Hyperbolic

Results: 1122



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11HYPERFUNCTIONS IN HYPERBOLIC GEOMETRY ´ LAURENT GUILLOPE Abstract. In the framework of real hyperbolic geometry, this review note begins with the Helgason correspondence induced by the Poisson transform

HYPERFUNCTIONS IN HYPERBOLIC GEOMETRY ´ LAURENT GUILLOPE Abstract. In the framework of real hyperbolic geometry, this review note begins with the Helgason correspondence induced by the Poisson transform

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Source URL: www.math.sciences.univ-nantes.fr

Language: English - Date: 2013-11-03 05:25:52
    12Crochet Hyperbolic Surfaces

    Crochet Hyperbolic Surfaces

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    Source URL: www.isama.org

    Language: English - Date: 2012-03-26 15:09:26
      13INCREASING THE NUMBER OF FIBERED FACES OF ARITHMETIC HYPERBOLIC 3-MANIFOLDS arXiv:0712.3243v2 [math.GT] 16 DecNATHAN M. DUNFIELD AND DINAKAR RAMAKRISHNAN

      INCREASING THE NUMBER OF FIBERED FACES OF ARITHMETIC HYPERBOLIC 3-MANIFOLDS arXiv:0712.3243v2 [math.GT] 16 DecNATHAN M. DUNFIELD AND DINAKAR RAMAKRISHNAN

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      Source URL: www.math.caltech.edu

      Language: English - Date: 2009-07-01 17:56:31
        14Hyperbolic Geometry and Moduli of Real Curves of Genus Three Gert Heckman and Sander Rieken July 15, 2017 Abstract The moduli space of smooth real plane quartic curves consists of six connected components. We prove that

        Hyperbolic Geometry and Moduli of Real Curves of Genus Three Gert Heckman and Sander Rieken July 15, 2017 Abstract The moduli space of smooth real plane quartic curves consists of six connected components. We prove that

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        Source URL: www.math.ru.nl

        Language: English - Date: 2017-07-24 05:59:19
          15Regular triangulations and the index of a cusped hyperbolic 3-manifold Stavros Garoufalidis, Craig D. Hodgson J. Hyam Rubinstein and Henry Segerman Oklahoma State University

          Regular triangulations and the index of a cusped hyperbolic 3-manifold Stavros Garoufalidis, Craig D. Hodgson J. Hyam Rubinstein and Henry Segerman Oklahoma State University

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          Source URL: math.okstate.edu

          - Date: 2014-08-23 13:28:34
            16GENERAL LOGARITHMS AND HYPERBOLIC FUNCTIONS 5 minute review. Remind students • what loga x is for general a > 0 (where a 6= 1): that is, loga x is the power of a needed to make x, and that ln = loge ; • the definiti

            GENERAL LOGARITHMS AND HYPERBOLIC FUNCTIONS 5 minute review. Remind students • what loga x is for general a > 0 (where a 6= 1): that is, loga x is the power of a needed to make x, and that ln = loge ; • the definiti

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            Source URL: engmaths.group.shef.ac.uk

            - Date: 2017-10-12 08:23:03
              17FURTHER INTEGRATION 5 minute review. Remind students that hyperbolic R dxsubstitutions can Rsolvedxintegrals (x = sinh u), √x2 −1 (x = which trigonometric substitutions can’t, such as √1+x 2

              FURTHER INTEGRATION 5 minute review. Remind students that hyperbolic R dxsubstitutions can Rsolvedxintegrals (x = sinh u), √x2 −1 (x = which trigonometric substitutions can’t, such as √1+x 2

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              Source URL: engmaths.group.shef.ac.uk

              - Date: 2017-08-24 06:17:44
                18New York Journal of Mathematics New York J. Math–181. Equal angles of intersecting geodesics for every hyperbolic metric Arpan Kabiraj

                New York Journal of Mathematics New York J. Math–181. Equal angles of intersecting geodesics for every hyperbolic metric Arpan Kabiraj

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                Source URL: nyjm.albany.edu

                - Date: 2018-01-30 10:05:12
                  19MAS140Formula Sheet These results may be quoted without proof unless proofs are asked for in the questions. Trigonometry Hyperbolic Functions

                  MAS140Formula Sheet These results may be quoted without proof unless proofs are asked for in the questions. Trigonometry Hyperbolic Functions

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                  Source URL: engmaths.group.shef.ac.uk

                  - Date: 2017-08-24 06:17:44
                    20FURTHER INTEGRATION 5 minute review. Remind students that hyperbolic R dxsubstitutions can Rsolvedxintegrals (x = sinh u), √x2 −1 (x = which trigonometric substitutions can’t, such as √1+x 2

                    FURTHER INTEGRATION 5 minute review. Remind students that hyperbolic R dxsubstitutions can Rsolvedxintegrals (x = sinh u), √x2 −1 (x = which trigonometric substitutions can’t, such as √1+x 2

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                    Source URL: engmaths.group.shef.ac.uk

                    - Date: 2017-02-22 10:20:17