Recent publications of David Tay

JOURNAL:

  1. Sarah A. Hope, David B. Tay, Ian T. Meredith, James D. Cameron. Use of Arterial Transfer Functions for the Derivation of Aortic Waveform Characterictics. Journal of Hypertension, Vol. 21, No. 1, Pg.1299-1305 July 2003.

  2. Sarah A. Hope, David B. Tay, Ian T. Meredith, James D. Cameron. Use of Arterial Transfer Functions for the Derivation of Aortic Waveform Characterictics in Subjects with Type 2 Diabetes Mellitus. Diabetic Care, Vol. 27, No. 3, Mar. 2004, Pg. 746-751.

  3. D.B.H. Tay. Balanced-Uncertainty Optimized Wavelet Filters with Prescribed Vanishing Moments. Circuits, Systems and Signal Processing, Vol. 23, No. 2, 2004, Pg. 105-121.

  4. D.B.H. Tay and M. Palaniswami. A Novel Approach to the Design of the Class of Triplet Halfband Filter Banks. IEEE Transactions on Circuits and Systems, Part-II, Vol. 51, No. 7, July 2004, Pg. 378-383.

  5. D.B.H. Tay. EBFB: A New Class of Wavelet Filters. IEEE Signal Processing Letters, Vol. 12, No. 3, March, 2005. Pg. 206-209.

  6. D.B.H. Tay. Zero-Pinning the Bernstein Polynomial: A Simple Design Technique for Orthonormal Wavelets. IEEE Signal Processing Letters, Vol. 12, No. 12, Dec., 2005. Pg. 835-838.

  7. Sarah A. Hope, David B. Tay, Ian T. Meredith, James D. Cameron. Waveform Dispersion, Not Reflection May Be The Major Determinant Of Aortic Pressure Wave Morphology. AJP (American Journal of Physiology): Heart and Circulatory Physiology. 289(6):H2497-5022, Dec. 2005.

  8. D.B.H. Tay, N.G. Kingsbury, M. Palaniswami. Orthonormal Hilbert Pair of Wavelets with (Almost) Maximum Vanishing Moments. IEEE Signal Processing Letters, Vol. 13, No. 9, September, 2006, Pg 533-536.

  9. G. Deng, D.B.H. Tay, S. Marusic. A signal denoising algorithm based on overcomplete wavelet representations and Gaussian models. Signal Processing, Vol. 85, No. 6, May, 2007.

  10. D.B.H. Tay. Daubechies Wavelets as Approximate Hilbert-Pairs? IEEE Signal Processing Letters, Vol. 15, 2008, Pg. 57-60.

  11. D.B.H. Tay. Hilbert Pair of Orthogonal Wavelet Bases: Revisiting the Condition IEEE Transactions on Signal Processing, to appear 2007.

  12. D.B.H. Tay. ETHFB: A New Class of Even-Length Biorthogonal Wavelet Filters for Hilbert Pair Design. IEEE Transactions on Circuits and Systems, Part-I,  to appear 2007. 

CONFERENCE:
  1. D.B.H. Tay. Transforming 1-D Even-Length Filterbanks into 2-D Filterbanks. {\bf Invited paper in Special Session on Multidimensional Circuits, Systems and Signal Processing}, Proceedings of IEEE International Symposium of Circuits and Systems 2003, Bangkok, Thailand.S. Marusic,
  2. D. B. H. Tay, G. Deng. A Parametric Family of Wavelet Filters for Diversity in Watermarking Application. Proceedings of IEEE International Conference on Acoustics, Speech and Signal Processing 2003, Hong Kong, PRC.
  3.  D.B.H. Tay and M. Palaniswami. Design of Approximate Hilbert Transform Pair of Wavelets with Exact Symmetry. Proceedings of IEEE International Conference on Acoustics, Speech and Signal Processing 2004, Montreal, Canada.
  4. D.B.H. Tay and M. Palaniswami. Hilbert Pair of Wavelets via the Matching Design Technique. Proceedings of IEEE International Symposium of Circuits and Systems 2005, Kobe, Japan.
  5. D.B.H. Tay. On the Regularity of Orthonormal Wavelets Designed via the Zero-Pinning Technique. Proceedings of IEEE International Symposium of Circuits and Systems 2006, Kos, Greece.
  6. D.B.H. Tay. ETHFB: A New Class of Even-Length Wavelet Filters for Hilbert Pair Design. Proceedings of IEEE International Symposium of Circuits and Systems 2006, Kos, Greece.
  7. D.B.H. Tay. Least Squares Design of Orthonormal Wavelets via the Zero-Pinning Technique. Proceedings of IEEE International Conference on Acoustics, Speech and Signal Processing 2006, Toulouse, France.
  8. D.B.H. Tay. Designing Hilbert-Pair of Wavelets: Recent Progress and Future Trends ({\bf Invited paper}), Proceedings of International Conference on Information, Communications and Signal Processing (ICICS 2007), Singapore, December 2007.