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Ricci curvature
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#	Item
11	EINSTEIN METRICS WITH ANISOTROPIC BOUNDARY BEHAVIOUR arXiv:0901.1051v1 [math.DG] 8 JanS. ARMSTRONG AND O. BIQUARD Add to Reading List Source URL: arxiv.org Language: English - Date: 2013-12-22 20:50:16 Lie groups Riemannian geometry Differential geometry Connection Curvature Ricci curvature Levi-Civita connection Symplectic group Symmetric space Lie algebra
12	Integral formulae for codimension-one foliated Finsler manifolds Vladimir Rovenski (E-mail: Add to Reading List Source URL: foliations2016.math.uni.lodz.pl Language: English - Date: 2016-06-07 16:46:52 Riemannian geometry Curvature Finsler geometry Finsler manifold Riemannian manifold Foliation Manifold Codimension Ricci curvature
13	Curvature identities and Gauss-Bonnet type theorems Navarro, A. & Navarro J. ICMat, CSIC, Spain; Departamento de Matema´ticas, UEx, Spain ; 1. Abstract Add to Reading List Source URL: gigda.ugr.es Language: English - Date: 2014-09-17 04:24:20 Riemannian geometry Curvature Bernhard Riemann Differential geometry Tensors Riemann curvature tensor Ricci curvature Scalar curvature Riemannian manifold Differentiable manifold Covariant derivative Curvature of Riemannian manifolds
14	Conformal Ricci collineations of space{times W. K uhnel1 and H.-B. Rademacher2 Abstract: We study conformal vector elds on space-times which in addition Add to Reading List Source URL: www.math.uni-leipzig.de Language: English - Date: 2000-12-15 09:12:36 Riemannian geometry Curvature Differential geometry Tensors Riemannian manifolds Ricci curvature Conformal map Conformal geometry Curvature collineation Matter collineation Stressenergy tensor Collineation
15	NONNEGATIVE CURVATURE AND COBORDISM TYPE ANAND DESSAI AND WILDERICH TUSCHMANN Abstract. We show that in each dimension n = 4k , k ≥ 2 , there exist infinite sequences of closed simply connected Riemannian n -manifolds Add to Reading List Source URL: homeweb1.unifr.ch Language: English - Date: 2008-11-24 08:18:51 Characteristic classes Algebraic topology Differential topology Curvature Riemannian geometry Cobordism Chern class Pontryagin class Classifying space Ricci curvature ChernWeil homomorphism Fiber bundle
16	Initial data sets for the Schwarzschild spacetime Alfonso Garc´ıa-Parrado G´omez-Lobo and Juan A. Valiente Kroon Santiago de Compostela 6th February 2007 Overview • A local invariant characterization of Schwarzschil Add to Reading List Source URL: xtsunxet.usc.es Language: English - Date: 2007-03-09 06:05:20 Riemannian geometry Differential geometry Tensors Differential topology Curvature Ricci curvature Riemannian manifold Differential geometry of surfaces Metric tensor Foliation Vector field Schwarzschild coordinates
17	A new class of holonomy groups in the pseudo-Riemannian geometry and integrable systems on Lie algebras Alexey Bolsinov joint work with Dragomir Tsonev Add to Reading List Source URL: gigda.ugr.es Language: English - Date: 2011-10-21 04:10:12 Differential geometry Connection Curvature Riemannian geometry Lie groups Holonomy Affine connection Lie algebra Representation theory Levi-Civita connection Symmetric space Ricci curvature
18	Revised version May 4, 2009 EINSTEIN SPACES WITH A CONFORMAL GROUP ¨ WOLFGANG KUHNEL & HANS-BERT RADEMACHER Abstract. The pseudo-Riemannian Einstein spaces with a conformal group Add to Reading List Source URL: www.math.uni-leipzig.de Language: English - Date: 2011-08-05 05:31:12 Riemannian geometry Conformal map Ricci curvature Conformal geometry Conformally flat manifold Einstein manifold Conformal vector field Riemannian manifold Killing vector field Levi-Civita connection Conformal group Geometry Festival
19	On the geometry of three-dimensional homogeneous Lorentzian manifolds Giovanni Calvaruso Department “E. De Giorgi” , University of Lecce, Italy Add to Reading List Source URL: xtsunxet.usc.es Language: English - Date: 2007-03-09 06:01:19 Lorentzian manifolds Exact solutions in general relativity Differential geometry Riemannian geometry Pseudo-Riemannian manifold Anti-de Sitter space Ricci curvature Minkowski space Manifold Riemannian manifold World manifold Einstein manifold
20	arXiv:1601.04877v2 [math.DG] 25 JanNonconnected Moduli Spaces of Nonnegative Sectional Curvature Metrics on Simply Connected Manifolds Anand Dessai∗, Stephan Klaus, and Wilderich Tuschmann Add to Reading List Source URL: homeweb1.unifr.ch Language: English - Date: 2016-01-29 08:39:41 Curvature Riemannian geometry Partial differential equations Geometric flow Ricci flow Sectional curvature Scalar curvature Ricci curvature Riemannian manifold Moduli space Manifold Einstein manifold