The sandglass conjecture beyond cancellative pairs
Abstract
The sandglass conjecture, posed by Simonyi, states that if a pair (A, B) of families of subsets of [n] is recovering then |A| |B| ≤ 2n. We improve the best known upper bound to |A| |B| ≤ 2.2543n. To do this we overcome a significant barrier by exponentially separating the upper bounds on recovering pairs from cancellative pairs, a related notion.
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