Torsion of rank-two A-motives values in odd characteristic cyclotomic towers

Abstract

For rank-two A-motives defined over local fields with odd characteristic, we give an analogue of a theorem of Imai stating that abelian varieties with good reduction over p-adic fields have only finitely many torsion points values in cyclotomic towers. This implies the finiteness of torsion points of abelian Anderson A-modules. For rank-two Drinfeld A-modules over global function fields, we also give an analogue of a theorem of Ribet on torsion points of abelian varieties values in maximal cyclotomic extensions of number fields.