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A publicação pode ser exportada nos seguintes formatos: referência da APA (American Psychological Association), referência do IEEE (Institute of Electrical and Electronics Engineers), BibTeX e RIS.

Exportar Referência (APA) 
Mendes, S. (2022). Langlands functoriality: a view from C*-algebras. Workshop on Operator Theory, Complex Analysis, and Applications 2022 - WOTCA 2022.
Exportar Referência (IEEE) 
S. M. Mendes,  "Langlands functoriality: a view from C*-algebras", in Workshop on Operator Theory, Complex Analysis, and Applications 2022 - WOTCA 2022, 2022
Exportar BibTeX 
@misc{mendes2022_1766529932677,
	author = "Mendes, S.",
	title = "Langlands functoriality: a view from C*-algebras",
	year = "2022",
	url = "https://sites.google.com/view/wotca22"
}
Exportar RIS 
TY  - CPAPER
TI  - Langlands functoriality: a view from C*-algebras
T2  - Workshop on Operator Theory, Complex Analysis, and Applications 2022 - WOTCA 2022
AU  - Mendes, S.
PY  - 2022
UR  - https://sites.google.com/view/wotca22
AB  - The local Langlands correspondence can be seen as a non abelian generalization of class field theory. Roughly, it is a correspondence between the "Galois side" of finite dimensional representations of the Weil group $W_F$, F a local field, and the "admissible side" of admissible representations of $GL_n(F)$. In this talk we will address base change and automorphic induction using the
K-theory of the reduced group C*-algebra $C^*_r(GLn_(F))$. The Langlands correspondence will then be used to create a structure of a complex algebraic variety on the admissible dual of GLn(F) as in [1].

ER  -