Towards a modulo \(p\) Langlands correspondence for \(\mathrm{GL}_{2}\) (Q2880223)

The authors discuss the possibility to extend the conjectural Langlands correspondence to a mod-\(p\)-situation.NEWLINENEWLINEMore specifically, given the quotient field \(F\) of the ring of Witt vectors \({\mathcal O}_F\) of a finite field \(k\) in characteristic \(p,\) let \(\rho:\text{Gal}(\overline F / F) \to \text{GL}_2(\overline k)\) be a continuous representation. The authors describe supersingular representations \(\pi\) of \(\text{GL}_2(F)\) which can be associated to \(\rho\) by means of their maximal semisimple \(\text{GL}_2({\mathcal O}_F)\)-submodule. They, in particular, discuss that \(\pi\) will not be uniquely characterized by the desired properties and propose a means to deal with this situation.NEWLINENEWLINEThe results are very technical and hard to describe in detail in this review.