We deal with $g$-dimensional abelian varieties $X$ over finite fields. We prove that there is an universal constant (positive integer) $N=N(g)$ that depends only on $g$ that enjoys the following properties. If a certain self-product of $X$ carries an exotic Tate class then the self-product $X^{2N}$of $X$ also carries an exotic Tate class. This gives a positive answer to a question of Kiran Kedlaya.
Numbers of points of surfaces in the projective $3$-space over finite fields
Furstenberg sets and Furstenberg schemes over finite fields
The Tate conjecture over finite fields (AIM talk)
![QR code for arXiv:2005.04478 [math.AG]](http://oss.arxitics.com/images/favicon.svg)