We first show that by combining monodimensional filter banks one can obtain nonseparable filter banks. We then give necessary conditions for these filter banks to generate orthonormal and regular wavelets. Finally, we establish that some of these filter banks lead to arbitrarily smooth, nonseparable, orthonormal, compactly supported wavelet bases.ou
In this paper we show some construction of nonseparable compactly supported bivariate wavelets. We d...
We present a scheme that will lever orthonormal or biorthogonal wavelets to a new system of biorthog...
Orthonormal bases of wavelets and wavelet packets yield linear, non-redundant time-scale and time-fr...
AbstractWe first show that by combining monodimensional filter banks one can obtain nonseparable fil...
By means of simple computations, we construct new classes of non separable QMF's. Some of these QMF'...
Orthonormal bases of compactly supported wavelet bases correspond to subband coding schemes with exa...
We build orthonormal and biorthogonal wavelet bases of L2(R2) with dilation matrices of determinant ...
In this paper, a new method of constructing symmetric (antisymmetric) scaling and wavelet filters is...
Journal PaperThis paper constructs K-regular M-band orthonormal wavelet bases. K-regularity of the w...
AbstractIn this paper, we study a method for the construction of orthonormal wavelet bases with dila...
AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and c...
Abstract. We present a method for the construction of nonsepa-rable and compactly supported orthogon...
A general method for constructing wavelet-like bases in a Hilbert space H starting from any orthonor...
AbstractContinuing the lines developed in Han (2010) [20], in this paper we study nonhomogeneous wav...
This dissertation investigates the construction of nonseparable multidimensional wavelets using mult...
In this paper we show some construction of nonseparable compactly supported bivariate wavelets. We d...
We present a scheme that will lever orthonormal or biorthogonal wavelets to a new system of biorthog...
Orthonormal bases of wavelets and wavelet packets yield linear, non-redundant time-scale and time-fr...
AbstractWe first show that by combining monodimensional filter banks one can obtain nonseparable fil...
By means of simple computations, we construct new classes of non separable QMF's. Some of these QMF'...
Orthonormal bases of compactly supported wavelet bases correspond to subband coding schemes with exa...
We build orthonormal and biorthogonal wavelet bases of L2(R2) with dilation matrices of determinant ...
In this paper, a new method of constructing symmetric (antisymmetric) scaling and wavelet filters is...
Journal PaperThis paper constructs K-regular M-band orthonormal wavelet bases. K-regularity of the w...
AbstractIn this paper, we study a method for the construction of orthonormal wavelet bases with dila...
AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and c...
Abstract. We present a method for the construction of nonsepa-rable and compactly supported orthogon...
A general method for constructing wavelet-like bases in a Hilbert space H starting from any orthonor...
AbstractContinuing the lines developed in Han (2010) [20], in this paper we study nonhomogeneous wav...
This dissertation investigates the construction of nonseparable multidimensional wavelets using mult...
In this paper we show some construction of nonseparable compactly supported bivariate wavelets. We d...
We present a scheme that will lever orthonormal or biorthogonal wavelets to a new system of biorthog...
Orthonormal bases of wavelets and wavelet packets yield linear, non-redundant time-scale and time-fr...