AbstractMackens and Voss [8,9] presented two generalizations of a method of Cybenko and Van Loan [4] for computing the smallest eigenvalue of a symmetric, positive-definite Toeplitz matrix. Taking advantage of the symmetry or skew-symmetry of the corresponding eigenvector both methods are improved considerably
A projection method for computing the minimal eigenvalue of a symmetric and positive definite Toepli...
In a recent paper Melman [12] derived upper bounds for the smallest eigenvalue of a real symmetric T...
In this paper, we apply the preconditioned Lanczos (PL) method to compute the minimum eigenvalue of ...
In [8] and [9] W. Mackens and the present author presented two generalizations of a method of Cybenk...
AbstractA projection method for computing the minimal eigenvalue of a symmetric and positive definit...
AbstractIn a recent paper (Computation of the smallest even and odd eigenvalues of a symmetric posit...
Several methods for computing the smallest eigenvalue of asymmetric positive definite Toeplitz matri...
In this paper we suggest a hybrid method for computing the smallest eigenvalue of a symmetric and po...
Abstract: In this note we discuss a method of order 1 + 3 for computing the smallest eigenvalue λ1 o...
A novel method for computing the minimal eigenvalue of a symmetric positive definite Toeplitz matrix...
A method for computing the smallest eigenvalue of a symmetric positive definite Toeplitz matrix is ...
Recent progress in signal processing and estimation has generated considerable interest in the probl...
AbstractWe derive separate spectral functions for the even and odd spectra of a real symmetric Toepl...
Several methods for computing the smallest eigenvalues of a symmetric and positive definite Toeplitz...
A projection method for computing the minimal eigenvalue of a symmetric and positive definite Toepli...
A projection method for computing the minimal eigenvalue of a symmetric and positive definite Toepli...
In a recent paper Melman [12] derived upper bounds for the smallest eigenvalue of a real symmetric T...
In this paper, we apply the preconditioned Lanczos (PL) method to compute the minimum eigenvalue of ...
In [8] and [9] W. Mackens and the present author presented two generalizations of a method of Cybenk...
AbstractA projection method for computing the minimal eigenvalue of a symmetric and positive definit...
AbstractIn a recent paper (Computation of the smallest even and odd eigenvalues of a symmetric posit...
Several methods for computing the smallest eigenvalue of asymmetric positive definite Toeplitz matri...
In this paper we suggest a hybrid method for computing the smallest eigenvalue of a symmetric and po...
Abstract: In this note we discuss a method of order 1 + 3 for computing the smallest eigenvalue λ1 o...
A novel method for computing the minimal eigenvalue of a symmetric positive definite Toeplitz matrix...
A method for computing the smallest eigenvalue of a symmetric positive definite Toeplitz matrix is ...
Recent progress in signal processing and estimation has generated considerable interest in the probl...
AbstractWe derive separate spectral functions for the even and odd spectra of a real symmetric Toepl...
Several methods for computing the smallest eigenvalues of a symmetric and positive definite Toeplitz...
A projection method for computing the minimal eigenvalue of a symmetric and positive definite Toepli...
A projection method for computing the minimal eigenvalue of a symmetric and positive definite Toepli...
In a recent paper Melman [12] derived upper bounds for the smallest eigenvalue of a real symmetric T...
In this paper, we apply the preconditioned Lanczos (PL) method to compute the minimum eigenvalue of ...
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