Uniform polynomial bounds on torsion from rational geometric isogeny classes

Abstract

In 1996, Merel showed there exists a function B Z+→ Z+ such that for any elliptic curve E/F defined over a number field of degree d, one has the torsion group bound \# E(F)[tors]≤ B(d). Based on subsequent work, it is conjectured that one can choose B to be polynomial in the degree d. In this paper, we show that such bounds exist for torsion from the family IQ of elliptic curves which are geometrically isogenous to at least one rational elliptic curve. More precisely, we show that for each ε>0, there exists cε>0 such that for any elliptic curve E/F∈ IQ, one has \[ E(F)[tors]≤ cε· [F:Q]3+ε. \] This generalizes work of the second author for elliptic curves within a fixed rational geometric isogeny class. For the family of elliptic curves with rational j-invariant, we also obtain bounds which improve those of Clark and Pollack. In this case, our bounds on the exponent of E(F)[tors] are optimal if one does not exclude elliptic curves with complex multiplication.