Rational torsion points on Jacobians of modular curves
Abstract
Let p be a prime greater than 3. Consider the modular curve X0(3p) over Q and its Jacobian variety J0(3p) over Q. Let T(3p) and C(3p) be the group of rational torsion points on J0(3p) and the cuspidal group of J0(3p), respectively. We prove that the 3-primary subgroups of T(3p) and C(3p) coincide unless p 1 9 and 3p-13 1 \! p.
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