Results 171 to 180 of about 42,669 (197)
Some of the next articles are maybe not open access.
Generalized Einstein manifolds
Journal of Geometry and Physics, 1995The geometrization of physics, especially regarding the equations of electromagnetism and gravitation in general relativity, has been a vital problem of investigation for a long time. A. Einstein himself devoted the last several years of his life to realize this dream without success. However, taking grant of two axioms proposed by \textit{D. Hilbert} [
openaire +1 more source
On Einstein Hermitian manifolds
Monatshefte für Mathematik, 2007The author shows that every compact Einstein Hermitian surface with constant *-scalar curvature is Kähler. The *-scalar curvature is the trace of the *-Ricci tensor that measures how far the structure is from being Kähler. When the dimension is \(4n+2\), the author gives an example of an Einstein Hermitian manifold with constant *-scalar curvature that
openaire +1 more source
Compact standard periodic einstein manifolds
Siberian Mathematical Journal, 1992A Riemannian manifold \(M\) with a metric \(g\) is Einstein if its metric \(g\) satisfies the equation: \(\text{Ric}(g)=Cg\), where Ric is the Ricci tensor of \(M\) and \(C\) is a constant. Let \(G\) be a connected, compact simple Lie group and \(H\) its closed simple subgroup with \(G/H\) simply connected. The homogeneous Riemannian metric induced on \
openaire +2 more sources
Einstein Manifolds and Topology
1987Which compact manifolds do admit an Einstein metric? Except in dimension 2 (see Section B of this chapter), a complete answer to this question seems out of reach today. At least, in dimensions 3 and 4, we can single out a few manifolds which definitely do not admit any Einstein metric.
openaire +1 more source
The Extension of Einstein Manifolds
1981Of the many mathematical problems connected with general relativity, the extension problem has been chosen for discussion in this chapter, because it is concerned with the global geometrical and topological properties of Einstein manifolds, and those properties seem to me to constitute the most basically mathematical aspect of the theory.
openaire +1 more source
Noncompact quasi‐Einstein manifolds conformal to a Euclidean space
Mathematische Nachrichten, 2021Keti Tenenblat
exaly
On an Einstein projective Sasakian manifold
2006The author proves that a projectively flat Sasakian manifold is an Einstein manifold. Besides, if an Einstein-Sasakian manifold is projectively flat, then it is locally isometric with a unit sphere \(S^n(1)\). Finally, if in an Einstein-Sasakian manifold the relation \(K(X,Y)\cdot P = 0\) holds, then it is projectively flat.
openaire +3 more sources
Gradient Yamabe and Gradient m-Quasi Einstein Metrics on Three-dimensional Cosymplectic Manifolds
Mediterranean Journal of Mathematics, 2021Uday Chand De +2 more
exaly
ON A CLASS OF N(κ)-QUASI EINSTEIN MANIFOLDS
Communications of the Korean Mathematical Society, 2011Avik De, Uday Chand De
exaly