Hecke-Rogers type series representation on mock theta functions

This thesis consists of a collection of results related to Ramanujan’s mock θ-functions, with our primary focus on Hecke-Rogers type series representation on these functions. We provide transformation formulas that lead us to a different representation of the third order mock θ- functions. In a sepa...

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Main Author:	Ker, Linus Jian Ting
Other Authors:	Chan Song Heng
Format:	Final Year Project
Language:	English
Published:	Nanyang Technological University 2020
Subjects:	Science::Mathematics
Online Access:	https://hdl.handle.net/10356/139415
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Institution:	Nanyang Technological University
Language:	English

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spelling	sg-ntu-dr.10356-1394152023-02-28T23:12:45Z Hecke-Rogers type series representation on mock theta functions Ker, Linus Jian Ting Chan Song Heng School of Physical and Mathematical Sciences chansh@ntu.edu.sg Science::Mathematics This thesis consists of a collection of results related to Ramanujan’s mock θ-functions, with our primary focus on Hecke-Rogers type series representation on these functions. We provide transformation formulas that lead us to a different representation of the third order mock θ- functions. In a separate section, we give the proofs for three theorems regarding the Hecke-Rogers double series representation associated with definite quadratic forms. In addition, we will provide the Hecke representation for fifth order mock θ-functions, with greater analysis on the last two functions χ0(q) and χ1(q). We will end off this thesis with some examples involving Hecke-Rogers type representation, including the use of these representations to prove Gauss’s famous result that every integer is the sum of three triangular numbers. Bachelor of Science in Mathematical Sciences 2020-05-19T07:18:32Z 2020-05-19T07:18:32Z 2020 Final Year Project (FYP) https://hdl.handle.net/10356/139415 en 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
spellingShingle	Science::Mathematics Ker, Linus Jian Ting Hecke-Rogers type series representation on mock theta functions
description	This thesis consists of a collection of results related to Ramanujan’s mock θ-functions, with our primary focus on Hecke-Rogers type series representation on these functions. We provide transformation formulas that lead us to a different representation of the third order mock θ- functions. In a separate section, we give the proofs for three theorems regarding the Hecke-Rogers double series representation associated with definite quadratic forms. In addition, we will provide the Hecke representation for fifth order mock θ-functions, with greater analysis on the last two functions χ0(q) and χ1(q). We will end off this thesis with some examples involving Hecke-Rogers type representation, including the use of these representations to prove Gauss’s famous result that every integer is the sum of three triangular numbers.
author2	Chan Song Heng
author_facet	Chan Song Heng Ker, Linus Jian Ting
format	Final Year Project
author	Ker, Linus Jian Ting
author_sort	Ker, Linus Jian Ting
title	Hecke-Rogers type series representation on mock theta functions
title_short	Hecke-Rogers type series representation on mock theta functions
title_full	Hecke-Rogers type series representation on mock theta functions
title_fullStr	Hecke-Rogers type series representation on mock theta functions
title_full_unstemmed	Hecke-Rogers type series representation on mock theta functions
title_sort	hecke-rogers type series representation on mock theta functions
publisher	Nanyang Technological University
publishDate	2020
url	https://hdl.handle.net/10356/139415
_version_	1759854041253281792

Hecke-Rogers type series representation on mock theta functions

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