Let $S \subset \mathbb{R}^{2}$ such that no $3$ points in $S$ are collinear and $|S| = \infty$. Show that there is a $T \subset S$, $|T| = \infty$ such that no point in $T$ is a convex combination of other points in $T$.
2026-04-13 16:18:59.1776097139
Subset of Plane with specific property
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