On nontrivial cross-2-intersecting families

Abstract

Two families \(A⊂eq[n]k\) and \(B⊂eq[n]\) are said to be nontrivial cross-\(t\)-intersecting if \(|A B| ≥ t\) for all \(A ∈ A\) and \(B ∈ B\), and |A∈ A BA|<t. In this paper, we determine the upper bound on \(|A||B|\) of two nontrivial cross-\(2\)-intersecting families \(A⊂eq[n]k\) and \(B⊂eq[n]\) for any positive integers n,k, with \(k≥ ≥ 3\) and \(n ≥ 3(k-1)\). Moreover, we characterize the extremal families attaining this bound. This settles the last unsolved case of a recent result by He, Li, Wu and Zhang (J. Combin. Theory Ser. A, 217 (2026) 106095).

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