Modular abelian surfaces of small conductor with nontrivial Tate--Shafarevich groups

Abstract

We exhibit examples of geometrically simple abelian surfaces A/Q with conductor bounded by (10\,000)2 whose Tate--Shafarevich groups contain a subgroup isomorphic to (Z/pZ)2 for each p = 5, 7, 11, 13. To find these examples we generalise work of Cremona--Freitas to enumerate all congruences of a certain type between pairs of weight 2 newforms f ∈ S2new(0(N)) and g ∈ S2new(0(M)) contained in the LMFDB (i.e., with N, M < 10\,000) and with coefficient fields of degree ≤ 4. Passing from the modular forms to the corresponding abelian varieties we use visibility to (unconditionally) prove the existence of non-trivial elements of the Tate--Shafarevich group. Finally we construct an example of an abelian surface with (Z/7Z)2 ⊂ Sha(A/Q) which is (conjecturally) not visible in any abelian threefold.