Radon numbers grow linearly
Abstract
Define the k-th Radon number rk of a convexity space as the smallest number (if it exists) for which any set of rk points can be partitioned into k parts whose convex hulls intersect. Combining the recent abstract fractional Helly theorem of Holmsen and Lee with earlier methods of Bukh, we prove that rk grows linearly, i.e., rk c(r2)· k.
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