On the Largest Convexity Number of Co-Finite Sets in the Plane

Abstract

The convexity number of a set X ⊂ R2 is the minimum number of convex subsets required to cover it. We study the following question: what is the largest possible convexity number f(n) of R2 S, where S is a set of n points in general position in the plane? We prove that for all n ≥ 4, n+52 ≤ f(n) ≤ 7n+4411. We also show that for every n ≥ 4, if the points of S are in convex position then the convexity number of R2 S is n+52. This solves a problem of Lawrence and Morris [Finite sets as complements of finite unions of convex sets, Disc. Comput. Geom. 42 (2009), 206-218].