AbstractContinuing the lines developed in Han (2010) [20], in this paper we study nonhomogeneous wavelet systems in high dimensions. It is of interest to study a wavelet system with a minimum number of generators. It has been shown in Dai et al. (1997) [9] that for any d×d real-valued expansive matrix M, a homogeneous orthonormal M-wavelet basis can be generated by a single wavelet function. On the other hand, it has been demonstrated in Han (2010) [20] that nonhomogeneous wavelet systems, though much less studied in the literature, play a fundamental role in wavelet analysis and naturally link many aspects of wavelet analysis together. In this paper, we are interested in nonhomogeneous wavelet systems in high dimensions with a minimum numb...
Given integers b and d, with d>1 and |b|>1, we construct even nonseparable compactly supported refin...
AbstractA multiresolution analysis was defined by Gabardo and Nashed for which the translation set i...
AbstractIn this paper, we discuss the characterization of frame wavelet sets. We extend some results...
AbstractContinuing the lines developed in Han (2010) [20], in this paper we study nonhomogeneous wav...
AbstractIn this paper, we study nonhomogeneous wavelet systems which have close relations to the fas...
AbstractA characterization of multivariate dual wavelet tight frames for any general dilation matrix...
Wavelet frames have gained considerable popularity during the past decade, primarily due to their su...
AbstractAffine systems are reproducing systems of the formAC={DcTkψℓ:1⩽ℓ⩽L,k∈Zn,c∈C}, which arise by...
AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and c...
AbstractThe paper develops construction procedures for tight framelets and wavelets using matrix mas...
International audienceWe address the issue of constructing directional wavelet bases. After consider...
AbstractWavelet frames with matrix dilation are studied. We found a necessary condition and a suffic...
AbstractIt is shown that for any expansive, integer valued 2×2 matrix, there exists a (multi-)wavele...
AbstractWe first show that by combining monodimensional filter banks one can obtain nonseparable fil...
Wavelet packets provide an algorithm with many applications in signal processing together with a lar...
Given integers b and d, with d>1 and |b|>1, we construct even nonseparable compactly supported refin...
AbstractA multiresolution analysis was defined by Gabardo and Nashed for which the translation set i...
AbstractIn this paper, we discuss the characterization of frame wavelet sets. We extend some results...
AbstractContinuing the lines developed in Han (2010) [20], in this paper we study nonhomogeneous wav...
AbstractIn this paper, we study nonhomogeneous wavelet systems which have close relations to the fas...
AbstractA characterization of multivariate dual wavelet tight frames for any general dilation matrix...
Wavelet frames have gained considerable popularity during the past decade, primarily due to their su...
AbstractAffine systems are reproducing systems of the formAC={DcTkψℓ:1⩽ℓ⩽L,k∈Zn,c∈C}, which arise by...
AbstractThis article introduces families of nonadaptive directional wavelets. Unlike curvelets and c...
AbstractThe paper develops construction procedures for tight framelets and wavelets using matrix mas...
International audienceWe address the issue of constructing directional wavelet bases. After consider...
AbstractWavelet frames with matrix dilation are studied. We found a necessary condition and a suffic...
AbstractIt is shown that for any expansive, integer valued 2×2 matrix, there exists a (multi-)wavele...
AbstractWe first show that by combining monodimensional filter banks one can obtain nonseparable fil...
Wavelet packets provide an algorithm with many applications in signal processing together with a lar...
Given integers b and d, with d>1 and |b|>1, we construct even nonseparable compactly supported refin...
AbstractA multiresolution analysis was defined by Gabardo and Nashed for which the translation set i...
AbstractIn this paper, we discuss the characterization of frame wavelet sets. We extend some results...