具N階點之橢圓曲線的參數表示

林侑勳; Yuw-Hsun Lin

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完整後設資料紀錄

DC 欄位	值	語言
dc.contributor.advisor	楊一帆	zh_TW
dc.contributor.advisor	Yi-Fan Yang	en
dc.contributor.author	林侑勳	zh_TW
dc.contributor.author	Yuw-Hsun Lin	en
dc.date.accessioned	2025-07-23T16:15:45Z	-
dc.date.available	2025-07-24	-
dc.date.copyright	2025-07-23	-
dc.date.issued	2025	-
dc.date.submitted	2025-07-17	-
dc.identifier.citation	[1] H. Baaziz. Equations for the modular curve X1(N) and models of elliptic curves with torsion points. MATHEMATICS OF COMPUTATION, 79(272): 2371–2386, 2010. [2] H. Cohen and F. Strömberg. Modular Form: A Classical Approach, volume 179 of Graduate Studies in Mathematics. American Mathematical Society, Providence, RI, 2017. [3] P. Deligne and M. Rapoport. Les schémas de modules de courbes elliptiques. In P. Deligne and W. Kuijk, editors, Modular Functions of One Variable II, pages 143–316, Berlin, Heidelberg, 1973. Springer Berlin Heidelberg. ISBN 978-3-540-37855-6. [4] J. S. Fred Diamond. A First Course in Modular Forms. Springer New York, NY, 2010. [5] T. Miyake. Modular Forms. Springer Berlin, Heidelberg, 2005. [6] J. H. Silverman. The Arithmetic of Elliptic Curves. Springer New York, NY, 2nd edition, 2009. [7] Y. Yang. Transformation formulas for generalized dedekind eta functions. Bulletin of the London Mathematical Society, 36(5):671–682, 2004. [8] Y. Yang. Defining equations of modular curves. Advances in Mathematics,204(2):481–508, 2006. ISSN 0001-8708.	-
dc.identifier.uri	http://tdr.lib.ntu.edu.tw/jspui/handle/123456789/97962	-
dc.description.abstract	本論文探討帶有N階點的橢圓曲線組成之模空間，其中N為4到20之間的整數。目標是將橢圓曲線之Tate標準形式的係數，以明確的模函數表示。這些模函數由廣義戴德金η函數組成，並且生成由對應模群Γ1(N)的模函數組成的體。	zh_TW
dc.description.abstract	In this thesis, we study the moduli space of elliptic curves with a specified N-torsion, for 4 ≤ N ≤ 20. Our focus is on expressing the coefficients of the Tate normal form of elliptic curves in terms of explicit modular functions. These modular functions are specific generators for the field of modular functions on Γ1(N) constructed from Generalized η-functions.	en
dc.description.provenance	Submitted by admin ntu (admin@lib.ntu.edu.tw) on 2025-07-23T16:15:45Z No. of bitstreams: 0	en
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dc.description.tableofcontents	Verification Letter from the Oral Examination Committee i Acknowledgements iii 摘要 v Abstract vii Contents ix List of Tables xi Chapter 1 Introduction 1 Chapter 2 Preliminaries 3 2.1 Complex Elliptic Curves 3 2.2 Tate Normal Form 9 2.3 Modular Forms and Modular Functions 12 2.4 Valence Formula 19 2.5 Transformation Formula for ℘(sτ + t; τ ) 20 2.6 Elliptic Function and Jacobi Theta Functions 23 2.7 Generalized Dedekind Eta Function 25 2.8 Generators for the field of modular functions with respect to Γ1(N) 27 Chapter 3 Main Result 31 3.1 The order at cusps of f and g 31 3.2 A representation of f and g in terms of generators 38 3.3 Table of Results 43 References 47	-
dc.language.iso	en	-
dc.subject	模形式	zh_TW
dc.subject	模形式	zh_TW
dc.subject	Tate Normal Form	en
dc.subject	Modular Form	en
dc.subject	Tate Normal Form	en
dc.subject	Modular Form	en
dc.title	具N階點之橢圓曲線的參數表示	zh_TW
dc.title	Explicit parametrizations of elliptic curves with N-torsions	en
dc.type	Thesis	-
dc.date.schoolyear	113-2	-
dc.description.degree	碩士	-
dc.contributor.oralexamcommittee	李庭諭;凃芳婷	zh_TW
dc.contributor.oralexamcommittee	Ting-Yu Lee;Fang-Ting Tu	en
dc.subject.keyword	模形式,	zh_TW
dc.subject.keyword	Modular Form,Tate Normal Form,	en
dc.relation.page	48	-
dc.identifier.doi	10.6342/NTU202501859	-
dc.rights.note	同意授權(全球公開)	-
dc.date.accepted	2025-07-18	-
dc.contributor.author-college	理學院	-
dc.contributor.author-dept	數學系	-
dc.date.embargo-lift	2025-07-24	-
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