Balanced Sperner families via the topological Tverberg theorem
Abstract
For every prime power r 2, we show that any Sperner family F⊂eq 2[n] with | F| (r-1)n+1 contains r pairwise disjoint nonempty subfamilies whose unions are all equal and whose intersections are all equal. For r=2, this confirms a conjecture of Hegedüs, with the sharp threshold n+1. In this purely combinatorial problem, our proof combines a multilinear polynomial method, a continuity argument, and the topological Tverberg theorem.
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