Speculations on the mod \(p\) representation theory of \(p\)-adic groups (Q341046)

Let \(F\) be a \(p\)-adic field, and let \(G\) be the group of \(F\)-points of a connected reductive group over \(F\). In this paper the author provides a survey of various results on representation theory of \(G\) and lists a number of relevant questions and speculations about representations of \(G\). This work was inspireed by recent work on the geometric Langlands correspondence and starts with the hypothesis that the analogue for mod \(p\) representations of \(p\)-adic groups of local Langlands correspondence might be an equivalence of categories rather than simply a bijection of sets. For example, the Galois side of the correspondence would be a category of sheaves on the ind-algebraic stack constructed by Emerton and Gee or perhaps its derived variant. On the other hand, the automorphic side of the correspondence would be a derived category of dg-modules over the derived Hecke algebra studied by Schneider.