There are at most finitely many singular moduli that are S-units

There are at most finitely many singular moduli that are S-units

We show that for every finite set of prime numbers S, there are at most finitely many singular moduli that are S-units. The key new ingredient is that for every prime number p, singular moduli are p-adically disperse. We prove analogous results for the Weber modular functions, the lambda invariants...

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Hauptverfasser: Herrero, Sebastián, Menares, Ricardo, Rivera-Letelier, Juan
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Algebraic Geometry
Mathematics - Dynamical Systems
Mathematics - Number Theory
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Zusammenfassung:We show that for every finite set of prime numbers S, there are at most finitely many singular moduli that are S-units. The key new ingredient is that for every prime number p, singular moduli are p-adically disperse. We prove analogous results for the Weber modular functions, the lambda invariants and the McKay-Thompson series associated to the elements of the monster group. Finally, we also obtain that a modular function that specializes to infinitely many algebraic units at quadratic imaginary numbers must be a weak modular unit.
DOI:10.48550/arxiv.2102.05041