AbstractThe Leverrier algorithm as modified by Faddeev gives the characteristic equation of a matrix A, its inverse, and the eigenvector corresponding to a simple eigenvalue λ of A. These results are extended (1) to give a generalized inverse when A is not of full rank and (2) to examine the modification required when λ is a multiple eigenvalue
AbstractIn this paper we give two generalizations of the well-known power method for computing the d...
Dedicated to the memory ofProfessor H. Rutishauser Abstract. We consider the numerical calculation o...
AbstractA numerical algorithm for the inverse eigenvalue problem for symmetric matrices is developed...
The Leverrier algorithm as modified by Faddeev gives the characteristic equation of a matrix A, its ...
AbstractThe Leverrier algorithm as modified by Faddeev gives the characteristic equation of a matrix...
AbstractProperties of an eigenmatrix proposed by Faddeev and an extension thereof investigated by Go...
Faddeev's method of computing the eigenvalues and eigenvectors of a matrix is presented and complete...
Properties of an eigenmatrix proposed by Faddeev and an extension thereof investigated by Gower are ...
AbstractFaddeev's method of computing the eigenvalues and eigenvectors of a matrix is presented and ...
The problem of matrix eigenvalues is encountered in various fields of engineering endeavor. In this ...
The Leverrier–Faddeev algorithm is little-known but, in a modified form, is useful for deriving the ...
In this contribution we present an extension of the Leverrier-Faddeev algorithm for the simultaneous...
20 pages, no figures.-- MSC2000 codes: Primary 42C05; Secondary 33C45, 15A15.MR#: MR2122756 (2005i:4...
In this contribution we present an extension of the Leverrier-Faddeev algorithm for the simultaneous...
Based on analysis of the residues of the resolvent, we have proposed an efficient algorithm for calc...
AbstractIn this paper we give two generalizations of the well-known power method for computing the d...
Dedicated to the memory ofProfessor H. Rutishauser Abstract. We consider the numerical calculation o...
AbstractA numerical algorithm for the inverse eigenvalue problem for symmetric matrices is developed...
The Leverrier algorithm as modified by Faddeev gives the characteristic equation of a matrix A, its ...
AbstractThe Leverrier algorithm as modified by Faddeev gives the characteristic equation of a matrix...
AbstractProperties of an eigenmatrix proposed by Faddeev and an extension thereof investigated by Go...
Faddeev's method of computing the eigenvalues and eigenvectors of a matrix is presented and complete...
Properties of an eigenmatrix proposed by Faddeev and an extension thereof investigated by Gower are ...
AbstractFaddeev's method of computing the eigenvalues and eigenvectors of a matrix is presented and ...
The problem of matrix eigenvalues is encountered in various fields of engineering endeavor. In this ...
The Leverrier–Faddeev algorithm is little-known but, in a modified form, is useful for deriving the ...
In this contribution we present an extension of the Leverrier-Faddeev algorithm for the simultaneous...
20 pages, no figures.-- MSC2000 codes: Primary 42C05; Secondary 33C45, 15A15.MR#: MR2122756 (2005i:4...
In this contribution we present an extension of the Leverrier-Faddeev algorithm for the simultaneous...
Based on analysis of the residues of the resolvent, we have proposed an efficient algorithm for calc...
AbstractIn this paper we give two generalizations of the well-known power method for computing the d...
Dedicated to the memory ofProfessor H. Rutishauser Abstract. We consider the numerical calculation o...
AbstractA numerical algorithm for the inverse eigenvalue problem for symmetric matrices is developed...
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