AbstractWe show how to construct, from certain spectral data, a discrete inner product for which the associated sequence of monic orthogonal polynomials coincides with the sequence of appropriately normalized characteristic polynomials of the left principal submatrices of the Jacobi matrix. The generation of these orthogonal polynomials via their three-term recurrence relation, as popularized by Forsythe, then provides a stable means of computing the entries of the Jacobi matrix. Our construction provides, incidentally, very simple proofs of known results concerning the existence and uniqueness of a Jacobi matrix satisfying given spectral data and its continuous dependence on those data
AbstractA proof is given for the existence and uniqueness of a correspondence between two pairs of s...
AbstractIn this paper, Jacobi matrix polynomials are introduced, starting from the hypergeometric ma...
A monic Jacobi matrix is a tridiagonal matrix which contains the parameters of the three-term recurr...
We show how to construct, from certain spectral data, a discrete inner product for which the associa...
AbstractWe describe an algorithm, based on a continued fraction expansion, to reconstruct a periodic...
We show that a unique Jacobi matrix can be reconstructed from two types of mixed data: 1. its two ei...
AbstractOrthogonal polynomials on the real line always satisfy a three-term recurrence relation. The...
AbstractIf p0,…,pn is an orthogonal sequence, with pj a monic polynomial of exact degree j, all j, t...
AbstractUsing the so-called Lanczos procedure of orthogonalization a method is developed to calculat...
AbstractComplex Jacobi matrices play an important role in the study of asymptotics and zero distribu...
Orthogonal polynomials are important throughout the fields of numerical analysis and numerical linea...
We revisit the ladder operators for orthogonal polynomials and re-interpret two supplementary condit...
We revisit the ladder operators for orthogonal polynomials and re-interpret two supplementary condit...
Complex Jacobi matrices play an important role in the study of asymptotics and zero distribution of...
This paper deals with the analysis of the orthogonality of a monic polynomial sequence defined as a ...
AbstractA proof is given for the existence and uniqueness of a correspondence between two pairs of s...
AbstractIn this paper, Jacobi matrix polynomials are introduced, starting from the hypergeometric ma...
A monic Jacobi matrix is a tridiagonal matrix which contains the parameters of the three-term recurr...
We show how to construct, from certain spectral data, a discrete inner product for which the associa...
AbstractWe describe an algorithm, based on a continued fraction expansion, to reconstruct a periodic...
We show that a unique Jacobi matrix can be reconstructed from two types of mixed data: 1. its two ei...
AbstractOrthogonal polynomials on the real line always satisfy a three-term recurrence relation. The...
AbstractIf p0,…,pn is an orthogonal sequence, with pj a monic polynomial of exact degree j, all j, t...
AbstractUsing the so-called Lanczos procedure of orthogonalization a method is developed to calculat...
AbstractComplex Jacobi matrices play an important role in the study of asymptotics and zero distribu...
Orthogonal polynomials are important throughout the fields of numerical analysis and numerical linea...
We revisit the ladder operators for orthogonal polynomials and re-interpret two supplementary condit...
We revisit the ladder operators for orthogonal polynomials and re-interpret two supplementary condit...
Complex Jacobi matrices play an important role in the study of asymptotics and zero distribution of...
This paper deals with the analysis of the orthogonality of a monic polynomial sequence defined as a ...
AbstractA proof is given for the existence and uniqueness of a correspondence between two pairs of s...
AbstractIn this paper, Jacobi matrix polynomials are introduced, starting from the hypergeometric ma...
A monic Jacobi matrix is a tridiagonal matrix which contains the parameters of the three-term recurr...