# Schur analysis of matricial Hausdorff moment sequences

**Authors:** Bernd Fritzsche, Bernd Kirstein, Conrad M\"adler

arXiv: 1908.05115 · 2019-08-15

## TL;DR

This paper extends classical moment problem algorithms to the matrix case, providing a transformation that simplifies matricial Hausdorff moment sequences and linking them to canonical moments, with applications to matrix distributions.

## Contribution

It introduces a matrix-based Schur algorithm for the Hausdorff moment problem, generalizing classical scalar methods and connecting to matrix canonical moments.

## Key findings

- Transformation reduces sequence length by 1
- Links to matrix canonical moments
- Characterizes measures via matricial arcsine distribution

## Abstract

We develop the algebraic instance of an algorithmic approach to the matricial Hausdorff moment problem on a compact interval $[\alpha,\beta]$ of the real axis. Our considerations are along the lines of the classical Schur algorithm and the treatment of the Hamburger moment problem on the real axis by Nevanlinna. More precisely, a transformation of matrix sequences is constructed, which transforms Hausdorff moment sequences into Hausdorff moment sequences reduced by 1 in length. It is shown that this transformation corresponds essentially to the left shift of the associated sequences of canonical moments. As an application, we show that a matricial version of the arcsine distribution can be used to characterize a certain centrality property of non-negative Hermitian measures on $[\alpha,\beta]$.

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Source: https://tomesphere.com/paper/1908.05115