Certain Abelian varieties bad at only one prime

Abstract

An abelian surface A/ Q of prime conductor N is favorable if its 2-division field F is an S5-extension with ramification index 5 over Q2. Let A be favorable and let B be any semistable abelian variety of dimension 2d and conductor Nd such that B[2] is filtered by copies of A[2]. We give a sufficient class field theoretic criterion on F to guarantee that B is isogenous to Ad. As expected from our paramodular conjecture, we conclude that there is one isogeny class of abelian surfaces for each conductor in \277, 349,461,797,971\. The general applicability of our criterion is discussed in the data section.