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[Dau90] Ingrid Daubechies. The wavelet transform, time-frequency localization and signal analysis. IEEE Transaction on Information Theory , 36(5):961–1005, September 1990. Also a Bell Labs Technical Report.
[Dau92] Ingrid Daubechies. Ten Lectures on Wavelets . SIAM, Philadelphia, PA, 1992. Notes from the 1990 CBMS-NSF Conference on Wavelets and Applications at Lowell, MA.
[Dau93] Ingrid Daubechies. Orthonormal bases of compactly supported wavelets II, variations on a theme. SIAM Journal of Mathematical Analysis , 24(2):499–519, March 1993.
[Dau96] Ingrid Daubechies. Where do wavelets comre from? – a personal point of view. Proceedings of the IEEE , 84(4):510–513, April 1996.
[DD87] G. Deslauriers and S. Dubuc. Interpolation dyadique. In G. Cherbit, editor, Fractals, Dimensions Non Enti ́rs et Applications , pages 44–45, Masson, Paris, 1987.
[DDO97] Wolfgang Dahmen, Andrew Durdila, and Peter Oswald, editors. Multiscale Wavelet Methods for Partial Differential Equations . Academic Press, San Diego, 1997. Volume 6 in the series: Wavelet Analysis and its Applications .
[DFN*93] Special issue on wavelets and signal processing. IEEE Transactions on Signal Processing , 41(12):3213–3600, December 1993.
[DJ94a] David L. Donoho and Iain M. Johnstone. Ideal denoising in an orthonormal basis chosen from a library of bases. C. R. Acad. Sci. Paris, Ser. I , 319, to appear 1994. Also Stanford Statistics Dept. Report 461, Sept. 1994.
[DJ94b] David L. Donoho and Iain M. Johnstone. Ideal spatial adaptation via wavelet shrinkage. Biometrika , 81:425–455, 1994. Also Stanford Statistics Dept. Report TR-400, July 1992.
[DJ95] David L. Donoho and Iain M. Johnstone. Adapting to unknown smoothness via wavelet shrinkage. Journal of American Statist . Assn., to appear 1995. Also Stanford Statistics Dept. Report TR-425, June 1993.
[DJJ] Ingrid Daubechies, St ́phane Jaffard, and Jean-Lin Journ ́. A simple Wilson orthonormal basis with exponential decay. preprint.
[DJKP95a] David L. Donoho, Iain M. Johnstone, G ́rard Kerkyacharian, and Dominique Picard. Discussion of “Wavelet Shrinkage: Asymptopia?”. Journal Royal Statist. Soc. Ser B ., 57(2):337–
[DJKP95b] David L. Donoho, Iain M. Johnstone, G ́rard Kerkyacharian, and Dominique Picard. Wavelet shrinkage: asymptopia? Journal Royal Statistical Society B ., 57(2):301–337, 1995. Also Stanford Statistics Dept. Report TR-419, March 1993.
[DL91] Ingrid Daubechies and Jeffrey C. Lagarias. Two-scale difference equations, part I. Existence and global regularity of solutions. SIAM Journal of Mathematical Analysis , 22:1388–1410, 1991. From an internal report, AT&T Bell Labs, Sept. 1988.
[DL92] Ingrid Daubechies and Jeffrey C. Lagarias. Two-scale difference equations, part II. local regularity, infinite products of matrices and fractals. SIAM Journal of Mathematical Analysis , 23:1031–1079, July 1992. From an internal report, AT&T Bell Labs, Sept. 1988.
[DL93] R. DeVire and G. Lorentz. Constructive Approximation . Springer-Verlag, 1993.
[DM93] R. E. Van Dyck and T. G. Marshall, Jr. Ladder realizations of fast subband/vq coders with diamond structures. In Proceedings of IEEE International Symposium on Circuits and Systems , pages III:177–180, ISCAS, 1993.
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