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#	Item
61	August 15, 2013 Constant mean curvature spheres in homogeneous three-spheres William H. Meeks III, Pablo Mira, Joaqu´ın P´erez, and Antonio Ros arXiv:1308.2612v2 [math.DG] 14 Aug 2013 Add to Reading List Source URL: arxiv.org Language: English - Date: 2013-08-14 20:32:27 Geometry Space Riemannian geometry Mathematics Curvature Differential geometry Surfaces Differential geometry of surfaces Gaussian curvature Sectional curvature Geometrization conjecture Riemann surface
62	Stable constant mean curvature surfaces William H. Meeks III∗ Joaqu´ın P´erez† Antonio Ros†, Add to Reading List Source URL: www.ugr.es Language: English - Date: 2008-06-16 11:44:31 Mathematical analysis Curvature Mathematics Theoretical physics Differential geometry of surfaces Riemannian geometry Operator theory Differential geometry Gaussian curvature Sectional curvature Constant-mean-curvature surface Ricci curvature
63	Front: Ashton, Hallee, Angela, Lexie, Maddy Back Row: Alex, Koby, Tyler, Alyssa, Teaira, Mr. Johnson Introduction The Warren/Alvarado/Oslo River Watch group test the Snake River Add to Reading List Source URL: www.iwinst.org Language: English - Date: 2016-03-07 17:53:50 Geography of the United States Idaho Wild and Scenic Rivers of the United States Rivers Curvature Curves Ratios Sinuosity Snake River
64	Constant mean curvature surfaces William H. Meeks III, Joaqu´ın P´erez, Giuseppe Tinaglia Add to Reading List Source URL: wdb.ugr.es Language: English - Date: 2016-04-28 17:16:33 Differential geometry of surfaces Mathematics Geometry Topology Differential geometry Surfaces Curvature Differential topology Gaussian curvature Constant-mean-curvature surface 3-manifold Minimal surface
65	Mean curvature equation and mean curvature flow The mean curvature equation We found a simple and elementary proof for the interior gradient estimate for the mean curvature equation [mc1]. This proof also applies to the Add to Reading List Source URL: maths-people.anu.edu.au Language: English - Date: 2009-04-18 10:02:54 Mathematical analysis Differential geometry Geometry Geometric flow Curvature Surfaces Mean curvature flow Differential geometry of surfaces Mean curvature Curve-shortening flow Gaussian curvature
66	Singularities of the asymptotic completion of developable M¨ obius strips Kosuke Naokawa (Tokyo Institute of Technology) ・developable surface = ruled surface & K = 0. ・Generic singular points on developable surfaces Add to Reading List Source URL: gigda.ugr.es Language: English - Date: 2011-10-21 04:10:12 Differential geometry Mathematical analysis Theoretical physics Mathematics Curvature Surfaces Differential geometry of surfaces FrenetSerret formulas Developable surface Orbifold
67	Closed Geodesics and the Free Loop Space Hans-Bert Rademacher (Universit¨ at Leipzig) Workshop on Symplectic Dynamics and Hamiltonian Systems, Add to Reading List Source URL: www.math.uni-leipzig.de Language: English - Date: 2014-05-22 10:51:20 Geometry Riemannian geometry Differential geometry Connection Theoretical physics Curvature Bernhard Riemann Levi-Civita connection Geodesic Torsion tensor Finsler manifold Fundamental theorem of Riemannian geometry
68	Annals of Mathematics), 1185–1239 doi: annalsConvex solutions to the mean curvature flow By Xu-Jia Wang Add to Reading List Source URL: maths-people.anu.edu.au Language: English - Date: 2013-04-12 02:02:20 Mathematical analysis Convex analysis Mathematics Geometry Convex function Differential geometry of surfaces Ricci flow Convex set Legendre transformation Flow Height
69	Uniqueness of the Riemann minimal surfaces Joaqu´ın P´erez (Joint work with William H. Meeks III & Antonio Ros) September 13, 2001 Abstract.-The Riemann minimal examples constitute the only known properly embedded Add to Reading List Source URL: www.ugr.es Language: English - Date: 2002-02-22 04:48:50 Mathematical analysis Differential geometry Mathematics Theoretical physics Bernhard Riemann Riemann surfaces Surfaces Differential geometry of surfaces Gaussian curvature Minimal surface Curvature Harmonic function
70	Dual characterizations of the sphere and the hyperbolic plane ´ Magdalena Caballero. University of Cordoba. ´ Joint work with Rafael M. Rubio. University of Cordoba. Add to Reading List Source URL: gigda.ugr.es Language: English - Date: 2014-09-17 04:24:21 Geometry Mathematics Mathematical analysis Surfaces Differential geometry Curvature Differential topology Gaussian curvature Hyperbolic geometry Differential geometry of surfaces Sphere Mean curvature

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