Constant-scalar curvature metric

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

This is the property of the following curvature being constant: scalar curvature

Definition

Symbol-free definition

A Riemannian metric on a differential manifold is said to be a constant-scalar curvature metric if the scalar curvature at all points is equal.

Definition with symbols

Fill this in later

Relation with other properties

Stronger properties

The following properties of Riemannian metrics are stronger than the property of being a constant-scalar curvature metric:

• Constant-curvature metric
• Einstein metric
• Ricci-flat metric
• Homogeneous metric
• Locally homogeneous metric
• Zero-scalar curvature metric

Weaker properties

• Constantly signed-scalar curvature metric