Abstract
These notes give an overview of results obtained jointly with Ahmed Moussaoui and Maarten Solleveld on the local Langlands correspondence, focusing on the links of the latter with both the generalized Springer correspondence and the geometric conjecture, the so-called ABPS Conjecture, introduced in collaboration with Paul Baum, Roger Plymen and Maarten Solleveld.
It is a pleasure to acknowledge the excellent comments and questions of the workshop participants.
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References
P. Achar, A. Henderson, D. Juteau, S. Riche, Modular generalized Springer correspondence I: the general linear group. J. Eur. Math. Soc. (JEMS) 18(7), 1405–1436 (2016)
J. Arthur, A note on \(L\)-packets. Pure Appl. Math. Q. 2(1), 199–217 (2006)
J. Arthur, The Endoscopic Classification of Representations: Orthogonal and Symplectic Groups, Colloquium Publications, vol. 61 (American Mathematical Society, 2013)
M. Asgari, K. Choiy, The local Langlands conjecture for \(p\)-adic \({\rm GSpin}_4\), \({\rm GSpin}_6\), and their inner forms. Forum Math. 29(6), 1261–1290 (2017)
A.-M. Aubert, Around the Langlands program. Jahresber. Dtsch. Math.-Ver. 120(1), 3–40 (2018)
A.-M. Aubert, P.F. Baum, R.J. Plymen, M. Solleveld, On the local Langlands correspondence for non-tempered representations. Münster J. Math. 7(1), 27–50 (2014)
A.-M. Aubert, P.F. Baum, R.J. Plymen, M. Solleveld, Geometric structure in smooth dual and local Langlands correspondence. Japan. J. Math. 9, 99–136 (2014)
A.-M. Aubert, P.F. Baum, R.J. Plymen, M. Solleveld, Depth and the local Langlands correspondence, in Arbeitstagung Bonn 2013, in Memory of Friedrich Hirzebruch W. Ballmann, C. Blohmann, G. Faltings, P. Teichner, et D. Zagier, Progr. Math. vol. 319 (Birkhäuser/Springer, Berlin, 2016), pp. 17–41
A.-M. Aubert, P.F. Baum, R.J. Plymen, M. Solleveld, The local Langlands correspondence for inner forms of \({\rm SL}_n\). Res. Math. Sci. 3 (2016), Paper No. 32, 34 p
A.-M. Aubert, P.F. Baum, R.J. Plymen, M. Solleveld, Hecke algebras for inner forms of \(p\)-adic special linear groups. J. Inst. Math. Jussieu 16(2), 351–419 (2017)
A.-M. Aubert, P.F. Baum, R.J. Plymen, M. Solleveld, The principal series of \(p\)-adic groups with disconnected centre. Proc. Lond. Math. Soc. (3) 114(5), 798–854 (2017)
A.-M. Aubert, P.F. Baum, R.J. Plymen, M. Solleveld, Conjectures about \(p\)-adic groups and their noncommutative geometry, in Around Langlands Correspondences, Contemp. Math. vol. 691 (Amer. Math. Soc., Providence, RI, 2017), pp. 15–51
A.-M. Aubert, P.F. Baum, R.J. Plymen, M. Solleveld, The noncommutative geometry of inner forms of \(p\)-adic special linear groups. arXiv:1505.04361 [math.RT]
A.-M. Aubert, S. Mendes, R. Plymen, M. Solleveld, \(L\)-packets and depth for \({\rm SL}_2(K)\) with \(K\) a local function field of characteristic \(2\). Int. J. Number Theory 13(10), 2545–2568 (2017)
A.-M. Aubert, A. Moussaoui, M. Solleveld, Generalizations of the Springer correspondence and cuspidal Langlands parameters. Manuscripta Math. 1–72 (2018). https://doi.org/10.1007/s00229-018-1001-8
A.-M. Aubert, A. Moussaoui, M. Solleveld, Graded Hecke algebras for disconnected reductive groups, to appear in the Proceedings of the Simons Symposium 2017, Geometric Aspects of the Trace Formula
A.-M. Aubert, A. Moussaoui, M. Solleveld, Affine Hecke algebras for Langlands parameters. arXiv:1701.03593
J. Bernstein, P. Deligne, Le “centre” de Bernstein, in Représentations des groupes réductifs sur un corps local (Travaux en cours, Hermann, 1984), pp. 1–32
J. Bernstein, V. Lunts, Equivariant Sheaves and Functors. Lecture Notes in Mathematics, vol. 1578 (Springer, Berlin, 1994)
J. Bernstein, A. Zelevinsky, representations of the group \({\rm GL}(n, F)\) where \(F\) is a non-Archimedean local field. Russian Math. Surveys 31(3), 1–68 (1976)
A. Borel, Automorphic \(L\)-functions. Proc. Symp. Pure Math 33(2), 27–61 (1979)
C. Bushnell, G. Henniart, The essentially tame local Langlands correspondence, III: the general case. Proc. Lond. Math. Soc. (3) 101(2), 497–553 (2010)
K. Choiy, The local Langlands conjecture for the \(p\)-adic inner form of \({\rm Sp}_4\). Int. Math. Res. Not. IMRN 6, 1830–1889 (2017)
C.W. Curtis, I. Reiner, Representation Theory of Finite Groups and Associative Algebras, Pure and Applied Mathematics, vol 11 (Wiley, New York, 1962)
S. DeBacker, M. Reeder, Depth-zero supercuspidal \(L\)-packets and their stability. Ann. of Math. (2) 169(3), 795–901 (2009)
Y. Feng, E. Opdam, M. Solleveld, Supercuspidal unipotent representations: \(L\)-packets and formal degrees. arXiv:1805.01888
W.T. Gan, S. Takeda, The local Langlands conjecture for \({\rm GSp}(4)\). Ann. Math. (2) 173(3), 1841–1882 (2011)
W.T. Gan, S. Takeda, The local Langlands conjecture for \({\rm Sp}(4)\). Int. Math. Res. Not. IMRN 15, 2987–3038 (2010)
W.T. Gan, W. Tantono, The local Langlands conjecture for \({\rm GSp}(4)\), II: the case of inner forms. Am. J. Math. 136(3), 761–805 (2014)
R. Ganapathy, The local Langlands correspondence for \({\rm GSp}_4\) over local function fields. Amer. J. Math. 137(6), 1441–1534 (2015)
R. Ganapathy, S. Varma, On the local Langlands correspondence for split classical groups over local function fields. J. Inst. Math. Jussieu 16(5), 987–1074 (2017)
R. Godement, H. Jacquet, Zeta Functions of Simple Algebras. Lecture Notes in Mathematics, vol. 260 (Springer, Berlin, 1972)
T.J. Haines, The stable Bernstein center and test functions for Shimura varieties, in Automorphic Forms and Galois Representations, London Mathematical Society Lecture Note Series, vol. 415 (Cambridge University Press, Cambridge, 2014), pp. 118–186
M. Harris, R. Taylor, The Geometry and Cohomology of Some Simple Shimura Varieties, Annals of Math. Studies, vol. 151 (Princeton University Press, Princeton, 2001)
G. Henniart, Une preuve simple des conjectures de Langlands pour \({\rm GL}(n)\) sur un corps \(p\)-adique. Inventiones Mathematicae 139, 439–455 (2000)
K. Hiraga, H. Saito, On \(L\)-packets for inner forms of \({\rm SL}_n\). Mem. Amer. Math. Soc. 1013, vol. 215 (2012)
D. Jiang, C. Nien, On the local Langlands conjecture and related problems over \(p\)-adic local fields, in Proceedings of the Sixth International Congress of Chinese Mathematicians vol I, 309–325, Adv. Lect. Math. (ALM), vol. 36 (Int. Press, Somerville, MA, 2017)
D. Jiang, C. Nien, The local Langlands conjectures for non-quasi-split groups, in Families of Automorphic Forms and the Trace Formula (Springer, Berlin, 2016), pp. 217–257 (Simons Symp.)
T. Kaletha, Global rigid inner forms and multiplicities of discrete automorphic representations. Invent. Math. 213(1), 271–369 (2018)
T. Kaletha, A. Minguez, S.W. Shin, P.-J. White, Endoscopic classification of representations: inner forms of unitary groups. arXiv:1409.3731
R. Kottwitz, Stable trace formula: cuspidal tempered terms. Duke Math. J. 51(3), 611–650 (1984)
G. Laumon, M. Rapoport, U. Stuhler, \(\cal{D}\)-elliptic sheaves and the Langlands correspondence. Invent. Math. 113, 217–238 (1993)
L. Lomeli, Langlands program and Ramanujan conjecture: a survey (Preprint, 2018)
G. Lusztig, Some examples of square-integrable representations of semisimple \(p\)-adic groups. Trans. Am. Math. Soc. 277, 623–653 (1983)
G. Lusztig, Intersection cohomology complexes on a reductive group. Invent. Math. 75(2), 205–272 (1984)
G. Lusztig, Fourier transforms on a semisimple Lie algebra over \({\mathbb{F}_q}\), in Algebraic Groups
G. Lusztig, Classification of unipotent representations of simple \(p\)-adic groups. Int. Math. Res. Notices 11, 517–589 (1995)
G. Lusztig, Classification of unipotent representations of simple \(p\)-adic groups. II. Represent. Theory 6, 243–289 (2002)
G. Lusztig, Character sheaves on disconnected groups. V. Represent. Theory 8, 346–376 (2004)
M. Mishra, B. Pattanayak, A note on depth preservation. To appear in J Ramanujan Math. Soc. arXiv:1903.10771
C.P. Mok, Endoscopic classification of representations of quasi-split unitary groups. Mem. Amer. Math. Soc. 235 (2015), no. 1108, vi+248 p
A. Moussaoui, Centre de Bernstein dual pour les groupes classiques. Represent. Theory 21, 172–246 (2017)
A. Moussaoui, Proof of the Aubert-Baum-Plymen-Solleveld conjecture for split classical groups, in Around Langlands correspondences, Contemp. Math., vol. 691 (Amer. Math. Soc., Providence, RI, 2017), pp. 257–281
A. Moy, G. Prasad, Jacquet functors and unrefined minimal \(K\)-types. Comment. Math. Helv. 71(1), 98–121 (1996)
M. Oi, Depth preserving property of the local Langlands correspondence for quasi-split classical groups in a large residual characteristic. arXiv:1804.10901
P. Scholze, The local Langlands correspondence for \({\rm GL}_n\) over \(p\)-adic fields. Invent. Math. 192, 663–715 (2013)
J.-P. Serre, Corps Locaux (Hermann, Paris, 1962)
A. Silberger, W. Zink, Langlands classification for \(L\)-parameters. J. Algebra
T.A. Springer, Linear Algebraic Groups 2nd ed., Progress in Mathematics, vol. 9 (Birkhäuser, 1998)
J. Tate, Number theoretic background. Proc. Symp. Pure Math 33(2), 3–26 (1979)
D. Vogan, The local Langlands conjecture, in Representation Theory of Groups and Algebras, Contemp. Math., vol. 145 (American Mathematical Society, 1993), pp. 305–379
B. Xu, On a lifting problem of \(L\)-packets. Compos. Math. 152(9), 1800–1850 (2016)
J.-K. Yu, On the local Langlands correspondence for tori, in Ottawa Lectures on Admissible Representations of Reductice p-adic Groups, Fields Institute Monographs (American Mathemical Society, 2009), pp. 177–183
A.V. Zelevinsky, Induced representations of reductive \(p\)-adic groups II. On irreducible representations of \({\rm GL}(n)\), Ann. Sci. École Norm. Sup. (4) 13(2), 165–210 (1980)
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Aubert, AM. (2019). Local Langlands and Springer Correspondences. In: Aubert, AM., Mishra, M., Roche, A., Spallone, S. (eds) Representations of Reductive p-adic Groups. Progress in Mathematics, vol 328. Birkhäuser, Singapore. https://doi.org/10.1007/978-981-13-6628-4_1
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