On a new property of n-poised and GCn sets

Abstract

In this paper we consider n-poised planar node sets, as well as more special ones, called GCn-sets. For these sets all n-fundamental polynomials are products of n linear factors as it always takes place in the univariate case. A line is called k-node line for a node set X if it passes through exactly k nodes. An (n+1)-node line is called maximal line. In 1982 M. Gasca and J. I. Maeztu conjectured that every GCn-set possesses necessarily a maximal line. Till now the conjecture is confirmed to be true for n 5. It is well-known that any maximal line M of X is used by each node in X M, meaning that it is a factor of the fundamental polynomial of each node. In this paper we prove, in particular, that if the Gasca-Maeztu conjecture is true then any n-node line of GCn-set X is used either by exactly n2 nodes or by exactly n-12 nodes. We prove also similar statements concerning n-node or (n-1)-node lines in more general n-poised sets. This is a new phenomenon in n-poised and GCn sets. At the end we present a conjecture concerning any k-node line.