An Algorithm for Numerically Computing Preimages of the j-invariant Open Access

Alwaise, Ethan James (2017)

Permanent URL: https://etd.library.emory.edu/concern/etds/0c483k319?locale=en++PublishedPublished

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Abstract

Here we explore the problem of numerically computing preimages of the j-invariant. We present an algorithm based on studying the asymptotics of the Fourier coefficients of the logarithmic derivative of j(τ). We use recent work of Bringmann, Kane, Löbrich, Ono, and Rolen, which gives asymptotics for the Fourier coefficients of divisor modular forms, to identify the real and imaginary parts of the preimage.

1. Introduction and Statement of Results

2. Preliminaries on Elliptic Curves over C

3. Determining Fundamental Periods from an Elliptic Curve over C

4. Modular Forms and Harmonic Maass Forms

5. Proof of Theorem 1.0.4

6. Examples

About this Master's Thesis

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School	Laney Graduate School
Department	Mathematics
Degree	MS
Submission	Master's Thesis
Language	English
Research Field	Mathematics
Keyword	elliptic curves modular functions j-function harmonic maass forms
Committee Chair / Thesis Advisor	Ono, Ken, Emory University
Committee Members	Weinschenk, Matthew, Emory University Zureick-Brown, David M, Emory University

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An Algorithm for Numerically Computing Preimages of the j-invariant Open Access

Alwaise, Ethan James (2017)

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About this Master's Thesis

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