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The Heilbronn triangle problem asks for the placement of n points in a unit square that maximizes the smallest area of a triangle formed by any three of those points. In 1972, Schmidt considered a natural generalization of this problem. He asked for the placement of n points in a unit square that maximizes the smallest area of the convex hull formed by any four of those points. He showed a lower bound of (n^-3/2), which was improved to (n^-3/2n) by Leffman. A trivial upper bound of 3/n could be obtained, and Schmidt asked if this could be improved asymptotically. However, despite several efforts, no asymptotic improvement over the trivial upper bound was known for the last 50 years, and the problem started to get the tag of being notoriously hard. Szemer\'edi posed the question of whether one can, at least, improve the constant in this trivial upper bound. In this work, we answer this question by proving an upper bound of 2/n+o (1/n). We also extend our results to any convex hulls formed by k 4 points.
Gajjala et al. (Tue,) studied this question.
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