Let T be an admissible torsion group for
an elliptic curve over the rationals.
Define
G(T) =
sup {rank E(Q(t)) :
torsion group of elliptic curve E over Q(t)
is T},
C(T) =
lim sup {rank E(Q) : torsion group of elliptic curve
E over Q is T}.
In the following two tables the best known
lower bounds for G(T) and C(T) are given.
If C(T) > G(T),
it means that the current
record for C(T)
comes from a parametrization by rational points of some
elliptic curves with positive rank.
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