Bounded fractional intersecting families are linear in size
Abstract
Using the sunflower method, we show that if θ ∈ (0,1) Q and F is a O(n1/3)-bounded θ-intersecting family over [n], then F = O(n), and that if F is o(n1/3)-bounded, then F ≤ (32 + o(1))n. This partially solves a conjecture of Balachandran, Mathew and Mishra that any θ-intersecting family over [n] has size at most linear in n, in the regime where we have no very large sets.
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