On the existence of abelian surfaces with everywhere good reduction
Abstract
Let D 2000 be a positive discriminant such that F = Q(D) has narrow class one, and A/F an abelian surface of GL2-type with everywhere good reduction. Assuming that A is modular, we show that A is either an F-surface or is a base change from Q of an abelian surface B such that EndQ(B) = Z, except for D = 353, 421, 1321, 1597 and 1997. In the latter case, we show that there are indeed abelian surfaces with everywhere good reduction over F for D = 353, 421 and 1597, which are non-isogenous to their Galois conjugates. These are the first known such examples.
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