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You searched for subject:(Jacobi Theta function). Showing records 1 – 3 of 3 total matches.

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University of Alberta

1. Sebestyen, Mark D. Jacobi Theta and Dedekind Eta Function Identities Via Geometrical Lattice Equivalence.

Degree: MS, Department of Mathematical and Statistical Sciences, 2013, University of Alberta

Geometrical lattice equivalences are used to generate over 100 new quadratic identities involving classical modular forms, Jacobi theta functions, θ2, θ3, θ4, and the Dedekind eta function η. Generalizations are examined and a seemingly new observation on the nature of η is noted.

Subjects/Keywords: geometric lattice equivalence; Jacobi Theta function; Dedekind Eta Function

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6th Edition):

Sebestyen, M. D. (2013). Jacobi Theta and Dedekind Eta Function Identities Via Geometrical Lattice Equivalence. (Masters Thesis). University of Alberta. Retrieved from https://era.library.ualberta.ca/files/vm40xs89b

Chicago Manual of Style (16th Edition):

Sebestyen, Mark D. “Jacobi Theta and Dedekind Eta Function Identities Via Geometrical Lattice Equivalence.” 2013. Masters Thesis, University of Alberta. Accessed August 03, 2020. https://era.library.ualberta.ca/files/vm40xs89b.

MLA Handbook (7th Edition):

Sebestyen, Mark D. “Jacobi Theta and Dedekind Eta Function Identities Via Geometrical Lattice Equivalence.” 2013. Web. 03 Aug 2020.

Vancouver:

Sebestyen MD. Jacobi Theta and Dedekind Eta Function Identities Via Geometrical Lattice Equivalence. [Internet] [Masters thesis]. University of Alberta; 2013. [cited 2020 Aug 03]. Available from: https://era.library.ualberta.ca/files/vm40xs89b.

Council of Science Editors:

Sebestyen MD. Jacobi Theta and Dedekind Eta Function Identities Via Geometrical Lattice Equivalence. [Masters Thesis]. University of Alberta; 2013. Available from: https://era.library.ualberta.ca/files/vm40xs89b


Universiteit Utrecht

2. Zwegers, S.P. Mock Theta Functions.

Degree: 2002, Universiteit Utrecht

The mock theta functions were invented by the Indian mathematician Srinivasa Ramanujan, who lived from 1887 until 1920. He discovered them shortly before his death. In this dissertation, I consider several of the examples that Ramanujan gave of mock theta functions, and relate them to real-analytic modular forms of weight 1/2. In Chapter 1, I consider a sum, which was also studied by Lerch. This Lerch sum transforms almost as a Jacobi form under substitutions in (upsilon, nu, tau ). I show that the transformation behaviour becomes that of a Jacobi form if we add a (relatively simple) correction term. This correction term is real-analytic in (upsilon, nu, tau) but not holomorphic. For special values of (upsilon, nu), we could call the Lerch sum (considered as a function of tau ) a mock theta function, although these examples were not considered by Ramanujan. In Chapter 2, I consider theta functions for indefinite quadratic forms. These indefinite theta functions are modified versions of theta functions introduced by Göttsche and Zagier. I find elliptic and modular transformation properties of these functions, similar to the properties of theta functions associated to positive definite quadratic forms. In the case of positive definite quadratic forms, the theta functions are holomorphic. The theta functions in the chapter are not holomorphic. By taking special values of certain parameters, we get most of the examples of mock theta functions given by Ramanujan. Andrews gave most of the fifth order mock theta functions as Fourier coefficients of meromorphic Jacobi forms, namely certain quotients of ordinary Jacobi theta-series. This is the motivation for the study of the modularity of Fourier coefficients of meromorphic Jacobi forms, in Chapter 3. We find that modularity follows on adding a real-analytic correction term to the Fourier coefficients. In Chapter 4, I use the results from Chapter 2 to get the modular transformation properties of the seventh-order mock v-functions and most of the fifth-order functions. The final result is that we can write each of these mock theta-functions as the sum of two functions ? and G, where: - ? is a real-analytic modular form of weight 1/2 and is an eigenfunction of the appropriate Casimir operator with eigenvalue 3/16 (this is also the eigenvalue of holomorphic modular forms of this weight); and - G is a theta series associated to a negative definite unary quadratic form. Moreover G is bounded as ? tends vertically to any rational limit. Many of the results of Chapter 4 could be deduced using the methods from Chapter 1 or Chapter 3 instead of Chapter 2. This means that I have actually given three approaches to proving modularity properties of the mock theta -functions.

Subjects/Keywords: Wiskunde en Informatica; mock theta function; indefinite theta function; indefinite quadratic form; theta series; Jacobi form; real-analytic modular form

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6th Edition):

Zwegers, S. P. (2002). Mock Theta Functions. (Doctoral Dissertation). Universiteit Utrecht. Retrieved from http://dspace.library.uu.nl:8080/handle/1874/878

Chicago Manual of Style (16th Edition):

Zwegers, S P. “Mock Theta Functions.” 2002. Doctoral Dissertation, Universiteit Utrecht. Accessed August 03, 2020. http://dspace.library.uu.nl:8080/handle/1874/878.

MLA Handbook (7th Edition):

Zwegers, S P. “Mock Theta Functions.” 2002. Web. 03 Aug 2020.

Vancouver:

Zwegers SP. Mock Theta Functions. [Internet] [Doctoral dissertation]. Universiteit Utrecht; 2002. [cited 2020 Aug 03]. Available from: http://dspace.library.uu.nl:8080/handle/1874/878.

Council of Science Editors:

Zwegers SP. Mock Theta Functions. [Doctoral Dissertation]. Universiteit Utrecht; 2002. Available from: http://dspace.library.uu.nl:8080/handle/1874/878

3. Zwegers, S.P. Mock Theta Functions.

Degree: 2002, University Utrecht

The mock theta functions were invented by the Indian mathematician Srinivasa Ramanujan, who lived from 1887 until 1920. He discovered them shortly before his death. In this dissertation, I consider several of the examples that Ramanujan gave of mock theta functions, and relate them to real-analytic modular forms of weight 1/2. In Chapter 1, I consider a sum, which was also studied by Lerch. This Lerch sum transforms almost as a Jacobi form under substitutions in (upsilon, nu, tau ). I show that the transformation behaviour becomes that of a Jacobi form if we add a (relatively simple) correction term. This correction term is real-analytic in (upsilon, nu, tau) but not holomorphic. For special values of (upsilon, nu), we could call the Lerch sum (considered as a function of tau ) a mock theta function, although these examples were not considered by Ramanujan. In Chapter 2, I consider theta functions for indefinite quadratic forms. These indefinite theta functions are modified versions of theta functions introduced by Göttsche and Zagier. I find elliptic and modular transformation properties of these functions, similar to the properties of theta functions associated to positive definite quadratic forms. In the case of positive definite quadratic forms, the theta functions are holomorphic. The theta functions in the chapter are not holomorphic. By taking special values of certain parameters, we get most of the examples of mock theta functions given by Ramanujan. Andrews gave most of the fifth order mock theta functions as Fourier coefficients of meromorphic Jacobi forms, namely certain quotients of ordinary Jacobi theta-series. This is the motivation for the study of the modularity of Fourier coefficients of meromorphic Jacobi forms, in Chapter 3. We find that modularity follows on adding a real-analytic correction term to the Fourier coefficients. In Chapter 4, I use the results from Chapter 2 to get the modular transformation properties of the seventh-order mock v-functions and most of the fifth-order functions. The final result is that we can write each of these mock theta-functions as the sum of two functions ? and G, where: - ? is a real-analytic modular form of weight 1/2 and is an eigenfunction of the appropriate Casimir operator with eigenvalue 3/16 (this is also the eigenvalue of holomorphic modular forms of this weight); and - G is a theta series associated to a negative definite unary quadratic form. Moreover G is bounded as ? tends vertically to any rational limit. Many of the results of Chapter 4 could be deduced using the methods from Chapter 1 or Chapter 3 instead of Chapter 2. This means that I have actually given three approaches to proving modularity properties of the mock theta -functions.

Subjects/Keywords: mock theta function; indefinite theta function; indefinite quadratic form; theta series; Jacobi form; real-analytic modular form

Record DetailsSimilar RecordsGoogle PlusoneFacebookTwitterCiteULikeMendeleyreddit

APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6th Edition):

Zwegers, S. P. (2002). Mock Theta Functions. (Doctoral Dissertation). University Utrecht. Retrieved from https://dspace.library.uu.nl/handle/1874/878 ; URN:NBN:NL:UI:10-1874-878 ; URN:NBN:NL:UI:10-1874-878 ; https://dspace.library.uu.nl/handle/1874/878

Chicago Manual of Style (16th Edition):

Zwegers, S P. “Mock Theta Functions.” 2002. Doctoral Dissertation, University Utrecht. Accessed August 03, 2020. https://dspace.library.uu.nl/handle/1874/878 ; URN:NBN:NL:UI:10-1874-878 ; URN:NBN:NL:UI:10-1874-878 ; https://dspace.library.uu.nl/handle/1874/878.

MLA Handbook (7th Edition):

Zwegers, S P. “Mock Theta Functions.” 2002. Web. 03 Aug 2020.

Vancouver:

Zwegers SP. Mock Theta Functions. [Internet] [Doctoral dissertation]. University Utrecht; 2002. [cited 2020 Aug 03]. Available from: https://dspace.library.uu.nl/handle/1874/878 ; URN:NBN:NL:UI:10-1874-878 ; URN:NBN:NL:UI:10-1874-878 ; https://dspace.library.uu.nl/handle/1874/878.

Council of Science Editors:

Zwegers SP. Mock Theta Functions. [Doctoral Dissertation]. University Utrecht; 2002. Available from: https://dspace.library.uu.nl/handle/1874/878 ; URN:NBN:NL:UI:10-1874-878 ; URN:NBN:NL:UI:10-1874-878 ; https://dspace.library.uu.nl/handle/1874/878

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