In paragraph 3 of chapter 7 of Mumford's Geometric Invariant Theory, the author proves that the coarse moduli space $A_{g,d,n}$ of abelian varieties of dimension $g$, with a degree $d^2$ polarization and a level $n$ structure, exists over $\text{Spec } \mathbb{Z}$ and is quasi-projective over $\text{Spec }\mathbb{Z}[1/p]$ for any prime number $p$.
He next claims that $A_{g,d,n}$ is in fact quasi-projective over $\text{Spec }\mathbb{Z}$ but does not provide a proof. How is this done nowadays?