On three measures of non-convexity release_mc2imsa76rhhvdehp2og2nloue

by Josef Cibulka, Miroslav Korbelář, Jan Kynčl, Viola Mészáros, Rudolf Stolař, Pavel Valtr

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2014  

Abstract

The invisibility graph I(X) of a set X ⊆R^d is a (possibly infinite) graph whose vertices are the points of X and two vertices are connected by an edge if and only if the straight-line segment connecting the two corresponding points is not fully contained in X. We consider the following three parameters of a set X: the clique number ω(I(X)), the chromatic number χ(I(X)) and the convexity number γ(X), which is the minimum number of convex subsets of X that cover X. We settle a conjecture of Matoušek and Valtr claiming that for every planar set X, γ(X) can be bounded in terms of χ(I(X)). As a part of the proof we show that a disc with n one-point holes near its boundary has χ(I(X)) >(n) but ω(I(X))=3. We also find sets X in R^5 with χ(X)=2, but γ(X) arbitrarily large.
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Date   2014-10-01
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arXiv  1410.0407v1
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