A Buium--Coleman bound for the Mordell--Lang conjecture
Abstract
For X a hyperbolic curve of genus g with good reduction at p≥ 2g, we give an explicit bound on the Mordell--Lang locus X(C) , when ⊂ J(C) is the divisible hull of a subgroup of J(Q p nr) of rank less than g. Without any assumptions on the rank (but with all the other assumptions) we show that X(C) is unramified at p, and bound the size of its image in X(F p ). As a corollary, we obtain a new proof that Mordell implies Mordell--Lang for curves.
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