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October 18, 2025Open Access

Noncongruence modular curves as Hurwitz spaces

Key Points

Noncongruence modular curves serve as Hurwitz moduli spaces for covers of elliptic curves, enhancing understanding in geometry and number theory.
The article surveys applications to significant mathematical problems, including the Inverse Galois Problem and properties of Markoff triples.
Insights into Fourier coefficients for noncongruence modular forms reveal deep connections among various areas in mathematics.
Natural questions related to these topics encourage further exploration into the relationships between different mathematical constructs.

Abstract

In this survey article we give an overview of how noncongruence modular curves can be viewed as Hurwitz moduli spaces of covers of elliptic curves at most branched above the origin. We describe some natural questions that arise, and applications of these ideas to the Inverse Galois Problem, Markoff triples and the arithmetic of Fourier coefficients for noncongruence modular forms.

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William Y. Chen (Mon,) studied this question.

synapsesocial.com/papers/68f3793258f37cefb60d3580 https://doi.org/https://doi.org/10.48550/arxiv.2510.12003

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