Mapping class group

Results: 100



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1The moduli and mapping class group  M. Verbitsky, version 1.1 Hyperkahler SYZ conjecture and multiplier ideal sheaves

The moduli and mapping class group M. Verbitsky, version 1.1 Hyperkahler SYZ conjecture and multiplier ideal sheaves

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Source URL: verbit.ru

Language: English - Date: 2009-06-08 01:21:31
    2New York Journal of Mathematics New York J. Math–573. An acylindricity theorem for the mapping class group Kenneth J. Shackleton

    New York Journal of Mathematics New York J. Math–573. An acylindricity theorem for the mapping class group Kenneth J. Shackleton

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    Source URL: nyjm.albany.edu

    Language: English - Date: 2010-12-02 23:09:02
      3New York Journal of Mathematics New York J. Math–250. Representations of surface groups with finite mapping class group orbits Indranil Biswas, Thomas Koberda, Mahan Mj

      New York Journal of Mathematics New York J. Math–250. Representations of surface groups with finite mapping class group orbits Indranil Biswas, Thomas Koberda, Mahan Mj

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      Source URL: nyjm.albany.edu

      - Date: 2018-02-28 15:04:37
        4New York Journal of Mathematics New York J. Math–573. An acylindricity theorem for the mapping class group Kenneth J. Shackleton

        New York Journal of Mathematics New York J. Math–573. An acylindricity theorem for the mapping class group Kenneth J. Shackleton

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        Source URL: nyjm.albany.edu

        - Date: 2010-12-02 23:11:55
          5New York Journal of Mathematics New York J. Math–250. Representations of surface groups with finite mapping class group orbits Indranil Biswas, Thomas Koberda, Mahan Mj

          New York Journal of Mathematics New York J. Math–250. Representations of surface groups with finite mapping class group orbits Indranil Biswas, Thomas Koberda, Mahan Mj

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          Source URL: nyjm.albany.edu

          - Date: 2018-02-28 15:04:36
            6LOW–DIMENSIONAL LINEAR REPRESENTATIONS OF MAPPING CLASS GROUPS. MUSTAFA KORKMAZ Let S denote a compact connected orientable surface of genus g and let Mod(S) denote the mapping class group of it, the group of isotopy c

            LOW–DIMENSIONAL LINEAR REPRESENTATIONS OF MAPPING CLASS GROUPS. MUSTAFA KORKMAZ Let S denote a compact connected orientable surface of genus g and let Mod(S) denote the mapping class group of it, the group of isotopy c

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            Source URL: faculty.ms.u-tokyo.ac.jp

            - Date: 2013-04-12 00:04:59
              7Generalized Torelli Groups  Inaugural-Dissertation zur Erlangung des Doktorgrades der Mathematisch-Naturwissenschaftlichen Fakult¨at

              Generalized Torelli Groups Inaugural-Dissertation zur Erlangung des Doktorgrades der Mathematisch-Naturwissenschaftlichen Fakult¨at

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              Source URL: www.math.uni-bonn.de

              Language: English - Date: 2008-12-18 07:05:03
              8Moduli Spaces Two Riemann surfaces of the same topological type can, of course, be conformally inequivalent; but how many conformal structures are there, and how can one deform them ? Take for example an annulus A(r, R)

              Moduli Spaces Two Riemann surfaces of the same topological type can, of course, be conformally inequivalent; but how many conformal structures are there, and how can one deform them ? Take for example an annulus A(r, R)

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              Source URL: www.math.uni-bonn.de

              Language: English - Date: 2011-02-14 06:36:11
              9417  Documenta Math. Stable Cohomology of the Universal Picard Varieties and the Extended Mapping Class Group

              417 Documenta Math. Stable Cohomology of the Universal Picard Varieties and the Extended Mapping Class Group

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              Source URL: documenta.sagemath.org

              Language: English - Date: 2012-07-08 05:24:28
              10Configuration Spaces The n-th ordered configuration space C˜ n (M ) of a space M is the space of all n-tupels (ζ1 , . . . , ζn ) of distinct points in M ; and the quotient C n (M ) = C˜ n (M )/Sn by the free action o

              Configuration Spaces The n-th ordered configuration space C˜ n (M ) of a space M is the space of all n-tupels (ζ1 , . . . , ζn ) of distinct points in M ; and the quotient C n (M ) = C˜ n (M )/Sn by the free action o

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              Source URL: www.math.uni-bonn.de

              Language: English - Date: 2011-02-14 06:36:05