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A Planar 3-Convex Set is Indeed a Union of Six Convex Sets |
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| Authors: | Noa Nitzan Micha A. Perles |
| Affiliation: | 1. Department of Mathematics, Center for the Study of Rationality, The Hebrew University of Jerusalem, Jerusalem, Israel 2. Department of Mathematics, The Hebrew University of Jerusalem, Jerusalem, Israel |
| Abstract: | Suppose S is a planar set. Two points $a,b$ in S see each other via S if $[a,b]$ is included in S . F. Valentine proved in 1957 that if S is closed, and if for every three points of S, at least two see each other via S, then S is a union of three convex sets. The pentagonal star shows that the number three is the best possible. We drop the condition that S is closed and show that S is a union of (at most) six convex sets. The number six is best possible. |
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