Career-best publications of David Tay

Citation source: Scopus (at February 2008)

  1. D.B.H. Tay and N.G. Kingsbury. Flexible Design of Multidimensional Perfect Reconstruction FIR 2-Band Filters using Transformations of Variables. IEEE Transactions on Image Processing, Vol. 2, No. 4, Pg. 466-480, October 1993. (Citations 52)
  2. D.B.H. Tay. Design of Filter Banks / Wavelets using TROV: A Survey. Digital Signal Processing: A Review Journal. Vol. 4, No. 7, October 1997. (Citations 6)
  3. D. B. H. Tay. Rationalizing the Coefficients of Popular Biorthogonal Wavelet Filters. IEEE Transactions on Circuits and Systems for Video Technology, Vol. 10, No. 6, September 2000. (Citations 16)
  4. Y. Zheng, D.B.H. Tay, L. Li. Signal extraction and power spectrum estimation using wavelet transform scale space filtering and Bayes shrinkage. Signal Processing, Vol. 80, No. 8, August 2000. (Citations 11)
  5.  D.B.H. Tay. Parametric Bernstein Polynomial for Least Squares Design of 3-D Wavelet Filter Banks. Special issue on Multidimensional Signals and Systems, IEEE Transactions on Circuits and Systems, Part-I, Vol. 49, No. 6, June 2002, Pg. 887-891. (Citations 4)
  6.  Sarah A. Hope, David B. Tay, Ian T. Meredith, James D. Cameron. Comparison of generalized and gender-specific transfer functions for the derivation of aortic waveforms. American Journal Physiology: Heart and Circulatory Physiology, Vol. 283, Issue 3, H1150-H1156, September 2002. (Citations 33)
  7. 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. (Citations 52)
  8. 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. (Citations 28)
  9.  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. (Citations 6)
  10.  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. (Citations 4)