Riemannian manifolds

Results: 229



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1Extremal functions for the Moser-Trudinger Inequality on Compact Riemannian Manifolds Yuxiang Li Department of Mathematical Sciences, Tsinghua University, Beijing, P.R.China, E-mail address:

Extremal functions for the Moser-Trudinger Inequality on Compact Riemannian Manifolds Yuxiang Li Department of Mathematical Sciences, Tsinghua University, Beijing, P.R.China, E-mail address:

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Source URL: faculty.math.tsinghua.edu.cn

Language: English
    2Moser-Trudinger Inequality On Compact Riemannian Manifolds of Dimension Two Li Yuxiang 1

    Moser-Trudinger Inequality On Compact Riemannian Manifolds of Dimension Two Li Yuxiang 1

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    Source URL: faculty.math.tsinghua.edu.cn

    Language: English - Date: 2006-09-13 12:00:00
      3Inside Out II MSRI Publications Volume 60, 2012 The Calderón problem on Riemannian manifolds

      Inside Out II MSRI Publications Volume 60, 2012 The Calderón problem on Riemannian manifolds

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      Source URL: library.msri.org

      Language: English - Date: 2012-09-30 18:40:03
        4EXTREMAL FUNCTIONS FOR MOSER-TRUDINGER TYPE INEQUALITY ON COMPACT CLOSED 4-MANIFOLDS YUXIANG LI, CHEIKH BIRAHIM NDIAYE Abstract. Given a compact closed four dimensional smooth Riemannian manifold, we prove existence of e

        EXTREMAL FUNCTIONS FOR MOSER-TRUDINGER TYPE INEQUALITY ON COMPACT CLOSED 4-MANIFOLDS YUXIANG LI, CHEIKH BIRAHIM NDIAYE Abstract. Given a compact closed four dimensional smooth Riemannian manifold, we prove existence of e

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        Source URL: faculty.math.tsinghua.edu.cn

        Language: English - Date: 2006-09-11 12:00:00
          5Running head: Green functions and HB-functions on covers EXISTENCE OF GREEN FUNCTIONS AND BOUNDED HARMONIC FUNCTIONS ON GALOIS COVERS OF RIEMANNIAN MANIFOLDS ˘ A. Muhammed ULUDAG

          Running head: Green functions and HB-functions on covers EXISTENCE OF GREEN FUNCTIONS AND BOUNDED HARMONIC FUNCTIONS ON GALOIS COVERS OF RIEMANNIAN MANIFOLDS ˘ A. Muhammed ULUDAG

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          Source URL: math.gsu.edu.tr

          - Date: 2014-11-14 18:20:26
            6GEOMETRIC FORMALITY AND NON-NEGATIVE SCALAR CURVATURE D. KOTSCHICK A BSTRACT. We classify manifolds of small dimensions that admit both, a Riemannian metric of non-negative scalar curvature, and a – a priori different

            GEOMETRIC FORMALITY AND NON-NEGATIVE SCALAR CURVATURE D. KOTSCHICK A BSTRACT. We classify manifolds of small dimensions that admit both, a Riemannian metric of non-negative scalar curvature, and a – a priori different

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            Source URL: 129.187.111.185

            - Date: 2013-01-03 23:15:50
              7Semi-Riemannian submersions and ϕ-null Ossermann conditions on Lorentzian S-manifolds A NGELO V. C ALDARELLA – joint work with L. Brunetti – Department of Mathematics – University of Bari, Italy Abstract. We prese

              Semi-Riemannian submersions and ϕ-null Ossermann conditions on Lorentzian S-manifolds A NGELO V. C ALDARELLA – joint work with L. Brunetti – Department of Mathematics – University of Bari, Italy Abstract. We prese

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              Source URL: gigda.ugr.es

              - Date: 2011-10-21 04:10:12
                8Semi-Riemannian submersions and ϕ-null Osserman conditions on Lorentzian S-manifolds Letizia Brunetti, Angelo V. Caldarella September 6∼9, 2011 Email: We present some results obtained while stud

                Semi-Riemannian submersions and ϕ-null Osserman conditions on Lorentzian S-manifolds Letizia Brunetti, Angelo V. Caldarella September 6∼9, 2011 Email: We present some results obtained while stud

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                Source URL: gigda.ugr.es

                - Date: 2011-10-21 04:10:12
                  9Lorentzian quasi-Einstein manifolds by S. Gavino-Fern´andez Email: A pseudo-Riemannian manifold (M, g) of dimension n + 2, n ≥ 1, is quasi-Einstein if there exists a smooth function f : M → R su

                  Lorentzian quasi-Einstein manifolds by S. Gavino-Fern´andez Email: A pseudo-Riemannian manifold (M, g) of dimension n + 2, n ≥ 1, is quasi-Einstein if there exists a smooth function f : M → R su

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                  Source URL: gigda.ugr.es

                  - Date: 2011-10-21 04:10:12
                    107. 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