The Exact Saturation Number for the Diamond
Abstract
What is the smallest size of a family of subsets of [n] such that it does not contain an induced copy of Q2 as a poset (known as the diamond), but adding a new set creates such a copy? It is easy to see that a maximal chain has this property, and thus the answer is at most n+1. Despite the simplicity of the diamond structure, the lower bound stagnated at n for quite some time, until recently the authors obtained a linear lower bound. In this paper, we fully solve this question showing that such a family must have size at least n+1.
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