Local data of rational elliptic curves with non-trivial torsion

Abstract

By Mazur's Torsion Theorem, there are fourteen possibilities for the non-trivial torsion subgroup T of a rational elliptic curve. For each T, such that E may have additive reduction at a prime p, we consider a parameterized family ET of elliptic curves with the property that they parameterize all elliptic curves E/Q which contain T in their torsion subgroup. Using these parameterized families, we explicitly classify the Kodaira-N\'eron type, the conductor exponent, and the local Tamagawa number at each prime p where E/Q has additive reduction. As a consequence, we find all rational elliptic curves with a 2-torsion or a 3-torsion point that have global Tamagawa number 1.