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Classical modular curve
Stark-Heegner Points Course and Student Project Description Arizona Winter School 2011 Henri Darmon and Victor Rotger
PRIMITIVE SOLUTIONS to X2 + Y3 = Z10 1. Introduction We Say a Triple
Explicit Towers of Drinfeld Modular Curves 3
Dedekind $\Eta $-Function, Hauptmodul and Invariant Theory
On Quadratic Points of Classical Modular Curves
Pre-Publication Accepted Manuscript
Algebraic Cycles and Stark-Heegner Points
Arxiv:Math/0409520V1 [Math.QA] 27 Sep 2004
MODULAR FORMS, DE RHAM COHOMOLOGY and CONGRUENCES 1. Introduction in [2], Atkin and Swinnerton-Dyer Described a Remarkable Famil
Functions and Differentials on the Non-Split Cartan Modular Curve Of
Book of Abstracts
Chow-Heegner Points Via Iterated Integrals
Rational Points on Modular Elliptic Curves Henri Darmon
University of Groningen Weil Pairing and the Drinfeld Modular Curve Van Der Heiden, Gerrit
ALGEBRAIC CURVES UNIFORMIZED by CONGRUENCE SUBGROUPS of TRIANGLE GROUPS Contents 1. Introduction 1 2. Triangle Groups 7 3. Galoi
Hurwitz Monodromy, Spin Separation and Higher Levels of a Modular Tower
Power Series Expansions for Modular Forms
Arxiv:1301.5876V2 [Math.NT] 22 Apr 2013 Ore Coefficients Fourier Upiigsneteei Oueu Ek Hoyfrmdlrforms Modular for Theory Hecke Useful Subgroups)
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Shimura Curves for Level-3 Subgroups of the (2,3,7) Triangle Group and Some Other Examples
Two-Dimensional Representations in the Arithmetic of Modular Curves
Cusps, Congruence Groups and Monstrous Dessins Arxiv:1812.11752V2 [Math.NT] 12 Jul 2020
Modular Forms, De Rham Cohomology and Congruences
An Adelic Description of Modular Curves
Moduli Relations Between L-Adic Representations and the Regular Inverse Galois Problem
Explicit Families of Elliptic Curves with the Same Mod 6
Introduction to Drinfeld Modules
Arxiv:2005.06669V3 [Math.NT] 17 Jul 2021 E(Q)Tor ,→ E(Fp); Consequently, If M | #E(Q)Tor Then M | #E(Fp) for All but finitely Many P
Heights on Squares of Modular Curves Pierre Parent, Pascal Autissier
Models for Modular Curves