Decreasing Subsequences in Permutations and Wilf Equivalence for Involutions
Mireille Bousquet-Mélou
and Einar Steingrímsson
LaBRI, Université Bordeaux 1 CNRS 351 cours de la Libération 33405 Talence Cedex France 351 cours de la Libération 33405 Talence Cedex France
DOI: 10.1007/s10801-005-4625-1
Abstract
In a recent paper, Backelin, West and Xin describe a map φ * that recursively replaces all occurrences of the pattern k... 21 in a permutation σ by occurrences of the pattern ( k - 1)... 21 k. The resulting permutation φ *(σ ) contains no decreasing subsequence of length k. We prove that, rather unexpectedly, the map φ * commutes with taking the inverse of a permutation.
In the BWX paper, the definition of φ * is actually extended to full rook placements on a Ferrers board (the permutations correspond to square boards), and the construction of the map φ * is the key step in proving the following result. Let T be a set of patterns starting with the prefix 12... k. Let T$^{\prime}$ be the set of patterns obtained by replacing this prefix by k... 21 in every pattern of T. Then for all n, the number of permutations of the symmetric group S {\cal S} n that avoid T equals the number of permutations of S {\cal S} n that avoid T$^{\prime}$.
Pages: 383–409
Keywords: keywords pattern avoiding permutations; Wilf equivalence; involutions; decreasing subsequences; prefix exchange
Full Text: PDF
References
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24. J. West, “Permutations with Forbidden Subsequences, and Stack-Sortable Permutations,” Ph.D. thesis, MIT, 1990.
2. E. Babson and J. West, “The permutations 123 p4 . . . pm and 321 p4 . . . pm are Wilf-equivalent,” Graphs Combin. 16(4) (2000), 373-380.
3. J. Backelin, J. West, and G. Xin, “Wilf-equivalence for singleton classes,” in Proceeedings of the 13th Conference on Formal Power Series and Algebraic Combinatorics, H. Barcelo and V. Welker (Eds.), Arizona State University, 2001, pp. 29-38 (To appear in Adv. in Appl. Math.).
4. E. Barcucci, A. Del Lungo, E. Pergola, and R. Pinzani, “Some permutations with forbidden subsequences and their inversion number,” Discrete Math. 234(1-3) (2001), 1-15.
5. M. Bóna, “Exact enumeration of 1342-avoiding permutations: A close link with labeled trees and planar maps,” J. Combin. Theory Ser. A 80(2) (1997), 257-272.
6. M. Bousquet-Mélou, “Four classes of pattern-avoiding permutations under one roof: Generating trees with two labels,” Electron. J. Combin. 9(2), (2003).
7. A. Claesson and T. Mansour, “Enumerating permutations avoiding a pair of Babson-Steingrímsson patterns,” Ars Combinatoria, to appear.
8. I. Gessel, “Symmetric functions and P-recursiveness,” J. Combin. Theory Ser. A 53(2) (1990), 257-285.
9. I. Gessel, J. Weinstein, and H.S. Wilf, “Lattice walks in Zd and permutations with no long ascending subsequences,” Electron. J. Combin. 5(1) (1998), 11.
10. D. Gouyou-Beauchamps, “Standard Young tableaux of height 4 and 5,” European J. Combin. 10(1) (1989), 69-82.
11. O. Guibert, “Combinatoire des permutations `a motifs exclus, en liaison avec mots, cartes planaires et tableaux de Young,” Ph.D. thesis, LaBRI, Université Bordeaux 1, 1995.
12. O. Guibert, E. Pergola, and R. Pinzani, “Vexillary involutions are enumerated by Motzkin numbers,” Ann. Comb. 5(2) (2001), 153-174.
13. G. Huet, “Confluent reductions: Abstract properties and applications to term rewriting systems,” J. Assoc. Comput. Mach. 27(4) (1980) 797-821.
14. A.D. Jaggard, “Prefix exchanging and pattern avoidance for involutions,” Electron. J. Combin. 9(2)(2003), 16.
15. S. Kitaev and T. Mansour, “A survey of certain pattern problems,” Preprint, 2004.
16. C. Krattenthaler, “Permutations with restricted patterns and Dyck paths,” Adv. in Appl. Math. 27(2/3) (2001), 510-530.
17. A. Regev, “Asymptotic values for degrees associated with strips of Young diagrams,” Adv. in Math. 41(2) (1981) 115-136.
18. C. Schensted, “Longest increasing and decreasing subsequences,” Canad. J. Math. 13 (1961), 179-191.
19. R. Simion and F.W. Schmidt, “Restricted permutations,” European J. Combin. 6(4) (1985) 383-406.
20. Z.E. Stankova, “Forbidden subsequences,” Discrete Math. 132(1/3) (1994), 291-316.
21. Z.E. Stankova, “Classification of forbidden subsequences of length 4,” European J. Combin. 17(5) (1996), 501-517.
22. Z.E. Stankova and J. West, “A new class of Wilf-equivalent permutations,” J. Algebraic Combin. 15(3) (2002), 271-290.
23. G. Viennot, “Une forme géométrique de la correspondance de Robinson-Schensted,” in Combinatoire et représentation du groupe symétrique (Actes Table Ronde CNRS, Univ. Louis-Pasteur, Strasbourg, 1976). Lecture Notes in Math., vol.
579. Springer, Berlin, 1977, pp. 29-58.
24. J. West, “Permutations with Forbidden Subsequences, and Stack-Sortable Permutations,” Ph.D. thesis, MIT, 1990.
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