Dissections of a «strange» function

Scott Ahlgren; Byungchan Kim

doi:10.1142/S1793042115400072

Dissections of a «strange» function

Scott Ahlgren
, Byungchan Kim

Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

The strange function of Kontsevich and Zagier is defined by This series is defined only when q is a root of unity, and provides an example of what Zagier has called a quantum modular form. In their recent work on congruences for the Fishburn numbers (n) (whose generating function is F(1-q)), Andrews and Sellers recorded a speculation about the polynomials which appear in the dissections of the partial sums of F(q). We prove that a more general form of their speculation is true. The congruences of Andrews-Sellers were generalized by Garvan in the case of prime modulus, and by Straub in the case of prime power modulus. As a corollary of our theorem, we reprove the known congruences for (n) modulo prime powers.

Original language	English (US)
Pages (from-to)	1557-1562
Number of pages	6
Journal	International Journal of Number Theory
Volume	11
Issue number	5
DOIs	https://doi.org/10.1142/S1793042115400072
State	Published - Aug 5 2015

Keywords

Fishburn number
The strange function
dissection

ASJC Scopus subject areas

Algebra and Number Theory

Online availability

10.1142/S1793042115400072

Library availability

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Cite this

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title = "Dissections of a «strange» function",

abstract = "The strange function of Kontsevich and Zagier is defined by This series is defined only when q is a root of unity, and provides an example of what Zagier has called a quantum modular form. In their recent work on congruences for the Fishburn numbers (n) (whose generating function is F(1-q)), Andrews and Sellers recorded a speculation about the polynomials which appear in the dissections of the partial sums of F(q). We prove that a more general form of their speculation is true. The congruences of Andrews-Sellers were generalized by Garvan in the case of prime modulus, and by Straub in the case of prime power modulus. As a corollary of our theorem, we reprove the known congruences for (n) modulo prime powers.",

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author = "Scott Ahlgren and Byungchan Kim",

note = "We thank the referee for suggestions which improved our exposition. The first author was supported by a grant from the Simons Foundation (\#208525 to Scott Ahlgren). Byungchan Kim was supported by the Basic Science Research Program through the National Research Foundation of Korea (NRF) funded by the Ministry of Education (NRF 2013R1A1A2061326).",

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N1 - We thank the referee for suggestions which improved our exposition. The first author was supported by a grant from the Simons Foundation (#208525 to Scott Ahlgren). Byungchan Kim was supported by the Basic Science Research Program through the National Research Foundation of Korea (NRF) funded by the Ministry of Education (NRF 2013R1A1A2061326).

PY - 2015/8/5

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N2 - The strange function of Kontsevich and Zagier is defined by This series is defined only when q is a root of unity, and provides an example of what Zagier has called a quantum modular form. In their recent work on congruences for the Fishburn numbers (n) (whose generating function is F(1-q)), Andrews and Sellers recorded a speculation about the polynomials which appear in the dissections of the partial sums of F(q). We prove that a more general form of their speculation is true. The congruences of Andrews-Sellers were generalized by Garvan in the case of prime modulus, and by Straub in the case of prime power modulus. As a corollary of our theorem, we reprove the known congruences for (n) modulo prime powers.

AB - The strange function of Kontsevich and Zagier is defined by This series is defined only when q is a root of unity, and provides an example of what Zagier has called a quantum modular form. In their recent work on congruences for the Fishburn numbers (n) (whose generating function is F(1-q)), Andrews and Sellers recorded a speculation about the polynomials which appear in the dissections of the partial sums of F(q). We prove that a more general form of their speculation is true. The congruences of Andrews-Sellers were generalized by Garvan in the case of prime modulus, and by Straub in the case of prime power modulus. As a corollary of our theorem, we reprove the known congruences for (n) modulo prime powers.

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KW - dissection

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Dissections of a «strange» function

Abstract

Keywords

ASJC Scopus subject areas

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