Differential geometry

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1Résumé des travaux Claire Debord Liste des publications présentées [1] Claire Debord, Local integration of Lie algebroids. Lie algebroids and related topics in differential geometry (Warsaw, 2000), Banach Center Publ

Résumé des travaux Claire Debord Liste des publications présentées [1] Claire Debord, Local integration of Lie algebroids. Lie algebroids and related topics in differential geometry (Warsaw, 2000), Banach Center Publ

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Source URL: math.univ-bpclermont.fr

Language: French - Date: 2018-03-05 11:11:22
    2Global Differential Geometry Workshop February 26-March 2, 2018 NO. Type

    Global Differential Geometry Workshop February 26-March 2, 2018 NO. Type

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    Source URL: msc.tsinghua.edu.cn

    Language: English
      3New Perspectives in Geometric Combinatorics MSRI Publications Volume 38, 1999 Combinatorial Differential Topology and Geometry

      New Perspectives in Geometric Combinatorics MSRI Publications Volume 38, 1999 Combinatorial Differential Topology and Geometry

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      Source URL: library.msri.org

      Language: English - Date: 2000-04-13 22:22:31
        4Open Problems in Discrete Differential Geometry ¨ nter Rote Collected by Gu ¨ bius strip and paper cylinPROBLEM 1 (Sergei Tabachnikov). Paper Mo der eversion One can make a smooth M¨

        Open Problems in Discrete Differential Geometry ¨ nter Rote Collected by Gu ¨ bius strip and paper cylinPROBLEM 1 (Sergei Tabachnikov). Paper Mo der eversion One can make a smooth M¨

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        Source URL: page.mi.fu-berlin.de

        Language: English - Date: 2015-04-13 14:44:02
          5j. differential geometry OPTIMAL RIGIDITY ESTIMATES FOR NEARLY UMBILICAL SURFACES ¨ ller

          j. differential geometry OPTIMAL RIGIDITY ESTIMATES FOR NEARLY UMBILICAL SURFACES ¨ ller

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          Source URL: www.math.uzh.ch

          - Date: 2011-04-23 08:30:48
            66. PROBLEM SET FOR “DIFFERENTIAL GEOMETRY II” AKA “ANALYSIS AND GEOMETRY ON MANIFOLDS” WINTER TERMProblem 16. Let ∆ be a C ∞ n-plane distribution on M m . Show that the following two statements, whic

            6. PROBLEM SET FOR “DIFFERENTIAL GEOMETRY II” AKA “ANALYSIS AND GEOMETRY ON MANIFOLDS” WINTER TERMProblem 16. Let ∆ be a C ∞ n-plane distribution on M m . Show that the following two statements, whic

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            Source URL: carsten.codimi.de

            - Date: 2013-09-23 06:51:00
              7Corrections/comments to Cartan for Beginners: Differential Geometry via Moving Frames and Exterior Differential Systems Thomas A. Ivey and J.M. Landsberg. Graduate Studies in Mathematics, vol. 61,

              Corrections/comments to Cartan for Beginners: Differential Geometry via Moving Frames and Exterior Differential Systems Thomas A. Ivey and J.M. Landsberg. Graduate Studies in Mathematics, vol. 61,

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              Source URL: www.math.tamu.edu

              - Date: 2006-05-12 09:44:15
                87. PROBLEM SET FOR “DIFFERENTIAL GEOMETRY II” AKA “ANALYSIS AND GEOMETRY ON MANIFOLDS” WINTER TERMProblem 20. We consider S2 with the Riemannian

                7. PROBLEM SET FOR “DIFFERENTIAL GEOMETRY II” AKA “ANALYSIS AND GEOMETRY ON MANIFOLDS” WINTER TERMProblem 20. We consider S2 with the Riemannian

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                Source URL: carsten.codimi.de

                - Date: 2013-09-23 06:51:00
                  9FROM THE 8TH PROBLEM SET FOR “DIFFERENTIAL GEOMETRY II” AKA “ANALYSIS AND GEOMETRY ON MANIFOLDS” WINTER TERMProblem 25. Let θ ∈

                  FROM THE 8TH PROBLEM SET FOR “DIFFERENTIAL GEOMETRY II” AKA “ANALYSIS AND GEOMETRY ON MANIFOLDS” WINTER TERMProblem 25. Let θ ∈

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                  Source URL: carsten.codimi.de

                  - Date: 2013-09-23 06:51:00
                    109. PROBLEM SET FOR “DIFFERENTIAL GEOMETRY II” AKA “ANALYSIS AND GEOMETRY ON MANIFOLDS” WINTER TERMV Problem 26. Let M be a manifold and ω ∈ 1 (M ). Let a, b ∈ R, a < b, and

                    9. PROBLEM SET FOR “DIFFERENTIAL GEOMETRY II” AKA “ANALYSIS AND GEOMETRY ON MANIFOLDS” WINTER TERMV Problem 26. Let M be a manifold and ω ∈ 1 (M ). Let a, b ∈ R, a < b, and

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                    Source URL: carsten.codimi.de

                    - Date: 2013-09-23 06:51:00