Let K be an arbitrary field, and let E 1, · · · , E n be isogenous elliptic curves with complex multiplication (CM) over K. The basic problem considered in this paper is to find suitable criteria for determining whether or not a given abelian variety A′ is isomorphic to the product variety A = E 1 × · · · × E n . A special case of this problem is to determine this in the case that ?′=?′1×⋯×?′? is also a product variety. The solution of this problem is based on an extension of the methods of Deuring, Shimura/Taniyama and Waterhouse of constructing isogenies of abelian varieties via ideals of their endomorphisms rings.
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