On Malle's conjecture for the product of symmetric and nilpotent groups
Abstract
Let G be a finite nilpotent group and n∈ \3,4, 5\. Consider Sn× G as a subgroup of Sn× S|G|⊂ Sn|G|, where G embeds into the second factor of Sn× S|G| via the regular representation. Over any number field k, we prove the strong form of Malle's conjecture for Sn× G viewed as a subgroup of Sn|G|. Our result requires that G satisfies some mild conditions.
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