Let
N
(
d
,
G
,
X
)
N(d, G, X)
be the number of degree
d
d
number fields
K
K
with Galois group
G
G
and whose discriminant
D
K
D_K
satisfies
|
D
K
|
≤
X
|D_K| \le X
. Under standard conjectures in diophantine geometry, we show that
N
(
4
,
A
4
,
X
)
≪
ϵ
X
2
/
3
+
ϵ
N(4, A_4, X) \ll _\epsilon X^{2/3+\epsilon }
, and that there are
≪
ϵ
N
3
+
ϵ
\ll _\epsilon N^{3+\epsilon }
monic, quartic polynomials with integral coefficients of height
≤
N
\le N
whose Galois groups are smaller than
S
4
S_4
, confirming a question of Gallagher. Unconditionally we have
N
(
4
,
A
4
,
X
)
≪
ϵ
X
5
/
6
+
ϵ
N(4, A_4, X) \ll _\epsilon X^{5/6 + \epsilon }
, and that the
2
2
-class groups of almost all Abelian cubic fields
k
k
have size
≪
ϵ
D
k
1
/
3
+
ϵ
\ll _\epsilon D_k^{1/3+\epsilon }
. The proofs depend on counting integral points on elliptic fibrations.