Flat 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 everywhere zero: sectional curvature
Definition
Symbol-free definition
A Riemannian metric on a differential manifold is said to be a flat metric if the sectional curvature is identically zero, viz the sectional curvature is zero for every tangent plane at every point.
Relation with other properties
Weaker properties
Metaproperties
Given a flat metric on a differential manifold Template:DP-closed
The direct product of two Riemannian manifolds, both equipped with a flat metric, also gets the flat metric. Thus, since every curve is a flat manifold, any manifold obtained as a direct product of curves is also flat.