An elliptic surface with infinitely many fibers for which the rank does not jump
Abstract
Let E be a nonisotrivial elliptic curve over Q(T) and denote the rank of the abelian group E(Q(T)) by r. For all but finitely many t∈ Q, specialization will give an elliptic curve Et over Q for which the abelian group Et(Q) has rank at least r. Conjecturally, the set of t∈Q for which Et(Q) has rank exactly r has positive density. We produce the first known example for which Et(Q) has rank r for infinitely many t∈Q. For our particular E/Q(T) which has rank 0, we will make use of a theorem of Green on 3-term arithmetic progressions in the primes to produce t∈Q for which Et has only a few bad primes that we understand well enough to perform a 2-descent.
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