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Main Authors: De Martino, Marcelo, Opdam, Eric
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.06346
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author De Martino, Marcelo
Opdam, Eric
author_facet De Martino, Marcelo
Opdam, Eric
contents For an algebraic torus defined over a local (or global) field $F$, a celebrated result of R.P. Langlands establishes a natural homomorphism from the group of continuous cohomology classes of the Weil group, valued in the dual torus, onto the space of complex characters of the rational points of the torus (or automorphic characters in the global case). We expand on this result by detailing its topological aspects. We show that if we topologize the relevant spaces of continuous homomorphisms and continuous cochains using the compact-open topology, Langlands's map becomes a (surjective, finite-to-one) homomorphism of abelian complex Lie groups. Moreover, we demonstrate that, in both the local and global settings, the subset of unramified characters is the identity component of the relevant space of characters. Finally, we compare the group of unramified characters with the Galois (co)invariants of the dual torus.
format Preprint
id arxiv_https___arxiv_org_abs_2410_06346
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A remark on the Langlands correspondence for tori
De Martino, Marcelo
Opdam, Eric
Representation Theory
Number Theory
11R34, 20J06, 22E55
For an algebraic torus defined over a local (or global) field $F$, a celebrated result of R.P. Langlands establishes a natural homomorphism from the group of continuous cohomology classes of the Weil group, valued in the dual torus, onto the space of complex characters of the rational points of the torus (or automorphic characters in the global case). We expand on this result by detailing its topological aspects. We show that if we topologize the relevant spaces of continuous homomorphisms and continuous cochains using the compact-open topology, Langlands's map becomes a (surjective, finite-to-one) homomorphism of abelian complex Lie groups. Moreover, we demonstrate that, in both the local and global settings, the subset of unramified characters is the identity component of the relevant space of characters. Finally, we compare the group of unramified characters with the Galois (co)invariants of the dual torus.
title A remark on the Langlands correspondence for tori
topic Representation Theory
Number Theory
11R34, 20J06, 22E55
url https://arxiv.org/abs/2410.06346