Rational torsion of generalised Drinfeld modular Jacobians of prime power level
Abstract
For a prime p ⊂eq Fq[T] and a positive integer r, we consider the generalised Jacobian J0(n)m of the Drinfeld modular curve X0(n) of level n=pr, with respect to the modulus~m consisting of all cusps on the modular curve. We show that the -primary part of the group J0(n)m(Fq(T))tor[∞] is trivial for all primes not dividing q(q2-1). Our results establish a function field analogue to those of Yamazaki--Yang for the classical case.
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