Construction of Hecke Characters for Three-dimensional CM Abelian Varieties

Abstract

It is well-known for an elliptic curve with complex multiplication that the existence of a Q-rational model is equivalent to its field of moduli being equal to Q, or its endomorphism ring being the ring of integers of 9 possible fields (). Murabayashi and Umegaki proved analogous results for abelian surfaces. For three dimensional CM abelian varieties with rational fields of moduli, Chun narrowed down to a list of 37 possible CM fields. In this paper, we show that his list is exact. By constructing certain Hecke characters that satisfy a theorem of Shimura, we prove that precisely 28 isogeny classes of these abelian varieties have Q-models. Therefore the complete analogy to () fails here.