A monic Jacobi matrix is a tridiagonal matrix which contains the parameters of the three-term recurrence relation satisfied by the sequence of monic polynomials orthogonal with respect to a measure. The basic Christoffel transformation with shift transforms the monic Jacobi matrix associated with a measure d into the monic Jacobi matrix associated with (x − ) d. This transformation is known for its numerous applications to quantum mechanics, integrable systems, and other areas of mathematics and mathematical physics. From a numerical point of view, the Christoffel transformation is essentially computed by performing one step of the LR algorithm with shift, but this algorithm is not stable. We propose a more accurate algorithm, estimate it...
An algorithm is developed for the generalized eigenvalue problem (A - λB)φ = O where A and B are rea...
AbstractThe real elliptic integrals of the first and second kind in Jacobi's normal form are compute...
Abstract. We perform a backward error analysis of the inexact shift-and-invert Arnoldi algorithm. We...
AbstractA monic Jacobi matrix is a tridiagonal matrix which contains the parameters of the three-ter...
39 pages, no figures.-- MSC2000 codes: 15A21, 15A23, 05A05, 05B25.-- Full-text paper available Open ...
A monic Jacobi matrix is a tridiagonal matrix which contains the parameters of the three-term recurr...
AbstractGiven a Jacobi matrix, the problem in question is to find the Jacobi matrix corresponding to...
AbstractWe show how to construct, from certain spectral data, a discrete inner product for which the...
AbstractA new technique for the computation of Jacobi matrices associated with measures possessing s...
Orthogonal polynomials are important throughout the fields of numerical analysis and numerical linea...
8 pages, no figures.-- MSC2000 codes: Primary 42C05; Secondary 15A23.MR#: MR2192525 (2006h:42044)Zbl...
AbstractLet L be a quasi-definite linear functional defined on the linear space of polynomials with ...
An iterative Jacobi-like algorithm is described for transforming a skew-symmetric complex matrix A o...
We perform a backward error analysis of the inexact shift-and-invert Arnoldi algorithm. We consider...
Abstract. In this contribution we are focused on some spectral transforma-tions of Hermitian linear ...
An algorithm is developed for the generalized eigenvalue problem (A - λB)φ = O where A and B are rea...
AbstractThe real elliptic integrals of the first and second kind in Jacobi's normal form are compute...
Abstract. We perform a backward error analysis of the inexact shift-and-invert Arnoldi algorithm. We...
AbstractA monic Jacobi matrix is a tridiagonal matrix which contains the parameters of the three-ter...
39 pages, no figures.-- MSC2000 codes: 15A21, 15A23, 05A05, 05B25.-- Full-text paper available Open ...
A monic Jacobi matrix is a tridiagonal matrix which contains the parameters of the three-term recurr...
AbstractGiven a Jacobi matrix, the problem in question is to find the Jacobi matrix corresponding to...
AbstractWe show how to construct, from certain spectral data, a discrete inner product for which the...
AbstractA new technique for the computation of Jacobi matrices associated with measures possessing s...
Orthogonal polynomials are important throughout the fields of numerical analysis and numerical linea...
8 pages, no figures.-- MSC2000 codes: Primary 42C05; Secondary 15A23.MR#: MR2192525 (2006h:42044)Zbl...
AbstractLet L be a quasi-definite linear functional defined on the linear space of polynomials with ...
An iterative Jacobi-like algorithm is described for transforming a skew-symmetric complex matrix A o...
We perform a backward error analysis of the inexact shift-and-invert Arnoldi algorithm. We consider...
Abstract. In this contribution we are focused on some spectral transforma-tions of Hermitian linear ...
An algorithm is developed for the generalized eigenvalue problem (A - λB)φ = O where A and B are rea...
AbstractThe real elliptic integrals of the first and second kind in Jacobi's normal form are compute...
Abstract. We perform a backward error analysis of the inexact shift-and-invert Arnoldi algorithm. We...