The problem of furnishing an orthogonal basis of eigenvectors for the discrete Fourier transform (DFT) is fundamental to signal processing. Recent developments in the area of discrete fractional Fourier analysis also rely upon the ability to furnish a basis of eigenvectors for the DFT or its centralized version. However, none of the existing approaches are able to furnish a commuting matrix where both the eigenvalue spectrum and the eigenvectors are a close match to corresponding properties of the continuous differential Gauss-Hermite operator. Furthermore, any linear combination of commuting matrices produced by existing approaches also commutes with the DFT, thereby bringing up the question of uniqueness. In this paper, inspired by concep...
As an extension of conventional Fourier transform and a time-frequency signal analysis tool, the fra...
A unified theory of orthogonal polynomials of a discrete variable is presented through the eigenvalu...
本研究提出一新穎近似三行對角交換矩陣(Nearly Tridiagonal Commuting Matrices), 其埃根向量更能逼近類比赫曼 高斯函數(Hermite-Gaussian Funct...
The problem of furnishing an orthogonal basis of eigenvectors for the discrete Fourier transform (D...
A generating matrix is a matrix such that, when multiplied by an eigenvector of a discrete transform...
A new version is proposed for the Gram-Schmidt algorithm, the orthogonal procrustes algorithm and th...
We propose and consolidate a definition of the discrete fractional Fourier transform that generalize...
AbstractThe discrete Fourier transform (DFT) is an important operator which acts on the Hilbert spac...
We propose and consolidate a definition of the discrete fractional Fourier transform which generaliz...
Abstract—Discrete equivalents of Hermite–Gaussian functions play a critical role in the definition o...
We propose and consolidate a definition of the discrete fractional Fourier transform that generalize...
AbstractFollowing the approach developed by S. Gurevich and R. Hadani, an analytical formula of the ...
[[abstract]]In this paper, the eigenvalues and eigenvectors of the generalized discrete Fourier tran...
We exhibit a canonical basis Φ of eigenvectors for the dis-crete Fourier transform (DFT). The transi...
Certain solutions to Harper's equation are discrete analogues of (and approximations to) the Hermite...
As an extension of conventional Fourier transform and a time-frequency signal analysis tool, the fra...
A unified theory of orthogonal polynomials of a discrete variable is presented through the eigenvalu...
本研究提出一新穎近似三行對角交換矩陣(Nearly Tridiagonal Commuting Matrices), 其埃根向量更能逼近類比赫曼 高斯函數(Hermite-Gaussian Funct...
The problem of furnishing an orthogonal basis of eigenvectors for the discrete Fourier transform (D...
A generating matrix is a matrix such that, when multiplied by an eigenvector of a discrete transform...
A new version is proposed for the Gram-Schmidt algorithm, the orthogonal procrustes algorithm and th...
We propose and consolidate a definition of the discrete fractional Fourier transform that generalize...
AbstractThe discrete Fourier transform (DFT) is an important operator which acts on the Hilbert spac...
We propose and consolidate a definition of the discrete fractional Fourier transform which generaliz...
Abstract—Discrete equivalents of Hermite–Gaussian functions play a critical role in the definition o...
We propose and consolidate a definition of the discrete fractional Fourier transform that generalize...
AbstractFollowing the approach developed by S. Gurevich and R. Hadani, an analytical formula of the ...
[[abstract]]In this paper, the eigenvalues and eigenvectors of the generalized discrete Fourier tran...
We exhibit a canonical basis Φ of eigenvectors for the dis-crete Fourier transform (DFT). The transi...
Certain solutions to Harper's equation are discrete analogues of (and approximations to) the Hermite...
As an extension of conventional Fourier transform and a time-frequency signal analysis tool, the fra...
A unified theory of orthogonal polynomials of a discrete variable is presented through the eigenvalu...
本研究提出一新穎近似三行對角交換矩陣(Nearly Tridiagonal Commuting Matrices), 其埃根向量更能逼近類比赫曼 高斯函數(Hermite-Gaussian Funct...