ON $n$-NODE LINES IN $GC_n$ SETS

Authors

  • Gagik K. Vardanyan Chair of Differential Equations, YSU, Armenia

DOI:

https://doi.org/10.46991/PYSU:A/2021.55.1.044

Keywords:

polynomial interpolation, Gasca--Maeztu conjecture, $n$-poised set, $GC_n$ set, maximal line, $n$-node line

Abstract

An $n$-poised node set $\mathcal X$ in the plane is called $GC_n$ set, if the fundamental polynomial of each node is a product of linear factors. A line is called $k$-node line, if it passes through exactly $k$-nodes of $\mathcal X.$ At most $n+1$ nodes can be collinear in $\Xset$ and an $(n+1)$-node line is called maximal line. The well-known conjecture of M. Gasca and J.I. Maeztu states that every $GC_n$ set has a maximal line. Until now the conjecture has been proved only for the cases $n \le 5.$ In this paper we prove some results concerning $n$-node lines, assuming that the Gasca--Maeztu conjecture is true.

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Published

2021-05-21

How to Cite

Vardanyan, G. K. (2021). ON $n$-NODE LINES IN $GC_n$ SETS. Proceedings of the YSU A: Physical and Mathematical Sciences, 55(1 (254), 44–55. https://doi.org/10.46991/PYSU:A/2021.55.1.044

Issue

Section

Mathematics