A bijective proof of the hook-length formula for skew shapes. (August 2020)

Record Type:
Journal Article
Title:
A bijective proof of the hook-length formula for skew shapes. (August 2020)
Main Title:
A bijective proof of the hook-length formula for skew shapes
Authors:
Konvalinka, Matjaž
Abstract:
Abstract: Recently, Naruse presented a beautiful cancellation-free hook-length formula for skew shapes. The formula involves a sum over objects called excited diagrams, and the term corresponding to each excited diagram has hook lengths in the denominator, like the classical hook-length formula due to Frame, Robinson and Thrall. In this paper, we present a simple bijection that proves an equivalent recursive version of Naruse's result, in the same way that the celebrated hook-walk proof due to Greene, Nijenhuis and Wilf gives a bijective (or probabilistic) proof of the hook-length formula for ordinary shapes. In particular, we also give a new bijective proof of the classical hook-length formula, quite different from the known proofs.
Is Part Of:
European journal of combinatorics. Volume 88(2020)
Journal:
European journal of combinatorics
Issue:
Volume 88(2020)
Issue Display:
Volume 88, Issue 2020 (2020)
Year:
2020
Volume:
88
Issue:
2020
Issue Sort Value:
2020-0088-2020-0000
Page Start:
Page End:
Publication Date:
2020-08
Subjects:
Combinatorial analysis -- Periodicals
Analyse combinatoire -- Périodiques
Combinatorial analysis
Periodicals
Electronic journals
511.6
Journal URLs:
http://www.sciencedirect.com/science/journal/01956698
http://www.elsevier.com/journals
http://www.idealibrary.com
http://firstsearch.oclc.org
http://firstsearch.oclc.org/journal=0195-6698;screen=info;ECOIP
DOI:
10.1016/j.ejc.2020.103104
Languages:
English
ISSNs:
0195-6698
Deposit Type:
Legaldeposit
View Content:
Available online (eLD content is only available in our Reading Rooms)
Physical Locations:
British Library DSC - 3829.728200
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13466.xml