CM-liftability of simple superspecial abelian surfaces over prime fields
Abstract
For any prime p>0, we prove that simple superspecial abelian surfaces over Fp admit CM liftings after base change at most to Fp2, by using the residual reflex condition (RRC) and Lie types. The CM-liftability of ordinary simple abelian surfaces is proved by Serre-Tate, and the CM-liftability of almost ordinary simple abelian surfaces is proved by Oswal-Shankar and Bergstr\"om-Karemaker-Marseglia, respectively. As there can only be ordinary, almost ordinary, or supersingular simple abelian surfaces over Fp, our work is another step to complete the CM-liftability of simple abelian surfaces over Fp.
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