ON A CONJECTURE IN BIVARIATE INTERPOLATION
DOI:
https://doi.org/10.46991/PYSU:A/2016.50.1.030Keywords:
polynomial interpolation, poised, independent nodes, algebraic curvesAbstract
Denote the space of all bivariate polynomials of total degree n$\leq n$ by $\Pi_n$. We are interested in n-poised sets of nodes with the property that the fundamental polynomial of each node is a product of linear factors. In 1981 M. Gasca and J. I.Maeztu conjectured that every such set contains necessarily $n+1$ collinear nodes. Up to now this had been confirmed for degrees $n \leq 5$. Here we bring a simple and short proof of the conjecture for $n = 4$.
Downloads
Published
2016-03-18
How to Cite
Toroyan, S. (2016). ON A CONJECTURE IN BIVARIATE INTERPOLATION. Proceedings of the YSU A: Physical and Mathematical Sciences, 50(1 (239), 30–34. https://doi.org/10.46991/PYSU:A/2016.50.1.030
Issue
Section
Mathematics
License
Copyright (c) 2016 Proceedings of the YSU
This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.
