Minimal surfaces

Results: 79



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1Automorphisms of Rational Surfaces with Positive Entropy J ULIE D E´ SERTI & J ULIEN G RIVAUX A BSTRACT. A complex compact surface which carries a minimal automorphism of positive topological entropy has been proved by

Automorphisms of Rational Surfaces with Positive Entropy J ULIE D E´ SERTI & J ULIEN G RIVAUX A BSTRACT. A complex compact surface which carries a minimal automorphism of positive topological entropy has been proved by

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Source URL: jgrivaux.perso.math.cnrs.fr

Language: English - Date: 2016-04-27 12:14:30
2Proc. Int. Cong. of Math. – 2018 Rio de Janeiro, Vol–714) ALGEBRAIC SURFACES WITH MINIMAL BETTI NUMBERS JongHae Keum (금종해)

Proc. Int. Cong. of Math. – 2018 Rio de Janeiro, Vol–714) ALGEBRAIC SURFACES WITH MINIMAL BETTI NUMBERS JongHae Keum (금종해)

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Source URL: eta.impa.br

Language: English - Date: 2018-07-25 13:17:42
3MINIMAL AND CONSTANT MEAN CURVATURE SURFACES IN THE THREE-SPHERE: BRENDLE’S PROOF OF THE LAWSON CONJECTURE BEN ANDREWS Minimal surfaces (surfaces of least area) and related objects such as constant mean curvature surfa

MINIMAL AND CONSTANT MEAN CURVATURE SURFACES IN THE THREE-SPHERE: BRENDLE’S PROOF OF THE LAWSON CONJECTURE BEN ANDREWS Minimal surfaces (surfaces of least area) and related objects such as constant mean curvature surfa

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Source URL: www.math.sci.hokudai.ac.jp

Language: English - Date: 2013-04-22 22:26:40
    4arXiv:1601.07588v1 [math.DG] 27 JanFREE BOUNDARY MINIMAL SURFACES IN THE UNIT BALL WITH LOW COHOMOGENEITY BRIAN FREIDIN, MAMIKON GULIAN AND PETER MCGRATH

    arXiv:1601.07588v1 [math.DG] 27 JanFREE BOUNDARY MINIMAL SURFACES IN THE UNIT BALL WITH LOW COHOMOGENEITY BRIAN FREIDIN, MAMIKON GULIAN AND PETER MCGRATH

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    Source URL: arxiv.org

    Language: English - Date: 2016-01-28 20:24:54
      5SHARP AREA BOUNDS FOR FREE BOUNDARY MINIMAL SURFACES IN CONFORMALLY EUCLIDEAN BALLS arXiv:1510.01988v4 [math.DG] 2 JulBrian Freidin & Peter McGrath

      SHARP AREA BOUNDS FOR FREE BOUNDARY MINIMAL SURFACES IN CONFORMALLY EUCLIDEAN BALLS arXiv:1510.01988v4 [math.DG] 2 JulBrian Freidin & Peter McGrath

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      Source URL: arxiv.org

      Language: English - Date: 2018-07-02 20:46:39
        6STABLE EMBEDDED MINIMAL SURFACES BOUNDED BY A STRAIGHT LINE ´ JOAQU´IN PEREZ Abstract. We prove that if M ⊂ R3 is a properly embedded oriented stable minimal surface whose boundary is a straight line and the area of

        STABLE EMBEDDED MINIMAL SURFACES BOUNDED BY A STRAIGHT LINE ´ JOAQU´IN PEREZ Abstract. We prove that if M ⊂ R3 is a properly embedded oriented stable minimal surface whose boundary is a straight line and the area of

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        Source URL: www.ugr.es

        - Date: 2006-01-09 04:40:29
          7The space of complete minimal surfaces with finite total curvature as lagrangian submanifold Joaqu´ın P´erez∗ Antonio Ros∗

          The space of complete minimal surfaces with finite total curvature as lagrangian submanifold Joaqu´ın P´erez∗ Antonio Ros∗

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          Source URL: www.ugr.es

          - Date: 2001-03-13 07:19:23
            8A rigidity theorem for periodic minimal surfaces Joaqu´ın P´erez∗ September 9, 1997 Abstract.- We prove that the Helicoid can be characterized as the only properly embedded non rigid minimal surface in R3 that is in

            A rigidity theorem for periodic minimal surfaces Joaqu´ın P´erez∗ September 9, 1997 Abstract.- We prove that the Helicoid can be characterized as the only properly embedded non rigid minimal surface in R3 that is in

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            Source URL: www.ugr.es

            - Date: 2001-03-13 07:19:30
              9The geometry of minimal surfaces of finite genus II; nonexistence of one limit end examples. William H. Meeks III∗, Joaqu´ın P´erez† and Antonio Ros† March 29, 2004 Abstract

              The geometry of minimal surfaces of finite genus II; nonexistence of one limit end examples. William H. Meeks III∗, Joaqu´ın P´erez† and Antonio Ros† March 29, 2004 Abstract

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              Source URL: www.ugr.es

              - Date: 2004-04-13 05:00:17
                10Parabolicity and Gauss map of minimal surfaces Joaqu´ın P´erez∗ Francisco J. L´opez October 25, 2001

                Parabolicity and Gauss map of minimal surfaces Joaqu´ın P´erez∗ Francisco J. L´opez October 25, 2001

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                Source URL: www.ugr.es

                - Date: 2011-12-20 04:07:46