Finite unions of convex sets are a central object of study in discrete and computational geometry. In this paper we initiate a systematic study of complements of such unions - i. e. , sets of the form S = ℝᵈ ⧵ (∪₈=₁ⁿ Kᵢ), where Kᵢ are convex sets. In the first part of the paper we study isolated points in S, whose number is related to the Betti numbers of ∪₈=₁ⁿ Kᵢ and to its non-convexity properties. We obtain upper bounds on the number of such points, which are sharp for n = 3 and significantly improve previous bounds of Lawrence and Morris (2009) for all n ≪ 2ᵈ/d. In the second part of the paper we study coverings of S by well-behaved sets. We show that S can be covered by at most g (d, n) flats of different dimensions, in such a way that each x ∈ S is covered by a flat whose dimension equals the "local dimension" of S in the neighborhood of x. Furthermore, we determine the structure of a minimum cover that satisfies this property. Then, we study quantitative aspects of this minimum cover and obtain sharp upper bounds on its size in various settings.
Keller et al. (Thu,) studied this question.
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