Levent Alpöge, Manjul Bhargava, Ari Shnidman
Published 2020-11-02Version 1
We show that a positive proportion of cubic fields are not monogenic, despite having no local obstruction to being monogenic. Our proof involves the comparison of $2$-descent and $3$-descent in a certain family of Mordell curves $E_k \colon y^2 = x^3 + k$. As a by-product of our methods, we show that, for every $r \geq 0$, a positive proportion of curves $E_k$ have Tate--Shafarevich group with $3$-rank at least $r$.
A positive proportion of quartic fields are not monogenic yet have no local obstruction to being so
Ternary cubic forms having bounded invariants, and the existence of a positive proportion of elliptic curves having rank 0
Elements of prime order in Tate-Shafarevich groups of abelian varieties over $\mathbb{Q}$
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