DOIAbstract
We derive new formulas for harmonic, diffraction, elastic, and hydrodynamic potentials acting on anisotropic Gaussians and approximate wavelets. These formulas can be used to construct accurate cubature formulas for these potentials
We derive new formulas for harmonic, diffraction, elastic, and hydrodynamic potentials acting on anisotropic Gaussians and approximate wavelets. These formulas can be used to construct accurate cubature formulas for these potentials
Wavelets on closed surfaces in Euclidean space R3 are introduced starting from a scale discrete wave...
Abstract. It is shown how a continuous wavelet technique may be used to locate and characterize homo...
In this paper, harmonic wavelets, which are analytically defined and band limited, are studied, toge...
We derive new formulas for harmonic, diffraction, elastic, and hydrodynamic potentials acting on ani...
We derive new formulas for harmonic, diffraction, elastic, and hydrodynamic potentials acting on ani...
The paper discusses new cubature formulas for classical integral operators of mathematical physics b...
We propose fast cubature formulas for the elastic and hydrodynamic potentials based on the approxima...
We propose fast cubature formulas for the elastic and hydrodynamic potentials based on the approxima...
Some new approximation methods are described for harmonic functions corresponding to boundary values...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser “the ...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser “the ...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser “the ...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser “the ...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser "the p...
ABSTRACT. The paper can be referred to that direction in the wavelet theory, which was called by Kai...
Wavelets on closed surfaces in Euclidean space R3 are introduced starting from a scale discrete wave...
Abstract. It is shown how a continuous wavelet technique may be used to locate and characterize homo...
In this paper, harmonic wavelets, which are analytically defined and band limited, are studied, toge...
We derive new formulas for harmonic, diffraction, elastic, and hydrodynamic potentials acting on ani...
We derive new formulas for harmonic, diffraction, elastic, and hydrodynamic potentials acting on ani...
The paper discusses new cubature formulas for classical integral operators of mathematical physics b...
We propose fast cubature formulas for the elastic and hydrodynamic potentials based on the approxima...
We propose fast cubature formulas for the elastic and hydrodynamic potentials based on the approxima...
Some new approximation methods are described for harmonic functions corresponding to boundary values...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser “the ...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser “the ...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser “the ...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser “the ...
The paper can be referred to that direction in the wavelet theory, which was called by Kaiser "the p...
ABSTRACT. The paper can be referred to that direction in the wavelet theory, which was called by Kai...
Wavelets on closed surfaces in Euclidean space R3 are introduced starting from a scale discrete wave...
Abstract. It is shown how a continuous wavelet technique may be used to locate and characterize homo...
In this paper, harmonic wavelets, which are analytically defined and band limited, are studied, toge...
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