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Communications in Algebra Volume 47, 2019 - Issue 10
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Original Articles

Self-dual representations of SL(2,F): an approach using the Iwahori–Hecke algebra

Kumar BalasubramanianDepartment of Mathematics, IISER Bhopal, Bhopal, Madhya Pradesh, India; Correspondence[email protected]
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,
K. S. Senthil RaaniDepartment of Mathematics, IISER Berhampur, Berhampur, Odisha, India; View further author information
&
Brahadeesh SankarnarayananDepartment of Mathematics, IIT Bombay, Mumbai, Maharashtra, IndiaView further author information
Pages 4210-4215 | Received 24 Jul 2018, Accepted 29 Jan 2019, Published online: 14 Mar 2019

References

  • Balasubramanian, K. (2013). Self-dual representations with vectors fixed under an Iwahori subgroup. J. Algebra 394: 207–220.
  • Balasubramanian, K. (2016). Self-dual representations of SL(n,F). Proc. Am. Math. Soc. 144(1): 435–444.
  • Bröcker, T., Tom Dieck, T. (1995). Representations of Compact Lie Groups, Graduate Texts in Mathematics, Vol. 98. Translated from the German Manuscript, Corrected Reprint of the 1985 Translation. New York: Springer.
  • Bushnell, C. J., Henniart, G. (2006). The Local Langlands Conjecture for GL(2), Grundlehren Der Mathematischen Wissenschaften, Vol. 335, Berlin: Springer.
  • Cherednik, I., Markov, Y., Howe, R., Lusztig, G. (2002). Iwahori-Hecke Algebras and Their Representation Theory. Lecture Notes in Mathematics, Vol. 1804. Lectures from the C.I.M.E. Summer School held in Martina-Franca, June 28–July 6, 1999, Edited by M. Welleda Baldoni and Dan Barbasch. Berlin: Springer.
  • Prasad, D. (1998). On the self-dual representations of finite groups of lie type. J. Algebra 210(1): 298–310.
  • Prasad, D. (1999). On the self-dual representations of a p-adic group. Int. Math. Res. Notices 1999(8): 443–452.
  • Roche, A., Spallone, S. Signs, Involutions and Jacquet Modules. Preprint: arXiv:1204.4746v1.

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