Title :
Two-dimensional orthogonal filter banks and wavelets with linear phase
Author :
Stanhill, David ; Zeevi, Yehoshua Y.
Author_Institution :
Dept. of Electr. Eng., Technion-Israel Inst. of Technol., Haifa, Israel
fDate :
1/1/1998 12:00:00 AM
Abstract :
Two-dimensional (2-D) compactly supported, orthogonal wavelets and filter banks having linear phase are presented. Two cases are discussed: wavelets with two-fold symmetry (centrosymmetric) and wavelets with four-fold symmetry that are symmetric (or anti-symmetric) about the vertical and horizontal axes. We show that imposing the requirement of linear phase in the case of order-factorable wavelets imposes a simple constraint on each of its polynomial order-1 factors. We thus obtain a simple and complete method of constructing orthogonal order-factorable wavelets with linear phase. This method is exemplified by design in the case of four-band separable sampling. An interesting result that is similar to the one well-known in the one-dimensional (1-D) case is obtained: orthogonal order-factorable wavelets cannot be both continuous and have four-fold symmetry
Keywords :
delay circuits; polynomial matrices; signal sampling; two-dimensional digital filters; wavelet transforms; anti-symmetric wavelets; centrosymmetric wavelets; design; four-band separable sampling; four-fold symmetry; linear phase; one-dimensional case; order-factorable wavelets; orthogonal order-factorable wavelets; orthogonal wavelets; polynomial order-1 factors; symmetric wavelets; two-dimensional orthogonal filter banks; two-fold symmetry; Channel bank filters; Continuous wavelet transforms; Filter bank; Humans; Nonlinear filters; Phase distortion; Polynomials; Sampling methods; Signal resolution; Two dimensional displays;
Journal_Title :
Signal Processing, IEEE Transactions on
