Abstract
An interior point of a finite planar point set is a point of the set that is not on the boundary of the convex hull of the set. For any integer k ≥ 1, let h(k) be the smallest integer such that every point set in the plane, no three collinear, with at least h(k) interior points, has a subset with k or k + 2 interior points of P. We prove that h(3) = 8.
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