On Combinatorial Properties of Points and Polynomial Curves

Abstract

Many combinatorial properties of a point set in the plane are determined by the set of possible partitions of the point set by a line. Their essential combinatorial properties are well captured by the axioms of oriented matroids. In fact, Goodman and Pollack (Journal of Combinatorial Theory, Series A, Volume 37, pp. 257-293, 1984) proved that the axioms of oriented matroids of rank 3 completely characterize the sets of possible partitions arising from a natural topological generalization of configurations of points and lines. In this paper, we introduce a new class of oriented matroids, called degree-k oriented matroids, which captures essential combinatorial properties of the possible partitions of point sets in the plane by the graphs of polynomial functions of degree k. We prove that the axiom of degree-k oriented matroids completely characterizes the sets of possible partitions arising from a natural topological generalization of configurations formed by points and the graphs of polynomial functions degree k. It turns out that the axiom of degree-k oriented matroids coincides with the axiom of (k+2)-signotopes, which was introduced by Felsner and Weil (Discrete Applied Mathematics, Volume 109, pp. 67-94, 2001) in a completely different context. Our result gives a two-dimensional geometric interpretation for (k+2)-signotopes and also for single element extensions of cyclic hyperplane arrangements in Rn-k-3.