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arxiv: 2202.04001 · v3 · pith:7X4H46EH · submitted 2022-02-08 · math.CO · math.NT

Improved bounds for the dimension of divisibility

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keywords dimensionbounddivisibilityboundsorderaboveasymptoticallyauthor
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The dimension of a partially-ordered set $P$ is the smallest integer $d$ such that one can embed $P$ into a product of $d$ linear orders. We prove that the dimension of the divisibility order on the interval $\{1, \dotsc, n\}$ is bounded above by $C(\log n)^2 (\log \log n)^{-2} \log \log \log n$ as $n$ goes to infinity. This improves a recent result by Lewis and the first author, who showed an upper bound of $C(\log n)^2 (\log \log n)^{-1}$ and a lower bound of $c(\log n)^2 (\log \log n)^{-2}$, asymptotically. To obtain these bounds, we provide a refinement of a bound of F\"uredi and Kahn and exploit a connection between the dimension of the divisibility order and the maximum size of $r$-cover-free families.

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