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Total positivity in the De Concini-Procesi Compactification

Author(s): Xuhua He
Journal: Represent. Theory 8 (2004), 52-71.
MSC (2000): Primary 20G20; Secondary 14M15
Posted: April 21, 2004
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Abstract: We study the nonnegative part $\overline{G_{>0}}$ of the De Concini-Procesi compactification of a semisimple algebraic group $G$, as defined by Lusztig. Using positivity properties of the canonical basis and parametrization of flag varieties, we will give an explicit description of $\overline{G_{>0}}$. This answers the question of Lusztig in Total positivity and canonical bases, Algebraic groups and Lie groups (ed. G.I. Lehrer), Cambridge Univ. Press, 1997, pp. 281-295. We will also prove that $\overline{G_{>0}}$ has a cell decomposition which was conjectured by Lusztig.

References:

[DP]
De Concini, C., and C.Procesi, Complete symmetric varieties, Invariant theory (Montecatini 1982), Lect. Notes Math., vol. 996, Springer, 1983, pp. 1-44. MR 85e:14070

[FZ]
Fomin, S., and A. Zelevinsky, Double Bruhat cells and total positivity, J. Amer. Math. Soc. 12 (1999), no. 2, 335-380. MR 2001f:20097

[MR]
Marsh, R., and K. Rietsch, Parametrizations of flag varieties, RT/0307017.

[KL]
Kazhdan, D., and G. Lusztig, Representations of Coxeter groups and Hecke algebras,, Invent. Math. 53 (1979), 165-184. MR 81j:20066

[L1]
Lusztig, G., Total positivity in reductive groups, Lie Theory and Geometry: in honor of Bertram Kostant, Progress in Math. 123 (1994), 531-568. MR 96m:20071

[L2]
Lusztig, G., Total positivity and canonical bases, Algebraic groups and Lie groups (ed. G.I. Lehrer), Cambridge Univ. Press, 1997, pp. 281-295. MR 2000j:20089

[L3]
Lusztig, G., Total positivity in partial flag manifolds, Represent.Theory 2 (1998), 70-78 (electronic). MR 2000b:20060

[L4]
Lusztig, G., Introduction to total positivity, Positivity in Lie theory: open problems (eds. J. Hilgert, J.D. Lawson, K.H. Neeb, E.B. Vinberg), de Gruyter Berlin, 1998, pp. 133-145. MR 99h:20077

[L5]
Lusztig, G., Parabolic character sheaves, I, RT/0302151.

[L6]
Lusztig, G., Parabolic character sheaves, II, RT/0302317.

[R1]
Rietsch, K., Total positivity and real flag varieties, MIT thesis (1998).

[R2]
Rietsch, K., An algebraic cell decomposition of the nonnegative part of a flag variety, J. Algebra 213 (1999), no. 1, 144-154. MR 2000e:14086

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Additional Information:

Xuhua He
Affiliation: Department of Mathematics, Massachusetts Institute of Technology, Cambridge, Massachusetts 02139
Email: hugo@math.mit.edu

DOI: 10.1090/S1088-4165-04-00213-4
PII: S 1088-4165(04)00213-4
Received by editor(s): October 3, 2003 and in revised form, March 10, 2004
Posted: April 21, 2004
Copyright of article: Copyright 2004, American Mathematical Society

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