Colorful Helly-type Theorems for the Volume of Intersections of Convex Bodies
Abstract
We prove the following Helly-type result. Let C1,…,C3d be finite families of convex bodies in Rd. Assume that for any colorful selection of 2d sets, Cik∈ Cik for each 1≤ k≤ 2d with 1≤ i1<…<i2d≤ 3d, the intersection k=12d Cik is of volume at least 1. Then there is an 1≤ i ≤ 3d such that C∈ Ci C is of volume at least d-O(d2).
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