Analytical design of 3-D wavelet filter banks using the multivariate Bernstein polynomial

This paper presents a new method for designing orthonormal wavelet filter banks using the Remez exchange algorithm. It is well known that orthonormal wavelet bases can be generated by paraunitary filter banks. Thus, synthesis of orthonormal wavelet bases can be reduced to the design of paraunitary f

In this paper, Bernstein polynomials have been used to derive an explicit formula for the coefficients of linear phase FIR notch filters which are maximally flat at "0 and . The approach is relatively simple and enables us to design the filter for a specific notch frequency and bandwidth.

In this paper, a method for the design of 2-D analog and recursive digitaljlters is presented. Starting from a structure in the analog domain, suitable even or odd parts of twovariable Hurwitz polynomials are generated. This enables 2-variable very strictly Hurwitz polynomials (VSHP) to be obtained,