On Class Numbers, Torsion Subgroups, and Quadratic Twists of Elliptic Curves

Abstract

The Mordell-Weil groups E(Q) of elliptic curves influence the structures of their quadratic twists E-D(Q) and the ideal class groups CL(-D) of imaginary quadratic fields. For appropriate (u,v) ∈ Z2, we define a family of homomorphisms u,v: E(Q) → CL(-D) for particular negative fundamental discriminants -D:=-DE(u,v), which we use to simultaneously address questions related to lower bounds for class numbers, the structures of class groups, and ranks of quadratic twists. Specifically, given an elliptic curve E of rank r, let E be the set of suitable fundamental discriminants -D<0 satisfying the following three conditions: the quadratic twist E-D has rank at least 1; Etor(Q) is a subgroup of CL(-D); and h(-D) satisfies an effective lower bound which grows asymptotically like c(E) (D)r2 as D ∞. Then for any > 0, we show that as X ∞, we have \#\, \-X < -D < 0: -D ∈ E \ \, X12-. In particular, if ∈ \3,5,7\ and |Etor(Q)|, then the number of such discriminants -D for which h(-D) is X12-. Moreover, assuming the Parity Conjecture, our results hold with the additional condition that the quadratic twist E-D has rank at least 2.