Rational torsion of generalised modular Jacobians of odd level
Abstract
We consider the generalised Jacobian J0(N)m of the modular curve X0(N) of level N, with respect to the modulus m consisting of all cusps on the modular curve. When N is odd, we determine the group structure of the rational torsion J0(N)m(Q)tor up to 2-primary and l-primary parts for any prime l dividing N. Our results extend those of Wei--Yamazaki for squarefree levels and Yamazaki--Yang for prime-power levels.
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