Counting Frobenius extensions over local function fields
J. Klüners, R. Müller, ArXiv:2604.02152 (2026).
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Abstract
We determine the asymptotic growth of extensions of local function fields of characteristic p counted by discriminant, where the Galois group is a subgroup of the affine group AGL_1(p). More general, we solve the corresponding counting problems for all groups which arise in a tower of a cyclic extension of order p over a cyclic extension of degree d coprime to p. This in particular give answers for certain non-abelian groups including S_3, dihedral groups of order 2p, and many Frobenius groups.
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arXiv:2604.02152
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Klüners J, Müller R. Counting Frobenius extensions over local function fields. arXiv:260402152. Published online 2026.
Klüners, J., & Müller, R. (2026). Counting Frobenius extensions over local function fields. In arXiv:2604.02152.
@article{Klüners_Müller_2026, title={Counting Frobenius extensions over local function fields}, journal={arXiv:2604.02152}, author={Klüners, Jürgen and Müller, Raphael}, year={2026} }
Klüners, Jürgen, and Raphael Müller. “Counting Frobenius Extensions over Local Function Fields.” ArXiv:2604.02152, 2026.
J. Klüners and R. Müller, “Counting Frobenius extensions over local function fields,” arXiv:2604.02152. 2026.
Klüners, Jürgen, and Raphael Müller. “Counting Frobenius Extensions over Local Function Fields.” ArXiv:2604.02152, 2026.
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