AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and contourlets, they are nonredundant and form orthonormal bases for L2(R2). Their implementation derives from a single nonseparable filter bank structure with nonuniform sampling. We give several examples of frequency partitioning, including constructions based on separable multiresolution analyses. We show how to obtain orthonormal bases of wavelets with fast decay and compactly supported, biorthogonal wavelet bases. Some aliasing phenomena that can occur in these constructions are discussed
In the presentation, I first compare the construction of orthonormal bases of wavelets from a multir...
AbstractContinuing the lines developed in Han (2010) [20], in this paper we study nonhomogeneous wav...
We present a generalization of the Daubechies wavelet fam-ily. The context is that of a non-stationa...
AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and c...
Journal PaperThis paper constructs K-regular M-band orthonormal wavelet bases. K-regularity of the w...
Orthonormal bases of wavelets and wavelet packets yield linear, non-redundant time-scale and time-fr...
This paper presents an algebraic approach to construct M-band orthonormal wavelet bases with perfect...
We first show that by combining monodimensional filter banks one can obtain nonseparable filter bank...
International audienceWe address the issue of constructing directional wavelet bases. After consider...
Abstract—In this paper, we introduced a class of directional filter banks (DFBs) having the previous...
Wavelet transforms provide a new technique for time-scale analysis of non-stationary signals. Wavele...
This paper presents an algebraic approach to construct M-band orthogonal wavelet bases. A system of ...
We build orthonormal and biorthogonal wavelet bases of L2(R2) with dilation matrices of determinant ...
The characterization of orthonormal bases of wavelets by means of convergent series involving only ...
Orthonormal bases of compactly supported wavelet bases correspond to subband coding schemes with exa...
In the presentation, I first compare the construction of orthonormal bases of wavelets from a multir...
AbstractContinuing the lines developed in Han (2010) [20], in this paper we study nonhomogeneous wav...
We present a generalization of the Daubechies wavelet fam-ily. The context is that of a non-stationa...
AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and c...
Journal PaperThis paper constructs K-regular M-band orthonormal wavelet bases. K-regularity of the w...
Orthonormal bases of wavelets and wavelet packets yield linear, non-redundant time-scale and time-fr...
This paper presents an algebraic approach to construct M-band orthonormal wavelet bases with perfect...
We first show that by combining monodimensional filter banks one can obtain nonseparable filter bank...
International audienceWe address the issue of constructing directional wavelet bases. After consider...
Abstract—In this paper, we introduced a class of directional filter banks (DFBs) having the previous...
Wavelet transforms provide a new technique for time-scale analysis of non-stationary signals. Wavele...
This paper presents an algebraic approach to construct M-band orthogonal wavelet bases. A system of ...
We build orthonormal and biorthogonal wavelet bases of L2(R2) with dilation matrices of determinant ...
The characterization of orthonormal bases of wavelets by means of convergent series involving only ...
Orthonormal bases of compactly supported wavelet bases correspond to subband coding schemes with exa...
In the presentation, I first compare the construction of orthonormal bases of wavelets from a multir...
AbstractContinuing the lines developed in Han (2010) [20], in this paper we study nonhomogeneous wav...
We present a generalization of the Daubechies wavelet fam-ily. The context is that of a non-stationa...