English

Level lowering: a Mazur principle in higher dimension

Number Theory 2023-10-12 v5

Abstract

For a maximal ideal m\mathfrak m of some anemic Hecke algebra TξS\mathbb{T}^S_\xi of a similitude group of signature (1,d1)(1,d-1), one can associate a Galois Fl\overline{\mathbb F}_l-representation ρm\overline \rho_{\mathfrak m} as well as a Galois Tξ,mS\mathbb{T}_{\xi,\mathfrak m}^S-representation ρm\rho_{\mathfrak m}.For ldl\geq d, on can also define a monodromy operator Nm\overline N_{\mathfrak m} as well as Nm~N_{\widetilde{\mathfrak m}} for every prime ideal m~m\widetilde{\mathfrak m} \subset \mathfrak m, giving rise to partitions dˉm\underline{\bar d_{\mathfrak m}} and dm~\underline d_{\widetilde{\mathfrak m}} of dd. As with Mazur's principle for GL2GL_2, analysing the difference between these partitions, we infer informations about the liftings of ρm\overline \rho_{\mathfrak m} in characteristic zero known as level lowering problem.

Keywords

Cite

@article{arxiv.1908.07073,
  title  = {Level lowering: a Mazur principle in higher dimension},
  author = {Pascal Boyer},
  journal= {arXiv preprint arXiv:1908.07073},
  year   = {2023}
}

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R2 v1 2026-06-23T10:51:34.296Z