Mark Goresky, Yung-sheng Tai
Published 2017-01-26Version 1
The authors define an "anti-holomorphic" involution (or "real structure") on an ordinary Abelian variety (defined over a finite field k) to be an involution of the associated Deligne module (T,F,V) that exchanges F (the Frobenius) with V (the Verschiebung). The definition extends to include principal polarizations and certain level structures. The authors show there are finitely many isomorphism classes in each dimension, and they give a formula for this number which resembles the Kottwitz "counting formula" (for the number of principally polarized Abelian varieties over k), where the symplectic group (in the Kottwitz formula) has been replaced by the general linear group.
Every positive integer is the order of an ordinary abelian variety over ${\mathbb F}_2$
Canonical coordinates on the canonical lift
Computing Hecke Operators for Arithmetic Subgroups of General Linear Groups
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