar
Wang, W. and Wong, A.K. (2002). Autoregressive model-based gear fault diagnosis, Journal of Vibration and Acoustics 124(3): 172–179.Search in Google Scholar
Wang, X. and Makis, V. (2009). Autoregressive model-based gear shaft fault diagnosis using the Kolmogorov–Smirnov test, Journal of Sound and Vibration 327(3): 413–423.Search in Google Scholar
Wu, W.R. and Chen, P.C. (1997). Adaptive AR modelling in white Gaussian noise, IEEE Transactions on Signal Processing 45(5): 1184–1191.Search in Google Scholar
Xia, Y. and Zheng, W.X. (2015). Novel parameter estimation of autoregressive signals in the presence of noise, Automatica 62(12): 98–105.Search in Google Scholar
Zhang, Y., Liu, B., Ji, X. and Huang, D. (2017). Classification of EEG signals based on autoregressive model and wavelet packet decomposition, Neural Processing Letters 45: 365–378.Search in Google Scholar
Zhang, Y., Wen, C. and Chai Soh, Y. (2000). Unbiased LMS filtering in the presence of white measurement noise with unknown power, IEEE Transactions on Circuits and Systems II: Analog and Digital Signal Processing 47(9): 968–972.Search in Google Scholar
Zheng, W.X. (1997). Estimation of autoregressive signals from noisy measurements, IEE Proceedings—Vision, Image and Signal Processing 144(1): 39–45.Search in Google Scholar
Zheng, W.X. (1999). A least-squares based method for autoregressive signals in the presence of noise, IEEE Transactions on Circuits and Systems II: Analog and Digital Signal Processing 46(1): 81–85.Search in Google Scholar
Zheng, W.X. (2000). Autoregressive parameter estimation from noisy data, IEEE Transactions on Circuits and Systems II: Analog and Digital Signal Processing 47(1): 71–75.Search in Google Scholar
Zheng, W.X. (2006). On estimation of autoregressive signals in the presence of noise, IEEE Transactions on Circuits and Systems II: Express Briefs 53(12): 1471–1475.Search in Google Scholar
