On an extremal problem for poset dimension
Abstract
Let f(n) be the largest integer such that every poset on n elements has a 2-dimensional subposet on f(n) elements. What is the asymptotics of f(n)? It is easy to see that f(n)≥slant n1/2. We improve the best known upper bound and show f(n)=O(n2/3). For higher dimensions, we show fd(n)=O(ndd+1), where fd(n) is the largest integer such that every poset on n elements has a d-dimensional subposet on fd(n) elements.
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