Abstract
Let p be a prime not equal to 2 or 3. We determine the group of all modular units on the modular curve X1(2p), and its full cuspidal class number. We mention a fact concerning the non-existence of torsion points of order 5 or 7 of elliptic curves over Q of square-free conductor n as an application of a result by Agashe and the cuspidal class number formula for X0(n). We also state the formula for the order of the subgroup of the Q-rational torsion subgroup of J1(2p) generated by the Q-rational cuspidal divisors of degree 0.
Citation
Toshikazu TAKAGI. "The cuspidal class number formula for the modular curves X1(2p)." J. Math. Soc. Japan 64 (1) 23 - 85, January, 2012. https://doi.org/10.2969/jmsj/06410023
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