Albert classification of rational endomorphism rings of simple Abelian varieties over finite fields

Question

Recall the Albert classification of rational endomorphism rings with involution of simple Abelian varieties over arbitrary fields:

• Type I: totally real, trivial involution

• Type II and III: quaternion algebras over totally real number fields

• Type IV: center is a CM field for which the restriction of the involution is complex conjugation

Now my question is: Which of these division algebras can actually occur if the base field is a finite field?

Answer 1

See http://www.math.nyu.edu/~tschinke/books/finite-fields/final/05_oort.pdf, Section 15:

Only Type III and IV can occur, and III only for dimension $1$ or $2$.