Existence thresholds and Ramsey properties of random posets
Abstract
Let P(n) denote the power set of [n], ordered by inclusion, and let P (n,p) denote the random poset obtained from P(n) by retaining each element from P (n) independently at random with probability p and discarding it otherwise. Given any fixed poset F we determine the threshold for the property that P(n,p) contains F as an induced subposet. We also asymptotically determine the number of copies of a fixed poset F in P(n). Finally, we obtain a number of results on the Ramsey properties of the random poset P(n,p).
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