Colette Moeglin (born 1953)[1] is a French mathematician, working in the field of automorphic forms, a topic at the intersection of number theory and representation theory.

Career and distinctions

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Moeglin is a Directeur de recherche at the Centre national de la recherche scientifique and is currently working at the Institut de mathématiques de Jussieu. She was a speaker at the 1990 International Congress of Mathematicians, on decomposition into distinguished subspaces of certain spaces of square-integral automorphic forms.[M91][2]

She was a recipient of the Jaffé prize of the French Academy of Sciences in 2004, "for her work, most notably on the topics of enveloping algebras of Lie algebras, automorphic forms and the classification of square-integrable representations of reductive classical p-adic groups by their cuspidal representations".[3] She was the chief editor of the Journal of the Institute of Mathematics of Jussieu from 2002 to 2006.

She became a member of the Academia Europaea in 2019.[4]

Mathematical contributions

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She has done work both in the pure representation theory of Lie groups real or p-adic (the study of unitary representations of those groups) and in the study of the "automorphic spectrum" of arithmetic groups (the study of those unitary representations which have an arithmetic significance), especially in the area of the Langlands programme. A prominent example of her achievements in the former is her classification, obtained with Jean-Loup Waldspurger, of the non-cuspidal discrete factors in the decomposition into irreducible components of the spaces of square-integrable invariant functions on adelic general linear groups.[MW89] For this purpose it was first necessary to write down in a rigorous form the general theory of Eisenstein series laid down years earlier by Langlands, which they did in a seminar in Paris the content of which was later published in book form.[MW94] Another notable work in the domain, with Waldspurger and Marie-France Vignéras, is a book on the Howe correspondence.[MVW] With Waldspurger, Moeglin completed the proof of the local Gan–Gross–Prasad conjecture for generic L-packets of representations of orthogonal groups in 2012.

She did much work on the programme of James Arthur to classify automorphic representations of classical groups, and she was invited to present Arthur's ultimate solution to his conjectures at the Bourbaki seminar.[M14]

Selected publications

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MVW.
Mœglin, Colette; Vignéras, Marie-France; Waldspurger, Jean-Loup (1987). Correspondances de Howe sur un corps p-adique. Lecture Notes in Mathematics (in French). Vol. 1291. Springer-Verlag, Berlin. ISBN 3-540-18699-9. MR 1041060.
MW89.
Moeglin, C.; Waldspurger, Jean-Loup (1989). "Le spectre résiduel de GL(n)" (PDF). Ann. Sci. Éc. Norm. Supér. 22: 605–674. doi:10.24033/asens.1595. MR 1026752.
M91.
Mœglin, Colette (1991). "Sur les formes automorphes de carré intégrable". Proceedings of the International Congress of Mathematicians, Vol. I, II (Kyoto, 1990) (in French). Math. Soc. Japan, Tokyo. pp. 815–819. MR 1159268.
MW94.
Mœglin, Colette; Waldspurger, Jean-Loup (1994). Décomposition spectrale et séries d'Eisenstein. Une paraphrase de l'Écriture. Progress in Mathematics (in French). Vol. 113. Birkhäuser Verlag, Basel. ISBN 3-7643-2938-6. MR 1261867.
M14.
Moeglin, Colette (2014). "Le spectre discret des groupes classiques (d'après J. Arthur)". Séminaire Bourbaki, volume 2012/2013, exposés 1059-1073. Astérisque (in French). Vol. 361. MR 3289287.

References

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  1. ^ Birth year from ISNI authority control file, retrieved 2018-11-29.
  2. ^ ICM Plenary and Invited Speakers since 1897 Archived 2017-11-24 at the Wayback Machine, International Mathematical Union, retrieved 2016-08-26.
  3. ^ "Prix et distinctions: Le palmarès des lauréats 2004" (PDF). Gazette des Mathématiciens (in French). 103: 49–51. January 2005. Archived from the original (PDF) on 2017-01-16. Retrieved 2016-08-26. pour récompenser son œuvre portant notamment sur les algèbres enveloppantes d'algèbres de Lie, la théorie des formes automorphes et la classification des représentations de carré intégrable des groupes réductifs p-adiques classiques en terme de représentations cuspidales
  4. ^ List of members, Academia Europaea, retrieved 2020-10-02
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