2. Preliminaries

2.1. Trinomials and construction of $A_n$ -unramified extensions over quadratic fields

There are several ways to construct $A_n$ -unramified extensions over quadratic fields. A well-known approach works with trinomials, that is, polynomials of the form $X^n+aX^k+b$ . The following discriminant formula for trinomial extensions, due to Swan, will be very useful.

Theorem 2.1. (Theorem 2 of [Reference Swan21]): The trinomial $f(x)=X^n-aX^k+b$ with $0\lt k\lt n$ has discriminant:

\begin{equation*}D(f)=({-}1)^{\frac {n(n-1)}{2}}b^{k-1}\bigl [ n^Nb^{N-K}-(n-k)^{N-K}k^Ka^N\bigr ]^d,\end{equation*}

where $d=(n,k), N=n/d, K=k/d$ .

Theorem 2.2. (Theorem 1 of [Reference Osada19]) Let $f(X) = X^n + aX^k+ b$ be a polynomial of rational integral coefficients, that is, $f(X) \in \mathbb{Z}[X]$ . Let $a = a_0c^n$ and $b = b^k_0c^n$ . Then the Galois group of $f$ is isomorphic to the symmetric group $S_n$ of degree $n$ if the following conditions are satisfied:

1. 1. $f(X)$ is irreducible ouer $\mathbb{Q}$ ,

2. 2. $a_0c(n - k)k$ and $nb_0$ are relatively prime, that is, $(a_0c(n - k)k,nb_0) = 1$ .

Theorem 2.3. (Theorem 1 of [Reference Uchida22]) Let $k$ be an algebraic number field of finite degree. Let $a$ and $b$ be integers of $k$ . Let

\begin{equation*} f(X)=X^n-aX+b, \end{equation*}

and let $K$ denote the splitting field of $f$ over $k$ , that is, $K=k(\alpha _1, \alpha _2,\cdot \cdot \cdot,\alpha _n)$ where $\alpha _1, \alpha _2,\cdot \cdot \cdot,\alpha _n)$ are the roots of $f(X) = 0$ . Let $D$ be the discriminant of $f(X)$ . If $(n -1)a$ and $nb$ are relatively prime, $K$ is unramified over $k(\sqrt{D})$ .

3. Proof of the main theorem

We will now prove our main result.

Proof. Case 1: $n\equiv 3$ (mod $4$ ). Let us consider the following polynomial:

(3.1) \begin{equation} f(x)=X^n-X-n^k, \end{equation}

where $k$ is an arbitrary integer. By Theorem 2.1, we know that the discriminant of $f(x)$ is

\begin{equation*} (n-1)^{n-1}-n^{n+k(n-1)}. \end{equation*}

Assume for the moment that $f$ is irreducible. Then the Galois group of the splitting field $K$ of $f$ is isomorphic to $S_n$ by Theorem 2.2. On the other hand, due to [Reference Dèbes4, Theorem 1.2], if the polynomial $f$ is reducible for infinitely many choices of $k$ , then the two-variable polynomial $F(T,X) = X^n-X-n^uT^e$ must be reducible for some integer $u$ and positive integer $e$ . However, that polynomial is an Eisenstein polynomial in $T$ (for the prime $X$ of $\mathbb{Q}[X]$ ) and therefore clearly irreducible. We have thus obtained that $f$ has Galois group $S_n$ for all but finitely many choices of $k$ . We also know that $K$ is unramified over $\mathbb{Q}\left(\sqrt{(n-1)^{n-1}-n^{n+k(n-1)}}\right)$ , that is, $\mathbb{Q}\left(\sqrt{(n-1)^{n-1}-n^{n+k(n-1)}}\right)$ has an $A_n$ -unramified extension $K$ . The remaining task is to show that, for infinitely many choices of $k$ , the class group of $\mathbb{Q}\left(\sqrt{(n-1)^{n-1}-n^{n+k(n-1)}}\right)$ contains an element of $m$ . The discriminant of $f(x)$ can be written as follows:

\begin{equation*} (n-1)^{n-1}-n^{n+k(n-1)}=-b^2D \end{equation*}

Here, $D$ is a squarefree integer. Set $A:=(n-1)^{n-1}$ , $B=b^2D$ and $C:=n^{n+k(n-1)}$ so that $A+B=C$ . By Proposition 2.4, it suffices to show that $(D+1)^2\gt C$ . If we assume the ABC conjecture, for a given $\epsilon \gt 0$ , for all but finitely many $(A,B,C)$ of this kind, one has $\mathrm{rad}(ABC) \gt C^{1-\epsilon }$ . From now on, we will write $a:=n+k(n-1)$ . We easily see that

\begin{equation*} (n-1)\mathrm {rad}(B)n\geq \mathrm {rad}(ABC) \gt C^{1-\epsilon }=n^{a(1-\epsilon )}. \end{equation*}

In other words,

\begin{equation*} \mathrm {rad}(B)\gt n^{a(1-\epsilon )-2}\frac {n}{n-1}\gt n^{a(1-\epsilon )-2}=(n^a)^{1-\epsilon -2/a}\gt B^{1-\epsilon -2/a}. \end{equation*}

As soon as $a\gt 8$ , one has $\mathrm{rad}(B)\gt B^{3/4}$ . This means that

\begin{equation*} B/\mathrm {rad}(B)=\prod _{p |B}p^{e_p-1}\lt B^{1/4} \end{equation*}

where $e_p$ is the multiplicity of $p$ in the prime factorization of $B$ . Since all the primes contributing to $b^2$ must divide $B$ more than once, it follows that the term $b^2$ in the expression $B=b^2D$ must be smaller than $(B^{1/4})^2 = B^{1/2}$ . Therefore, we know that $B=b^2D\lt B^{1/2}D$ and $B\lt D^2$ . Since $A$ is a fixed value (not depending on $k$ ), if $a$ is sufficiently large, we obtain the condition $A\lt B^{1/2}$ . In conclusion,

\begin{equation*} n^a=C=A+B\lt D^2+D\lt (D+1)^2. \end{equation*}

Since $n-1$ is relatively prime to $m$ , we can find positive integers $k$ such that $m| \big (n+k(n-1)\big )$ . Therefore, if we choose $k$ satisfying $m| (n+k(n-1))$ and $n+k(n-1)=a\gt 8$ , the class group of $\mathbb{Q}\big (\sqrt{(n-1)^{n-1}-n^{n+k(n-1)}}\big )$ contains an element of order $m$ under the assumption of the ABC conjecture.

Case 2: $n\equiv 0$ (mod $4$ ). Let us consider the polynomial:

(3.2) \begin{equation} f(x)=X^n-(n-1)^kX+1, \end{equation}

where $k$ is an arbitrary integer. We know that the discriminant of $f(X)$ is

\begin{equation*} n^{n}-(n-1)^{n-1+nk}. \end{equation*}

By an argument analogous to the above, we know that $f$ has Galois group $S_n$ and the splitting field $K$ of $f$ is unramified over $\mathbb{Q}\left(\sqrt{n^{n}-(n-1)^{n-1+nk}}\right)$ for all but finitely many choices of $k$ . We also want to show that $\mathbb{Q}\left(\sqrt{n^{n}-(n-1)^{n-1+nk}}\right)$ has a $C_m$ -unramified extension by the similar way. The discriminant of $f(x)$ can be written as follows:

\begin{equation*} n^{n}-(n-1)^{n-1+nk}=-b^2D \end{equation*}

where $D$ is a squarefree integer. Set $A:=n^n$ , $B:=b^2D$ , and $C:=(n-1)^{n-1+nk}$ so that $A+B=C$ . By the similar argument in the above, under the assumption of the ABC conjecture, for a given $\epsilon \gt 0$ , for all but finitely many $(A,B,C)$ , we have $\mathrm{rad}(ABC) \gt C^{1-\epsilon }$ . Set $a=n(k+1)-1$ . We know that

\begin{equation*} n\cdot \mathrm {rad}(B)\cdot (n-1)\geq \mathrm {rad}(ABC) \gt C^{1-\epsilon }=(n-1)^{a(1-\epsilon )}. \end{equation*}

It means that,

\begin{equation*} \mathrm {rad}(B)\gt (n-1)^{a(1-\epsilon )-3}\frac {(n-1)^2}{n}\gt (n-1)^{a(1-\epsilon )-3}=((n-1)^a)^{1-\epsilon -3/a}\gt B^{1-\epsilon -3/a}. \end{equation*}

In particular, for $a\gt 12$ , we have $\mathrm{rad}(B)\gt B^{3/4}$ . This implies that

\begin{equation*} B/\mathrm {rad}(B)=\prod _{p |B}p^{e_p-1}\lt B^{1/4} \end{equation*}

With the same development as in Case 1, we can deduce

\begin{equation*} (n-1)^a=C=A+B\lt D^2+D\lt (D+1)^2. \end{equation*}

for all sufficiently large $a$ . With the same idea as in Case 1, if we put $k$ satisfying $m| (n-1+nk)$ (which is possible since $m$ and $n$ are coprime) and $n-1+kn=a\gt 12$ , the class group of $\mathbb{Q}\big (\sqrt{n^{n}-(n-1)^{n-1+kn}}\big )$ contains an element of order $m$ under the assumption of the ABC conjecture.

4. An unconditional result

Although we have proven our Main Theorem under the assumption of the ABC conjecture, in special cases, it is possible to prove it without this assumption. We will explain such a case in this section.

Table 1. Numerical examples for $n=7,8,11,12,15,16$

Proof. Let us again consider the following polynomial:

(4.1) \begin{equation} f(X)=X^{n}-(n-1)^kX+1. \end{equation}

We know that the discriminant of $f$ is of the form:

\begin{equation*} 2^{n\ell }-(n-1)^{n-1+nk}. \end{equation*}

As we have already seen in the proof of the previous theorem, $f(x)$ is irreducible and the Galois group of the splitting field $K$ of $f$ is isomorphic to $S_n$ for all but finitely many choices of $k$ . By Theorem 2.3, we also know that $K$ is unramified over $\mathbb{Q}\left(\sqrt{2^{n\ell }-(n-1)^{n-1+nk}}\right)$ . Since $m$ is an odd integer, we can find (infinitely many) $k$ such that $m | \big (n-1+nk\big )$ . Since $n=2^{\ell }$ and $n-1+nk$ is an odd integer, we know that $2^{n\ell }-(n-1)^{n-1+nk} \equiv 1$ ( $\mathrm{mod}$ $8$ ). By Theorem 2.5, the class group of the imaginary quadratic field $\mathbb{Q}\left(\sqrt{2^{n\ell }-(n-1)^{n-1+nk}}\right)$ contains an element of order $n-1+nk$ , and hence one of order $m$ .

5. Numerical examples

In this section, we will give several explicit examples of quadratic fields with $A_n\times C_m$ -unramified extensions illustrating the proof of the Main Theorem. All computations in this section were carried out with Magma (see [Reference Bosma, Cannon and Playoust3]). The contents of Table 1 are described as follows (with the two cases depending on the mod- $4$ residue of $n$ ):

$n$ : an integer congruent to $3$ (resp. $0$ ) modulo $4$ ,

$k$ : an auxiliary integer,

$m$ : the integer $m= n+k(n-1)$ (resp. $m= n-1+nk$ ),

$f(x)$ : the polynomial $f(x)=x^n-x-n^k$ (resp. $f(x)=x^n-(n-1)^kx+1$ ),

$K$ : the splitting field of $f(x)$ ,

$-d$ : the squarefree part of the discriminant of $f(x)$ .