Generators of the ideal class group

Question

Theorem 4 of Eric Bach's "Explicit bounds for primality testing and related problems" states the following:

Let $K$ be a number field of degree greater than 1. Let $d$ be the absolute value of the discriminant of $K$. Let $\chi$ be a nonprincipal character of the ideals of $k$ that is defined modulo $\mathfrak{f}$. Then: \begin{align*} \chi (p) &\neq 1 \text{ occurs for } N(\mathfrak{p}) \leq 3\log^{2}(d^2N(\mathfrak{f})) \\ \chi (p) & \neq 0,1 \text{ occurs for } N(\mathfrak{p}) \leq 12\log^{2}(d^2N(\mathfrak{f}))\\ \chi (p) & \neq 0,1 \text{ and } \text{degree}(\mathfrak{p})=1 \text{ occurs for } N(\mathfrak{p}) \leq 18\log^{2}(d^2N(\mathfrak{f})) \end{align*}

How do I get the result that the ideal class group is generated by the prime ideals of norm less than $12\log^{2}(d)$ from above theorem?

Answer 1

Let $G$ be the ideal class group, and let $H$ be the subgroup generated by the prime ideals of norm at most $3\log^2(d^2)=12\log^2(d)$. Assume that $H$ is a proper subgroup of $G$. Then there is a nontrivial character of $G$ that is trivial on $H$. This character is trivial on the prime ideals of norm at most $3\log^2(d^2)=12\log^2(d)$, contradicting the first part of the theorem (with $\mathfrak{f}=\mathfrak{o}$). Hence $H=G$, and we are done.