A result for hemi-bundled cross-intersecting families
Abstract
Two families F and G are called cross-intersecting if for every F∈ F and G∈ G, the intersection F G is non-empty. It is significant to determine the maximum sum of sizes of cross-intersecting families under the additional assumption that one of the two families is intersecting. Such a pair of families is said to be hemi-bundled. In particular, Frankl (2016) proved that for k ≥ 1, t 0 and n ≥ 2 k+t, if F ⊂eq[n]k+t and G ⊂eq[n]k are cross-intersecting families, in which F is non-empty and (t+1)-intersecting, then |F|+|G| ≤nk-n-k-tk+1. This bound can be attained when F consists of a single set. In this paper, we generalize this result under the constraint |F| ≥ r for every r≤ n-k-t+1. Moreover, we investigate the stability results of Katona's theorem for non-uniform families with the s-union property. Our result extends the stabilities established by Frankl (2017) and Li and Wu (2024). As applications, we revisit a recent result of Frankl and Wang (2024) as well as a result of Kupavskii (2018). Furthermore, we determine the extremal families in these two results.
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