Authors: | Milićević, Luka | Title: | Sets in Almost General Position | Journal: | Combinatorics Probability and Computing | Volume: | 26 | Issue: | 5 | First page: | 720 | Last page: | 745 | Issue Date: | 1-Sep-2017 | Rank: | M22 | ISSN: | 0963-5483 | DOI: | 10.1017/S0963548317000098 | Abstract: | Erdå's asked the following question: Given n points in the plane in almost general position (no four collinear), how large a set can we guarantee to find that is in general position (no three collinear)? Füredi constructed a set of n points in almost general position with no more than o(n) points in general position. Cardinal, Tóth and Wood extended this result to R3, finding sets of n points with no five in a plane whose subsets with no four points in a plane have size o(n), and asked the question for higher dimensions: For given n, is it still true that the largest subset in general position we can guarantee to find has size o(n)? We answer their question for all d and derive improved bounds for certain dimensions. |
Publisher: | Cambridge University Press |
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