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[Haa10] Alfred Haar. Zur Theorie der orthogonalen Funktionensysteme. Mathematische Annalen , 69:331–371, 1910. Also in PhD thesis.
[HB92] F. Hlawatsch and G. F. Boudreaux-Bartels. Linear and quadratic time-frequency signal representations. IEEE Signal Processing Magazine , 9(2):21–67, April 1992.
[Hei93] Henk J. A. M. Heijmans. Descrete wavelets and multiresolution analysis. In Tom H. Koorn winder, editor, Wavelets: An Elementary Treatment of Theory and Applications , pages 49–80, World Scientific, Singapore, 1993.
[Hel95] Peter N. Heller. Rank m wavelet matrices with n vanishing moments. SIAM Journal on Matrix Analysis , 16:502–518, 1995. Also as technical report AD940123, Aware, Inc., 1994.
[Her71] O. Herrmann. On the approximation problem in nonrecursive digital filter design. IEEE Transactions on Circuit Theory , 18:411–413, May 1971. Reprinted in DSP reprints, IEEE Press, 1972, page 202.
[HHSM95] A. N. Hossen, U. Heute, O. V. Shentov, and S. K. Mitra. Subband DFT – Part II: accuracy, complexity, and applications. Signal Processing , 41:279–295, 1995.
[HKRV92] Cormac Herley, Jelena Kovačević, Kannan Ramchandran, and Martin Vetterli. Time- varying orthonormal tilings of the time-frequency plane. In Proceedings of the IEEE Signal Processing Society’s International Symposium on Time–Frequency and Time–Scale Analysis , pages 11–14, Victoria, BC, Canada, October 4–6, 1992.
[HKRV93] Cormac Herley, Jelena Kovačević, Kannan Ramchandran, and Martin Vetterli. Tilings of the time-frequency plane: consturction of arbitrary orthogonal bases and fast tiling algorithms. IEEE Transactions on Signal Processing , 41(12):3341–3359, December 1993. Special issue on wavelets.
[HPW94] Fr ́d ́ric Heurtaux, Fabrice Planchon, and Mladen V. Wickerhauser. Scale decomposition in Burgers’ equation. In John J. Benedetto and Michael W. Frazier, editors, Wavelets: Mathematics and Applications , pages 505–524, CRC Press, Boca Raton, 1994.
[HR96] D. P. Hardin and D. W. Roach. Multiwavelet Prefilters I: Orthogonal prefilters preserving approximation order p ≤ 2. Technical Report, Vanderbilt University, 1996.
[HRW92] Peter N. Heller, Howard L. Resnikoff, and Raymond O. Wells, Jr. Wavelet matrices and the representation of discrete functions. In Charles K. Chui, editor, Wavelets: A Tutorial in Theory and Applications , pages 15–50, Academic Press, Boca Raton, 1992. Volume 2 in the series: Wavelet Analysis and its Applications.
[HSS*95] P. N. Heller, V. Strela, G. Strang, P. Topiwala, C. Heil, and L. S. Hills. Multiwavelet filter banks for data compression. In IEEE Proceedings of the International Symposium on Circuits and Systems , pages 1796–1799, 1995.
[HSS96] C. Heil, G. Strang, and V. Strela. Approximation by translates of refinable functions. Numerische Mathematik , 73(1):75–94, March 1996.
[Hub96] Barbara Burke Hubbard. The World According to Wavelets . A K Peters, Wellesley, MA, 1996. Second Edition 1998.
[HW89] C. E. Heil and D. F. Walnut. Continuous and discrete wavelet transforms. SIAM Review , 31(4):628–666, December 1989.
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