[1]PELEKANAKIS K, LIU Hong Qing, CHITRE M. An algorithm for sparse underwater acoustic channel identification under symmetric α-stable noise[C]//OCEANS, Spain, 2011: 1-6.[2]GIANNAKIS G B, TEPEDELENLIOGLU C. Basis expansion models and diversity techniques for blind identification and equalization of time varying channels[J]. Proceedings of the IEEE, 1998, 86(11): 1969-1986.[3] LEUS G, MOONEN M. Deterministic subspace based blind channel estimation for doubly-selective channels [C]//Signal Processing Advances in Wireless Communications 2003, Rome Italy, 2003: 210-214.[4]GUIMARAES A, FQUIH B, DESBOUVRIES F. A fixed-lag particle smoothing algorithm for the blind turbo equalization of time-varying channels[C]//ICASSP 2008, LAS VEGAS, USA, 2008: 2917-2920.[5]OLIVIER R, GEERT L, MARC M. Estimation and equalization of doubly selective channels using known symbol padding[J]. IEEE Transactions on Signal Processing, 2006, 54(3): 979-990.[6]CHEN Y, GU Y, HERO A O. Sparse LMS for system identification[C]//IEEE Internation Conference on Acoustics, Speech and Signal Processing 2009, Taipei, 2009.[7] PELEKANAKIS K, CHITRE M. Comparison of sparse adaptive filters for underwater acoustic channel equalization/estimation [C]//ICCS 2010, Amsterdam Holland, 2010:395 – 399.[8]MA L, WANG Z, BO Y, GUO Z. A game theory approach to mixed H2/H∞ control for a class of stochastic time-varying systems with randomly occurring nonlinearities[J]. Systems & Control Letters, 2011, 60(12): 1009-1015.[9]YOU Fuqiang, WANG Fuli, GUAN Shouping. Game-theoretic design for robust H∞ filtering and deconvolution with consideration of known input [J]. IEEE Transactions on Automation Science and Engineering, 2011, 8(3): 532-539.[10]SHEN X, DENG L. Game theory approach to discrete H∞ filter design[J]. IEEE Transactions on Signal Processing, 1997, 45(4): 1092-1095.[11]LIM J, HONG D. Frequency-selective and nonlinear channel estimation with unknown noise statistics[J]. IEEE Communications Letters, 2010, 14(3): 245-247.[12]GONZALEZ J, PAREDES J, ARCE G. Zero-order statistics: a mathematical framework for the processing and characterization of vary impulsive signals[J]. IEEE Transactions Signal Process, 2006, 54(10): 3839-3851.[13]PANDER T, PRZYBYLA T. Impulsive noise cancelation with simplified Cauchy-based p-norm filter[J]. Signal Processing, 2012, 92(9): 2187- 2198.[14] TSAKALIDES P. Array signal processing with alpha-stable distributions[D]. Los Angeles: University of Southern California, 1995.[15]WANG N, ZHANG Z, GUI G, ZHANG P. Improved sparse channel estimation for multicarrier systems with compressive sensing[C]//Wireless Personal Multimedia Communications (WPMC), 2011 14th International Symposium on IEEE, 2011: 1-5. |