UBC Number Theory Seminar: Emanuele Bodon

Let $F$ be the field of $p$-adic numbers (or, more generally, a non-
archimedean local field) and let $G$ be $\mathrm{GL}_n(F)$ (or, more generally, 
the group of $F$-points of a split connected reductive group). In the 
framework of the local Langlands program, one is interested in studying 
certain classes of representations of $G$ (and hopefully in trying to match 
them with certain classes of representations of local Galois groups).

In this talk, we are going to focus on the category of smooth representations 
of $G$ over a field $k$. An important tool to investigate this category is 
given by the functor that, to each smooth representation $V$, attaches its 
subspace of invariant vectors $V^I$ with respect to a fixed compact open 
subgroup $I$ of $G$. The output of this functor is actually not just a $k$-
vector space, but a module over a certain Hecke algebra. The question we are 
going to attempt to answer is: how much information does this functor preserve 
or, in other words, how far is it from being an equivalence of categories? We 
are going to focus, in particular, on the case that the characteristic of $k$ 
is equal to the residue characteristic of $F$ and $I$ is a specific subgroup 
called "pro-$p$ Iwahori subgroup".