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Generalized Fishburn numbers and torus knots
Date Issued
2021-02
Date Available
2024-05-16T15:45:22Z
Embargo end date
2022-10-19
Abstract
Andrews and Sellers recently initiated the study of arithmetic properties of Fishburn numbers. In this paper we prove prime power congruences for generalized Fishburn numbers. These numbers are the coefficients in the 1−q expansion of the Kontsevich-Zagier series Ft(q) for the torus knots T(3,2t), t≥2. The proof uses a strong divisibility result of Ahlgren, Kim and Lovejoy and a new “strange identity” for Ft(q).
Other Sponsorship
Ireland Canada University Foundation
Natural Sciences and Engineering Research Council of Canada
Type of Material
Journal Article
Publisher
Elsevier
Journal
Journal of Combinatorial Theory, Series A
Volume
178
Copyright (Published Version)
2020 Elsevier
Language
English
Status of Item
Peer reviewed
ISSN
0097-3165
This item is made available under a Creative Commons License
File(s)
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Name
bbmortzfinal.pdf
Size
347.46 KB
Format
Adobe PDF
Checksum (MD5)
19ba3ddddc334739b8075e11df226128
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