Combinatorics of skew lines in P3 with an application to algebraic geometry

Abstract

This article introduces a previously unrecognized combinatorial structure underlying configurations of skew lines in P3, and reveals its deep and surprising connection to the algebro-geometric concept of geproci sets. Given any field K and a finite set L of 3 or more skew lines in P3K, we associate to it a group G L and a groupoid C L whose action on the union L∈ LL provides orbits which have a rich combinatorial structure. We characterize when G L is abelian and give partial results on its finiteness. The notion of collinearly complete subsets is introduced and shown to correspond exactly to unions of groupoid orbits. In the case where K is a finite field and L is a full spread in P3K (i.e., every point of P3K lies on a line in L), we prove that G L being abelian characterizes the classical spread given by the fibers of the Hopf fibration. Over any algebraically closed field, we establish that finite unions of C L-orbits are geproci sets - that is, finite sets whose general projections to a plane are complete intersections. Furthermore, we prove a converse: if K is algebraically closed and Z ⊂ P3K is a geproci set consisting of m points on each of s ≥ 3 skew lines L where the general projection of Z is a complete intersection of type (m, s), then Z is a finite union of orbits of C L. This work thus uncovers a profound combinatorial framework governing geproci sets, providing a new bridge between incidence combinatorics and algebraic geometry.