Product decompositions of the symmetric group induced by separable permutations
Publication
, Journal Article
Wei, F
Published in: European Journal of Combinatorics
May 1, 2012
In this paper we consider the rank generating function of a separable permutation π in the weak Bruhat order on the two intervals [id,π] and [π,w0], where w0=n,n-1,..., 1. We show a surprising result that the product of these two generating functions is the generating function for the symmetric group with the weak order. We then obtain explicit formulas for the rank generating functions on [id,π] and [π,w0], leading to the rank-symmetry and unimodality of the two graded posets. © 2011 Elsevier Ltd.
Duke Scholars
Published In
European Journal of Combinatorics
DOI
ISSN
0195-6698
Publication Date
May 1, 2012
Volume
33
Issue
4
Start / End Page
572 / 582
Related Subject Headings
- Computation Theory & Mathematics
- 4904 Pure mathematics
- 0101 Pure Mathematics
Citation
APA
Chicago
ICMJE
MLA
NLM
Wei, F. (2012). Product decompositions of the symmetric group induced by separable permutations. European Journal of Combinatorics, 33(4), 572–582. https://doi.org/10.1016/j.ejc.2011.11.009
Wei, F. “Product decompositions of the symmetric group induced by separable permutations.” European Journal of Combinatorics 33, no. 4 (May 1, 2012): 572–82. https://doi.org/10.1016/j.ejc.2011.11.009.
Wei F. Product decompositions of the symmetric group induced by separable permutations. European Journal of Combinatorics. 2012 May 1;33(4):572–82.
Wei, F. “Product decompositions of the symmetric group induced by separable permutations.” European Journal of Combinatorics, vol. 33, no. 4, May 2012, pp. 572–82. Scopus, doi:10.1016/j.ejc.2011.11.009.
Wei F. Product decompositions of the symmetric group induced by separable permutations. European Journal of Combinatorics. 2012 May 1;33(4):572–582.
Published In
European Journal of Combinatorics
DOI
ISSN
0195-6698
Publication Date
May 1, 2012
Volume
33
Issue
4
Start / End Page
572 / 582
Related Subject Headings
- Computation Theory & Mathematics
- 4904 Pure mathematics
- 0101 Pure Mathematics