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Search: id:A137550
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| A137550 |
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Number of permutations in S_n avoiding 31{bar 5}{bar 4}2 (i.e. every occurrence of 312 is contained in an occurrence of a 31542). |
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| 1, 2, 5, 14, 43, 144, 522, 2030, 8398, 36714, 168793, 813112, 4091735, 21451972, 116891160, 660554822, 3863775322, 23353384298, 145634065581, 935743895590, 6187151514364, 42050180222692, 293448121230999, 2100678197412864
(list; graph; listen)
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OFFSET
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1,2
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COMMENT
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Comment from Lara Pudwell (Lara.Pudwell(AT)valpo.edu), Oct 23 2008 (Start):
A permutation p avoids a pattern q if it has no subsequence that is order-isomorphic to q. For example, p avoids the pattern 132 if it has no subsequence abc with a<c<b.
Barred pattern avoidance considers permutations that avoid a pattern except in a special case. Given a barred pattern q, we may form two patterns, q1 = the sequence of unbarred letters of q, and q2 = the sequence of all letters of q.
A permutation p avoids barred pattern q if every instance of q1 in p is embedded in a copy of q2 in p. In other words, p avoids q1, except in the special case that a copy of q1 is a subsequence of a copy of q2.
For example, if q=5{bar 1}32{bar 4}, then q1=532, and q2 = 51324. p avoids q if every for decreasing subsequence acd of length 3 in p, one can find letters b and e so that the subsequence abcde of p has b<d<c<e<a. (End)
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LINKS
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Lara Pudwell, Enumeration Schemes for Pattern-Avoiding Words and Permutations, Ph. D. Dissertation, Math. Dept., Rutgers University, May 2008.
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CROSSREFS
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Sequence in context: A098569 A137549 A014327 this_sequence A047970 A137551 A148333
Adjacent sequences: A137547 A137548 A137549 this_sequence A137551 A137552 A137553
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KEYWORD
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nonn
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AUTHOR
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Lara Pudwell (Lara.Pudwell(AT)valpo.edu), Apr 25 2008
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