A product version of the Hilton-Milner Theorem II
Abstract
Two families F,G of k-subsets of \1,2,…,n\ are called non-trivial cross-intersecting if F G≠ for all F∈ F, G∈ G and \F F∈ F\== \G G∈G\. In this note, we establish the product version of the Hilton-Milner Theorem for k≥ 8 in the full range. That is, if F,G⊂ [n]k are non-trivial cross-intersecting, n≥ 2k+1 and k≥ 8, then \[ |F||G|≤ (n-1k-1- n-k-1k-1 +1)2. \]
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