On Bollob\'as-type theorems of d-tuples
Abstract
In 1965, Bollob\'as proved that for a Bollob\'as set-pair system \(Ai,Bi) i∈[m]\, the maximum value of Σi=1m|Ai|+|Bi|Ai-1 is 1. Heged\"us and Frankl recently extended the concept of Bollob\'as systems to d-tuples, conjecturing that for a Bollob\'as system of d-tuples, \(Ai(1),…,Ai(d)) i∈[m]\, the maximum value of Σi=1m|Ai(1)|+·s+|Ai(d)||Ai(1)|,…,|Ai(d)|-1 is also 1. This paper refutes this conjecture and establishes an upper bound for the sum. In the case d=3, the derived upper bound is asymptotically tight. Furthermore, we sharpen an inequality for skew Bollob\'as systems of d-tuples in Heged\"us and Frankl's paper. Finally, we determine the maximum size of a uniform skew Bollob\'as system of d-tuples on both sets and spaces.
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