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2020
Journal Article
Titel
Radon's construction and matrix relations generating syzygies
Abstract
Let Pn be the set of bivariate polynomials of degree not greater than n. A Pn-correct set of nodes is a set such that the Lagrange interpolation problem with respect to these nodes has a unique solution. A maximal line of a Pn-correct set is any line containing exactly n+ 1 nodes. Syzygy matrices can be used to find linear factors of the fundamental polynomials and detect maximal lines. We suggest to use matrix relations in order to generate syzygies, identify linear factors of fundamental polynomials and detect maximal lines. We interpret our results in the important case of GC sets trying to shed some light on the Gasca-Maeztu conjecture.