English

Local systems and Suzuki groups

Algebraic Geometry 2023-05-12 v2 Number Theory

Abstract

We study geometric monodromy groups G\geo,\sFqG_{\geo,\sF_q} of the local systems \sFq\sF_q on the affine line over \F2\F_2 of rank D=q(q1)D=\sqrt{q}(q-1), q=22n+1q=2^{2n+1}, constructed in \cite{Ka-ERS}. The main result of the paper shows that G\geo,\sFqG_{\geo,\sF_q} is either the Suzuki simple group \tw2B2(q)\tw2 B_2(q), or the special linear group \SLD\SL_D. We also show that \sF8\sF_8 has geometric monodromy group \tw2B2(8)\tw2B_2(8), and arithmetic monodromy group \Aut(\tw2B2(8))\Aut(\tw2 B_2(8)) over \F2\F_2, thus establishing \cite[Conjecture 2.2]{Ka-ERS} in full in the case q=8q=8.

Cite

@article{arxiv.2305.03168,
  title  = {Local systems and Suzuki groups},
  author = {L. Alpoge and N. M. Katz and G. Navarro and E. A. O'Brien and P. H. Tiep},
  journal= {arXiv preprint arXiv:2305.03168},
  year   = {2023}
}
R2 v1 2026-06-28T10:26:12.912Z