Abelian varieties with prescribed embedding and full embedding degrees

Abstract

We study the problem of the embedding degree of an abelian variety over a finite field which is vital in pairing-based cryptography. In particular, we show that for a prescribed CM field L of degree ≥ 4, prescribed integers m, n and any prime 1 mn that splits completely in L, there exists an ordinary abelian variety over a prime finite field with endomorphism algebra L, embedding degree n with respect to and the field extension generated by the -torsion points of degree mn over the field of definition. We also study a class of absolutely simple higher dimensional abelian varieties whose endomorphism algebras are central over imaginary quadratic fields.