A new intersection condition in extremal set theory
Abstract
We call a family F (3,2,)-intersecting if |A B|+|B C|+|C A| ≥ for all A, B, C ∈ F. We try to look for the maximum size of such a family F in case when F ⊂ [n] k or F ⊂ 2[n]. In the uniform case we show that if F is (3,2,2)-intersecting, then F ≤ n+1 k-1+n k-2 and if F is (3,2,3)-intersecting, then |F| ≤ n k-1 + 2 n k-3 + 3 n-1 k-3. For the lower bound we construct a (3,2,)-intersecting family and we show that this bound is sharp when =2 or 3 and n is sufficiently large compared to k. In the non-uniform case we give an upper bound for a (3,2,n-x)-intersecting family, when n is sufficiently large compared to x.
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