@unpublished{65358,
  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.}},
  author       = {{Klüners, Jürgen and Müller, Raphael}},
  booktitle    = {{arXiv:2604.02152}},
  title        = {{{Counting Frobenius extensions over local function fields}}},
  year         = {{2026}},
}

@inproceedings{59990,
  author       = {{Eichler, Andreas and Floren, Henrik and Garnelo Abellanas, Irene and Liebendörfer, Michael and Müller, Raphael and Schürmann, Mirko and Speer, Annabelle}},
  booktitle    = {{INDRUM2024 PROCEEDINGS Fifth conference of the International Network for Didactic Research in University Mathematics}},
  issn         = {{2496-1027 (online)}},
  location     = {{Barcelona}},
  publisher    = {{Escola Univerist`aria Salesiana de Sarri`a – Univ. Aut`onoma de Barcelona and INDRUM}},
  title        = {{{Digital STACK tasks and exam results}}},
  doi          = {{https://theses.hal.science/INDRUM2024/hal-04944194v1}},
  year         = {{2024}},
}

@phdthesis{59988,
  author       = {{Müller, Raphael}},
  title        = {{{On the asymptotics of wildly ramified local function field extensions}}},
  year         = {{2023}},
}

@article{59989,
  author       = {{Müller, Raphael and Klüners, Jürgen}},
  journal      = {{Journal of Number Theory}},
  title        = {{{The conductor density of local function fields with abelian Galois group}}},
  volume       = {{212}},
  year         = {{2020}},
}

