Non-uniform skew versions of Bollob\'as' Theorem
Abstract
Let A1, … ,Am and B1, … ,Bm be subsets of [n] and let t be a non-negative integer with the following property: |Ai Bi|≤ t for each i and |Ai Bj|>t whenever i< j. Then m≤ 2n-t. Our proof uses Lov\'asz' tensor product method. We prove the following skew version of Bollob\'as' Theorem. Let A1, … ,Am and B1, … ,Bm be finite sets of [n] satisfying the conditions Ai Bi = for each i and Ai Bj for each i< j. Then Σi=1m 1|Ai|+|Bi| |Ai|≤ n+1. Both upper bounds are sharp.
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