Local Base Change via Tate Cohomology

TL;DR

This paper establishes a new method for realizing cyclic base change in local fields of characteristic zero using Tate cohomology, connecting Galois invariance, modular reductions, and Langlands functoriality.

Contribution

It introduces a novel approach linking Tate cohomology with base change for prime degree extensions, confirming a special case of a conjecture by Treumann and Venkatesh.

Findings

Tate cohomology characterizes base change for Galois-invariant representations.

Mod l reductions are in base change iff Tate cohomology matches Frobenius twist.

Proves a specific case of a conjecture relating linkage and Langlands functoriality.

Abstract

In this paper we propose a new way to realize cyclic base change (a special case of Langlands functoriality) for prime degree extensions of characteristic zero local fields. Let $F / E$ be a prime degree $l$ extension of local fields of residue characteristic $p \neq l$. Let $\pi$ be an irreducible cuspidal $l$-adic representation of $\mathrm{GL}_n(E)$ and $\rho$ be an irreducible cuspidal $l$-adic representation of $\mathrm{GL}_n(F)$ which is Galois-invariant. Under some minor technical conditions on $\pi$ and $\rho$ (for instance, we assume that both are level zero) we prove that the $\bmod l$-reductions $r_l(\pi)$ and $r_l(\rho)$ are in base change if and only if the Tate cohomology of $\rho$ with respect to the Galois action is isomorphic, as a modular representation of $\mathrm{GL}_n(E)$, to the Frobenius twist of $r_l(\pi)$. This proves a special case of a conjecture of Treumann and Venkatesh as they investigate the relationship between linkage and Langlands functoriality.