On maximal curves of n-correct sets

Abstract

Suppose X is an n-correct set of nodes in the plane, that is, it admits a unisolvent interpolation with bivariate polynomials of total degree less than or equal to n. Then an algebraic curve q of degree k n can pass through at most d(n,k) nodes of , where d(n,k)=n+2 2-n+2-k 2. A curve q of degree k n is called maximal if it passes through exactly d(n,k) nodes of X. In particular, a maximal line is a line passing through d(n,1)=n+1 nodes of X. Maximal curves are an important tool for the study of n-correct sets. We present new properties of maximal curves, as well as extensions of known properties.