Ricci-flat metric: Difference between revisions

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

This property of a Riemannian metric is Ricci flow-preserved, that is, it is preserved under the forward Ricci flow

This is the property of the following curvature being everywhere zero: Ricci curvature

Definition

Symbol-free definition

A Riemannian metric on a differential manifold is said to be Ricci-flat if the Ricci curvature is zero at all points.

Definition with symbols

Let ${\displaystyle (M,g)}$ be a Riemannian manifold. Then ${\displaystyle g}$ is termed a Ricci-flat metric if ${\displaystyle R_{ij}(g)=0}$ at all points.

Relation with other properties

Stronger properties

• Flat metric

Weaker properties

• Einstein metric
• Constant-scalar curvature metric
• Zero-scalar curvature metric

Metaproperties

Direct product-closedness

This property of a Riemannian metric on a differential manifold is closed under taking direct products of manifolds

Given two Riemannian manifolds ${\displaystyle (M,g_{1})}$ and ${\displaystyle (N,g_{2})}$, such that both ${\displaystyle g_{1}}$ and ${\displaystyle g_{2}}$ are Ricci-flat, the natural induced metric on ${\displaystyle M\times N}$ is also Ricci-flat.