Search Results

The Langlands correspondence for higher local fields is still at an early stage of development. I haven't really kept up with it, but here's some key points. As the question stated, and Loren commen …

The general conjectural picture is the Gross-Prasad conjecture, found in Section 2 of Gross and Prasad's paper "On the decomposition of a representation of $SO_n$ when restricted to $SO_{n−1}$." The …

This is a common point of confusion, and the OP is on exactly the right track. A good reference for the representation theory is Chapter 1, Section 6, of Jacquet-Langlands book "Automorphic forms on …

Basically, no. Marc Palm's answer addresses L-functions, but that is a long long way from determining the irrep -- you'd need L-functions and epsilon-factors of twists, plus an impressive ability to …

I'll leave the dihedral and octahedral case to others, but for the tetrahedral ($A_4$) and icosahedral ($A_5$) case, I can give some answer. For the tetrahedral case, the smallest conductor is 163. …

I've just realized that I don't understand something important and basic about the Weil-Deligne group and its representations. (I'm not very surprised by this). Following Deligne's article, Section …

This answer will necessarily be full of conjecture, but I'll try to make things more concrete for some classical groups. For a reductive group $G$, and smooth irreducible representation $(\pi, V)$ of …

First, I'd like to second the reference given by JT: David Vogan, "The local Langlands conjecture", appearing in Representation Theory of Groups and Algebras (J. Adams et al., eds. Contemporary Mathe …