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Matsuki correspondence for sheaves

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References

  • [BB1] Beilinson, A., Bernstein, J.: Localisations deg-modules. C.R. Acad. Sci., Paris292, 15–18 (1981)

    Google Scholar 

  • [BB2] Beilinson A., Bernstein, J.: Proof of Jantzen's conjecture. (Preprint)

  • [BBD] Beilinson, A., Bernstein, J., Deligne, P.: Faisceaux pervers. Astérisque100 (1982)

  • [BL] Bernstein, J., Lunts, V.: Equivariant derived categories. (Preprint)

  • [K] Kashiwara, M.: Open problems. Proceedings of Taniguchi symposium at Katata (1986)

  • [KS] Kashiwara, M., Schapira, P.: Sheaves on manifolds. Berlin Heidelberg New York: Springer (1990)

    Google Scholar 

  • [Ma1] Matsuki, T.: The orbits of affine symmetric spaces under the action of minimal parabolic subgroups. J. Math. Soc. Japan31, 331–357 (1979)

    Google Scholar 

  • [Ma2] Matsuki, T.: Orbits on affine symmetric spaces under the action of parabolic subgroups. Hiroshima Math. J.12, 307–320 (1983)

    Google Scholar 

  • [Ma3] Matsuki, T.: Closure relations for orbits on affine symmetric spaces under the action of parabolic subgroups and Intersections of associated orbits. Hiroshima Math. J.18, 59–67 (1988)

    Google Scholar 

  • [Ma4] Matsuki, T.: Orbits on flag manifolds, to appear in Proc. International Congress of Mathematicians, 1990, Kyoto

  • [MV] Mirković, I., Vilonen, K.: Characteristic varieties of character shaves. Invent. Math.93, 405–418 (1988)

    Google Scholar 

  • [N] Ness, L: A stratification of the null cone via the moment map. Am. J. Math.106, 1281–1325 (1984)

    Google Scholar 

  • [So] Sorgel, W.:n-cohomology of simple highest weight modules of the walls and purity. Invent. Math.98, 565–580 (1989)

    Google Scholar 

  • [SV] Scmid, W., Vilonen, K.: Characters, fixed points and Osborn's conjecture (announcement). (Preprint)

  • [Sp] Springer, A.: A purity result for fixed point varieties in flag manifolds. J. Fac. Sci., Univ. Tokyo, Sect. IA31, 271–282 (1984)

    Google Scholar 

  • [U] Uzawa, T.: Invariant hyperfunction sections of line bundles, Thesis, 1990, Yale University, New Haven

    Google Scholar 

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Authors and Affiliations

  1. Mathematics Department, University of Massachusetts, 01003, Amherst, MA

    I. Mirković

  2. Pennsylvania State University, 16802, University Park, PQ

    T. Uzawa

  3. University of Tokyo, Tokyo, Japan

    T. Uzawa

  4. Brandeis University, 02254, Watham, MA

    K. Vilonen

Authors
  1. I. Mirković
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  2. T. Uzawa
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  3. K. Vilonen
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Oblatum 13-IX-1991

Supported in part by NSF grants.

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Mirković, I., Uzawa, T. & Vilonen, K. Matsuki correspondence for sheaves. Invent Math 109, 231–245 (1992). https://doi.org/10.1007/BF01232026

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