Extendible Functions and Local Root Numbers Remarks on a paper of R.P. Langlands

Abstract

This paper refers to Langlands' big set of notes [L] devoted to the question if the (normalized) local Hecke-Tate root number =(E,), where E is a finite separable extension of a fixed non-archimedean local field F, and a quasicharacter of E×, can be appropriately extended to a local -factor =(E,) for all virtual representations of the corresponding Weil group WE. Whereas Deligne [D] has given a relatively short proof by using the global Artin-Weil L-functions, the proof of Langlands is purely local and splits into two parts: the algebraic part to find a minimal set of relations for the functions , such that the existence (and uniqueness) of will follow from these relations; and the more extensive arithmetic part to give a direct proof that all these relations are actually fulfilled. Our aim is to cover the algebraic part of Langlands' notes which can be done completely in the framework of representations of solvable profinite groups, where two modifications of Brauer's theorem play a prominent role. Introduction / 1. The notion of extendible functions / 2. The kernel of the Brauer map and its generating relations / 3. A criterion for the extendibility of functions / 4. Recovering Theorem 3.1 for the case of local root numbers / Appendices A1. Proving Brauer 3 and Brauer 4 / A2. On type-III-groups.

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