For classical polynomials orthogonal with respect to a positive measure supported on the real line, the moment matrix is Hankel and positive definite. The polynomials satisfy a three term recurrence relation. When the measure is supported on the complex unit circle, the moment matrix is positive definite and Toeplitz. They satisfy a coupled Szegö recurrence relation but also a three term recurrence relation. In this paper we study the generalization for formal polynomials orthogonal with respect to an arbitrary moment matrix and consider arbitrary Hankel and Toeplitz matrices as special cases. The relation with Padé approximation and with Krylov subspace iterative methods is also outlined.status: publishe
AbstractIt is well known that orthogonal polynomials on the real line satisfy a three-term recurrenc...
AbstractAfter proving that any Hankel matrix generated by moments of positive functions is condition...
AbstractMultiple orthogonality is considered in the realm of a Gauss–Borel factorization problem for...
Classically, formal orthogonal polynomials are studied with respect to a linear functional, which gi...
We give a framework for formal orthogonal polynomials with respect to an arbitrary moment matrix. Wh...
AbstractIt is shown how to construct matrix orthogonal polynomials on the real line provided we have...
AbstractWe consider polynomials orthogonal with respect to some measure on the real line. A basic pr...
Abstract. We present characterization theorems for orthogonal polynomials obtained from a given syst...
In this talk I shall discuss the relationship between orthogonal polynomials with respect to semi-c...
AbstractSzegő type polynomials with respect to a linear functional M for which the moments M[tn]=μ−n...
We give a survey of recent generalizations of orthogonal polynomials. That includes multidimensional...
We give a survey of recent generalizations for orthogonal polynomials that were recently obtained. I...
AbstractAn explicit representation of the elements of the inverses of certain patterned matrices inv...
AbstractWe present a computational procedure for generating formally orthogonal polynomials associat...
We obtain explicit interrelations between new Dyukarev-Stieltjes matrix parameters and orthogonal ma...
AbstractIt is well known that orthogonal polynomials on the real line satisfy a three-term recurrenc...
AbstractAfter proving that any Hankel matrix generated by moments of positive functions is condition...
AbstractMultiple orthogonality is considered in the realm of a Gauss–Borel factorization problem for...
Classically, formal orthogonal polynomials are studied with respect to a linear functional, which gi...
We give a framework for formal orthogonal polynomials with respect to an arbitrary moment matrix. Wh...
AbstractIt is shown how to construct matrix orthogonal polynomials on the real line provided we have...
AbstractWe consider polynomials orthogonal with respect to some measure on the real line. A basic pr...
Abstract. We present characterization theorems for orthogonal polynomials obtained from a given syst...
In this talk I shall discuss the relationship between orthogonal polynomials with respect to semi-c...
AbstractSzegő type polynomials with respect to a linear functional M for which the moments M[tn]=μ−n...
We give a survey of recent generalizations of orthogonal polynomials. That includes multidimensional...
We give a survey of recent generalizations for orthogonal polynomials that were recently obtained. I...
AbstractAn explicit representation of the elements of the inverses of certain patterned matrices inv...
AbstractWe present a computational procedure for generating formally orthogonal polynomials associat...
We obtain explicit interrelations between new Dyukarev-Stieltjes matrix parameters and orthogonal ma...
AbstractIt is well known that orthogonal polynomials on the real line satisfy a three-term recurrenc...
AbstractAfter proving that any Hankel matrix generated by moments of positive functions is condition...
AbstractMultiple orthogonality is considered in the realm of a Gauss–Borel factorization problem for...