Endomorphism algebras of abelian varieties with large cyclic 2-torsion field over a given field

Abstract

In this article we study the endomorphism algebras of abelian varieties A defined over a given number field K with large cyclic 2-torsion fields. A key step in doing so is to provide criteria for all the endomorphisms of A to be defined over K(A[2]), the field generated by its 2-torsion. When K= Q and Gal(Q(A[2])/Q) is cyclic of prime order p = 2 (A) +1, we prove that there are only finitely many possibilities for the geometric endomorphism algebra End(A) Q.In fact, when (A) ∈ \3,5,9,21,33,81\, we show End(A) Q is a proper subfield of the p-th cyclotomic field. In particular, when g=2, End(A) Q is isomorphic to either Q or Q(5).