AbstractMallat's decomposition and reconstruction algorithms are very important in the field of wavelet theory and its application to signal processing. Wavelet theory is based on L2(R) space and the classical mean square error is employed naturally in many relevant applications. In the recent years, it is understood that the L2 space is not always the best one for all applications. Therefore, wavelet theory and its approximation properties were also studied in L1(R) by many researchers. The orthogonality was also developed in L1 space in our previous work. In this paper, Based on our previous work on L1 orthogonality, two novel decomposition and reconstruction algorithms, called MAE and ETO algorithms, are discussed in detail. The exact re...
AbstractThe aim of this paper is to present decomposition and reconstruction algorithms for spline w...
This article contains a detailed description of the generalization of sequences of orthogonal wavele...
We present a MATLAB toolbox on multiresolution analysis based on the W-transform introduced by Kwong...
AbstractMallat's decomposition and reconstruction algorithms are very important in the field of wave...
The concept of a W-matrix is used to give an elementary interpretation of a biorthogonal wavelet dec...
A comparative study of different methods of reconstruction of wavelet coefficients is presented. The...
AbstractIn this paper, we improve the algorithms for the construction of the wavelet-like basis matr...
We study the problem of choosing the optimal wavelet basis with compact support for signal represent...
AbstractIn [1], Beylkin et al. introduced a wavelet-based algorithm that approximates integral or ma...
Wavelets provide a class of methods for localized signal decomposition. This is the first step in th...
A system of linear equations can be solved using a factorization method that produces a wavelet stru...
The work is devoted to the problem of solving large systems of linear algebraic equations with irreg...
This paper presents a matrix factorization method for implementing orthonormal M-band wavelet revers...
We study the properties of computational methods for the Wavelet Transform and its Inverse from the ...
Good signal representation and the corresponding signal processing algorithms lie at the heart of th...
AbstractThe aim of this paper is to present decomposition and reconstruction algorithms for spline w...
This article contains a detailed description of the generalization of sequences of orthogonal wavele...
We present a MATLAB toolbox on multiresolution analysis based on the W-transform introduced by Kwong...
AbstractMallat's decomposition and reconstruction algorithms are very important in the field of wave...
The concept of a W-matrix is used to give an elementary interpretation of a biorthogonal wavelet dec...
A comparative study of different methods of reconstruction of wavelet coefficients is presented. The...
AbstractIn this paper, we improve the algorithms for the construction of the wavelet-like basis matr...
We study the problem of choosing the optimal wavelet basis with compact support for signal represent...
AbstractIn [1], Beylkin et al. introduced a wavelet-based algorithm that approximates integral or ma...
Wavelets provide a class of methods for localized signal decomposition. This is the first step in th...
A system of linear equations can be solved using a factorization method that produces a wavelet stru...
The work is devoted to the problem of solving large systems of linear algebraic equations with irreg...
This paper presents a matrix factorization method for implementing orthonormal M-band wavelet revers...
We study the properties of computational methods for the Wavelet Transform and its Inverse from the ...
Good signal representation and the corresponding signal processing algorithms lie at the heart of th...
AbstractThe aim of this paper is to present decomposition and reconstruction algorithms for spline w...
This article contains a detailed description of the generalization of sequences of orthogonal wavele...
We present a MATLAB toolbox on multiresolution analysis based on the W-transform introduced by Kwong...