On the ranks of partitions modulo certain integers

On the ranks of partitions modulo certain integers

This thesis focuses on the rank of partition functions, identities related to generating functions of ranks modulo different integers and Ramanujan's convolution sum. Most results in Chapters 2 and 4 are reproduced from [14] and [10], respectively. Ramanujan had three famous congruences for...

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Main Author: Hong, Nankun
Other Authors: Chan Song Heng
Format: Thesis-Doctor of Philosophy
Language:English
Published: Nanyang Technological University 2020
Subjects:
Science::Mathematics::Number theory
Online Access:https://hdl.handle.net/10356/137118
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Institution: Nanyang Technological University
Language: English
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spelling sg-ntu-dr.10356-1371182023-02-28T23:53:34Z On the ranks of partitions modulo certain integers Hong, Nankun Chan Song Heng School of Physical and Mathematical Sciences chansh@ntu.edu.sg Science::Mathematics::Number theory This thesis focuses on the rank of partition functions, identities related to generating functions of ranks modulo different integers and Ramanujan's convolution sum. Most results in Chapters 2 and 4 are reproduced from [14] and [10], respectively. Ramanujan had three famous congruences for the partition function modulo 5, 7 and 11. F. J. Dyson defined the the rank of partitions and conjectured that ranks could provide combinatorial explanations for the cases of 5 and 7. A. O. L. Atkin and H. P. F. Swinnerton-Dyer proved his conjecture using generating functions for the rank difference modulo 5 and 7. From Theorem 8.16 in F. G. Garvan's paper [20], we know that results on dissections of the rank modulo m are equivalent to results on rank difference results modulo m, which inspired us to find a 3-dissection of ranks modulo 9 in Chapter 2. We also give an identity involving generating functions of ranks modulo 3 and 9. Ramanujan recorded several entries which are related to generating functions of the rank modulo different integers. Finding analogous identities is the motivation of Chapter 3. We give some identities, some of which are obtained by using Ramanujan's entries. In Ramanujan's paper [36], he proved a formula for convolutions of sum of divisors functions. In Chapter 4, we find formulas for convolutions of the sum of divisor functions twisted by the Dirichlet character, which are analogous to Ramanujan's. Doctor of Philosophy 2020-02-26T04:47:07Z 2020-02-26T04:47:07Z 2020 Thesis-Doctor of Philosophy Hong, N. (2020). On the ranks of partitions modulo certain integers. Doctoral thesis, Nanyang Technological University, Singapore. https://hdl.handle.net/10356/137118 10.32657/10356/137118 en This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License (CC BY-NC 4.0). application/pdf Nanyang Technological University
institution Nanyang Technological University
building NTU Library
continent Asia
country Singapore
Singapore
content_provider NTU Library
collection DR-NTU
language English
topic Science::Mathematics::Number theory
spellingShingle Science::Mathematics::Number theory
Hong, Nankun
On the ranks of partitions modulo certain integers
description This thesis focuses on the rank of partition functions, identities related to generating functions of ranks modulo different integers and Ramanujan's convolution sum. Most results in Chapters 2 and 4 are reproduced from [14] and [10], respectively. Ramanujan had three famous congruences for the partition function modulo 5, 7 and 11. F. J. Dyson defined the the rank of partitions and conjectured that ranks could provide combinatorial explanations for the cases of 5 and 7. A. O. L. Atkin and H. P. F. Swinnerton-Dyer proved his conjecture using generating functions for the rank difference modulo 5 and 7. From Theorem 8.16 in F. G. Garvan's paper [20], we know that results on dissections of the rank modulo m are equivalent to results on rank difference results modulo m, which inspired us to find a 3-dissection of ranks modulo 9 in Chapter 2. We also give an identity involving generating functions of ranks modulo 3 and 9. Ramanujan recorded several entries which are related to generating functions of the rank modulo different integers. Finding analogous identities is the motivation of Chapter 3. We give some identities, some of which are obtained by using Ramanujan's entries. In Ramanujan's paper [36], he proved a formula for convolutions of sum of divisors functions. In Chapter 4, we find formulas for convolutions of the sum of divisor functions twisted by the Dirichlet character, which are analogous to Ramanujan's.
author2 Chan Song Heng
author_facet Chan Song Heng
Hong, Nankun
format Thesis-Doctor of Philosophy
author Hong, Nankun
author_sort Hong, Nankun
title On the ranks of partitions modulo certain integers
title_short On the ranks of partitions modulo certain integers
title_full On the ranks of partitions modulo certain integers
title_fullStr On the ranks of partitions modulo certain integers
title_full_unstemmed On the ranks of partitions modulo certain integers
title_sort on the ranks of partitions modulo certain integers
publisher Nanyang Technological University
publishDate 2020
url https://hdl.handle.net/10356/137118
_version_ 1759857053920133120

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