The Manin-Stevens constant in the semistable case

Abstract

Stevens conjectured that for every optimal parametrization φ X1(n) → E of an elliptic curve E over Q of conductor n, the pullback of some N\'eron differential on E is the differential associated to the normalized new eigenform that corresponds to the isogeny class of E. We prove this conjecture under the assumption that E is semistable, the key novelty lying in the 2-primary analysis when n is even. For this analysis, we first relate the general case of the conjecture to a divisibility relation between deg\, φ and a certain congruence number and then reduce the semistable case to a question of exhibiting enough suitably constrained oldforms. Our methods also apply to parametrizations by X0(n) and prove new cases of the Manin conjecture.