<< Chapter < Page | Chapter >> Page > |
[HW94] Peter N. Heller and R. O. Wells. The spectral theory of multiresolution operators and applications. In C. K. Chui, L. Montefusco, and L. Puccio, editors, Wavelets: Theory, Algorithms, and Applications , pages 13–31, Academic Press, San Diego, 1994. Also as technical report AD930120, Aware, Inc., 1993; Volume 5 in the series: Wavelet Analysis and its Applications .
[HW96a] Peter N. Heller and R. O. Wells. Sobolev regularity for rank M wavelets. SIAM Journal on Mathematical Analysis , submitted, Oct. 1996. Also a CML Technical Report TR9608, Rice University, 1994.
[HW96b] Eugenio Hern ́ndez and Guido Weiss. A First Course on Wavelets . CRC Press, Boca Raton, 1996.
[HW06] Christopher Heil and David F. Walnut. Fundamental Papers in Wavelet Theory . Princeton University Press, 2006.
[IRP*96] Plamen Ch. Ivanov, Michael G Rosenblum, C.-K. Peng, Joseph Mietus, Shlomo Havlin, H. Eugene Stanley, and Ary L. Goldberger. Scaling behaviour of heartbeat intervals obtained by wavelet-based time-series analysis. Nature , 383:323–327, September 26 1996.
[JB82] H. W. Johnson and C. S. Burrus. The design of optimal DFT algorithms using dynamic programming. In Proceedings of the IEEE International Conference on Acoustics, Speech, and Signal Processing , pages 20–23, Paris, May 1982.
[JCF95] R. L. Josho, V. J. Crump, and T. R. Fischer. Image subband coding using arithmetic coded trellis coded quantization. IEEE Transactions on Circuits and Systems , 515–523, December 1995.
[Jia95] R. Q. Jia. Subdivision schemes in Lp spaces. Advances in Computational Mathematics , 3:309–341, 1995.
[JMNK96] B. R. Johnson, J. P. Modisette, P. A. Nordlander, and J. L. Kinsey. Quadrature integration for compact support wavelets. Journal of Computational Physics , submitted 1996. Also Rice University Tech. Report.
[JN84] N. S. Jayant and P. Noll. Digital Coding of Waveforms . Prentice-Hall, Inc., Englewood Cliffs, NJ, 1st edition, 1984.
[JRZ96a] R. Q. Jia, S. D. Riemenschneider, and D. X. Zhou. Approximation by Multiple Refinable Functions . Technical Report, University of Alberta, 1996. To appear in: Canadian Journal of Mathematics.
[JRZ96b] R. Q. Jia, S. D. Riemenschneider, and D. X. Zhou. Vector Subdivision Schemes and Multiple Wavelets . Technical Report, University of Alberta, 1996.
[JRZ97] R. Q. Jia, S. D. Riemenschneider, and D. X. Zhou. Smoothness of Multiple Refinable Functions and Multiple Wavelets . Technical Report, University of Alberta, 1997.
[JS94a] Bj ̈rn Jawerth and Wim Sweldens. An overview of wavelet based multiresolution analyses. SIAM Review , 36:377–412, 1994. Also a University of South Carolina Math Dept. Technical Report, Feb. 1993.
[JS94b] I. M. Johnstone and B. W. Silverman. Wavelet Threshold Estimators for Data with Correlated Noise . Technical Report, Statistics Dept., University of Bristol, September 1994.
[Kai94] G. Kaiser. A Friendly Guide to Wavelets . Birkh ̈user, Boston, 1994.
[KMDW95] H. Krim, S. Mallat, D. Donoho, and A. Willsky. Best basis algorithm for signal enhancement. In Proceedings of the IEEE International Conference on Acoustics, Speech, and Signal Processing , pages 1561–1564, IEEE ICASSP-95 Detroit, May 1995.
Notification Switch
Would you like to follow the 'Wavelets and wavelet transforms' conversation and receive update notifications?