Author(s)

Jalal Karam

Faculty of Science and General Studies Alfaisal University Riyadh Kingdom of Saudi Arabia.

In the last decade, Daubechies’ wavelets have been successfully used in many signal processing paradigms. The construction of these wavelets via two channel perfect reconstruction filter bank requires the identification of necessary conditions that the coefficients of the filters and the roots of binomial polynomials associated with them should exhibit. In this paper, orthogonal and Biorthogonal Daubechies families of wavelets are considered and their filters are derived. In particular, the Biorthogonal wavelets Bior3.5, Bior3.9 and Bior6.8 are examined and the zeros distribution of their polynomials associated filters are located. We also examine the locations of these zeros of the filters associated with the two orthogonal wavelets db6 and db8.

Orthogonal; Biorthogonal Wavelets; Binomial Polynomials

J. Karam, "On the Zeros of Daubechies Orthogonal and Biorthogonal Wavelets," Applied Mathematics, Vol. 3 No. 7, 2012, pp. 778-787. doi: 10.4236/am.2012.37116.