Let's say that a permutation on the numbers from 1 to n is k-universal if its subsequences of k items have all of the k! possible different patterns that they could have. For instance, 25314 is 3-universal: the six possible patterns 123, 132, 213, 231, 312, and 321 appear in it as 234, 253, 314, 231, 514, and 531 respectively. How short can a k-universal pattern be?
It's not hard to find upper and lower bounds within a constant factor of each other. In one direction, the sequence k, 2k, 3k, ... k−1, 2k−1, 3k−1, ..., k−2, 2k−2, 3k−2, ... etc of length k2 is universal. (This is the same tilted grid pattern that gives the lower bound in the Erdős–Szekeres theorem.) In the other direction, the length n of the universal permutation must be at least some constant times k2, in order for it to have at least k! different subsets of size k. But what is the constant?
A computer search found that there is no 4-universal permutation on 8 items (the best is 51862473 which has 23 out of the 24 possible patterns), but the 9-item permutation 162975384 is universal. So the sequence of lengths of the shortest k-universal patterns begins 1, 3, 5, 9, ... But although there are simple quadratically-growing sequences like ceiling((k^2+1)/2) that begin like this, it's not really long enough to identify this in OEIS and see whether it matches anything known.
It's not hard to find upper and lower bounds within a constant factor of each other. In one direction, the sequence k, 2k, 3k, ... k−1, 2k−1, 3k−1, ..., k−2, 2k−2, 3k−2, ... etc of length k2 is universal. (This is the same tilted grid pattern that gives the lower bound in the Erdős–Szekeres theorem.) In the other direction, the length n of the universal permutation must be at least some constant times k2, in order for it to have at least k! different subsets of size k. But what is the constant?
A computer search found that there is no 4-universal permutation on 8 items (the best is 51862473 which has 23 out of the 24 possible patterns), but the 9-item permutation 162975384 is universal. So the sequence of lengths of the shortest k-universal patterns begins 1, 3, 5, 9, ... But although there are simple quadratically-growing sequences like ceiling((k^2+1)/2) that begin like this, it's not really long enough to identify this in OEIS and see whether it matches anything known.
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