Big line or big convex polygon

Abstract

Let ES(n) be the minimum N such that every N-element point set in the plane contains either collinear members or n points in convex position. We prove that there is a constant C>0 such that, for each , n 3, (3 - 1) · 2n-5 < ES(n) < 2 · 2n+ Cn n. A similar extension of the well-known Erd os--Szekeres cups-caps theorem is also proved.

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