Indivisibility of Heegner points in the multiplicative case

Abstract

For certain elliptic curves E over Q with multiplicative reduction at a prime p≥ 5, we prove the p-indivisibility of the derived Heegner classes defined with respect to an imaginary quadratic field K, as conjectured by Kolyvagin. The conditions on E include that E[p] be irreducible and not finite at p and that p split in the imaginary quadratic field K, along with certain p-indivisibility conditions on various Tamagawa factors. The proof extends the arguments of the second author for the case where E has good ordinary reduction at~p.