The rational torsion subgroups of Drinfeld modular Jacobians and Eisenstein pseudo-harmonic cochains
Abstract
Let n be a square-free ideal of Fq[T]. We study the rational torsion subgroup of the Jacobian variety J0(n) of the Drinfeld modular curve X0(n). We prove that for any prime number not dividing q(q-1), the -primary part of this group coincides with that of the cuspidal divisor class group. We further determine the structure of the -primary part of the cuspidal divisor class group for any prime not dividing q-1.
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