The overflow in the Katona Theorem
Abstract
Let n>2r>0 be integers. We consider families F of subsets of an n-element set, in which the union of any two members has size at most 2r. One of our results states that for n≥ 6r the number of members of size exceeding r in F is at most n-2r-1. Another result shows that for n>3.5r the number of sets of size at least r is at most nr. Both bounds are best possible and the latter sharpens the classical Katona Theorem. Similar results are proved for the odd case of the Katona Theorem as well.
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