Counting C2 S4 fields with a power saving error term
Abstract
Let Nd(G,X) denote the number of degree d extensions of Q with Galois closure G and |K|≤ X. Malle's conjecture predicts an asymptotic of the form Nd(G,X) CXα( X)β. Previously, Kl\"uners proved Malle's conjecture for G=C2 S4. His proof gives a power savings of O(X7/8). We improve Kl\"uners' result by establishing a stronger power saving error term for the count of such fields. Specifically, we show N8(C2 S4,X)=CX+O(X3/4-1/30). Additionally, we obtain new bounds on N8(G,X) for the groups S4, C23 S4, GL2 (F3), and Q8 S4 as permutation subgroups of S8.
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