Characteristic cycles, micro local packets and packets with cohomology
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- by Nicolás Arancibia Robert PDF
- Trans. Amer. Math. Soc. 375 (2022), 997-1049
Abstract:
Relying on work of Kashiwara-Schapira and Schmid-Vilonen, we describe the behaviour of characteristic cycles with respect to the operation of geometric induction, the geometric counterpart of taking parabolic or cohomological induction in representation theory. By doing this, we are able to describe to some extent the characteristic cycle associated to an induced representation, in terms of the characteristic cycle of the representation being induced. More precisely, under the hypothesis that the infinitesimal character is regular (and dominant), we show that the characteristic cycle of an induced representation splits in two terms. We describe the first term precisely, but we are not able to do the same for the second one. What we are able to say, is that this second term is supported on the boundary of the space generated by the inclusion in the flag variety of $G$, of the flag variety of the Levi subgroup. As a consequence, we prove that the cohomology packets defined by Adams and Johnson in [Compositio Math. 64 (1987), pp. 271–309] are micro-packets, that is to say that the cohomological constructions of provided by Adams and Johnson are particular cases of the sheaf-theoretic ones provided by Adams, Barbasch, and Vogan Jr. [The Langlands classification and irreducible characters for real reductive groups, Birkhäuser Boston, Inc., Boston, MA, 1992].References
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Additional Information
- Nicolás Arancibia Robert
- Affiliation: Département de Mathématiques - CY-Tech, CY Cergy Paris Université, Avenue du Parc, 95000 Cergy-Pontoise Cedex, France
- Email: nicolas.arancibia-robert@cyu.fr
- Received by editor(s): September 17, 2019
- Received by editor(s) in revised form: May 25, 2020, October 18, 2020, and May 22, 2021
- Published electronically: December 2, 2021
- © Copyright 2021 by the author
- Journal: Trans. Amer. Math. Soc. 375 (2022), 997-1049
- MSC (2020): Primary 22E50; Secondary 22E47
- DOI: https://doi.org/10.1090/tran/8492
- MathSciNet review: 4369242