Weil polynomials of abelian varieties over finite fields with many rational points

We consider the finite set of isogeny classes of \(g\)-dimensional abelian varieties defined over the finite field \(\mathbb{F}_q\) with endomorphism algebra being a field. We prove that the class within this set whose varieties have maximal number of rational points is unique, for any prime even power \(q\) big enough and verifying mild conditions. We describe its Weil polynomial and we prove that the class is ordinary and cyclic outside the primes dividing an integer that only depends on \(g\). In dimension \(3\), we prove that the class is ordinary and cyclic and give explicitly its Weil polynomial, for any prime even power \(q\).