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Recurrence Relations Satisfied by the Traces of Singular Moduli for Gamma(0)(N)open access
- Authors
- Cho, Bumkyu
- Issue Date
- Oct-2020
- Publisher
- MATHEMATICAL SOC REP CHINA
- Keywords
- traces of singular moduli; Gamma-equivalence; Gamma-reduced forms
- Citation
- TAIWANESE JOURNAL OF MATHEMATICS, v.24, no.5, pp 1045 - 1072
- Pages
- 28
- Indexed
- SCIE
SCOPUS
- Journal Title
- TAIWANESE JOURNAL OF MATHEMATICS
- Volume
- 24
- Number
- 5
- Start Page
- 1045
- End Page
- 1072
- ISSN
- 1027-5487
2224-6851
- Abstract
- We compute the divisor of the modular equation on the modular curve Gamma(0)(N)\H* and then find recurrence relations satisfied by the modular traces of the Hauptmodul for any congruence subgroup Gamma(0)(N) of genus zero. We also introduce the notions and properties of Gamma-equivalence and Gamma-reduced forms about binary quadratic forms. Using these, we can explicitly compute the recurrence relations for N = 2, 3, 4, 5.
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Related Researcher
- Cho, Bum Kyu
- College of Natural Science (Department of Mathematics)