Einstein metric

This article defines a property that makes sense for a Riemannian metric over a differential manifold

Definition

Symbol-free definition

A Riemannian metric on a differential manifold is said to be an Einstein metric if the Ricci curvature tensor is proportional to the metric tensor.

Definition with symbols

Let ${\displaystyle (M,g)}$ be a Riemannian manifold. ${\displaystyle g}$ is teremd an Eisetin metric if:

${\displaystyle R_{ij}(g)=\lambda g_{ij}}$

where ${\displaystyle \lambda }$ is uniform for the whole manifold.

This value of ${\displaystyle \lambda }$ is termed the cosmological constant for the manifold.

Relation with other properties

Stronger properties

The following properties of Riemannian metrics are stronger than the property of being an Einstein metric:

• Ricci-flat metric: This is an Einstein metric with cosmological constant zero, that is, with Ricci curvature zero everywhere
• Constant-curvature metric: This is an Einstein metric with Ricci curvature constant everywhere

In low dimensions

The following turn out to be true:

• For manifolds of dimension upto three, Einstein metrics are precisely the same as constant-curvature metrics