Generalized eigenvalue methods for Gaussian quadrature rules
Numerical Analysis
2021-02-08 v1 Algebraic Geometry
Abstract
A quadrature rule of a measure on the real line represents a convex combination of finitely many evaluations at points, called nodes, that agrees with integration against for all polynomials up to some fixed degree. In this paper, we present a bivariate polynomial whose roots parametrize the nodes of minimal quadrature rules for measures on the real line. We give two symmetric determinantal formulas for this polynomial, which translate the problem of finding the nodes to solving a generalized eigenvalue problem.
Cite
@article{arxiv.1805.12047,
title = {Generalized eigenvalue methods for Gaussian quadrature rules},
author = {Grigoriy Blekherman and Mario Kummer and Cordian Riener and Markus Schweighofer and Cynthia Vinzant},
journal= {arXiv preprint arXiv:1805.12047},
year = {2021}
}
Comments
13 pages, 2 figures