Curvature of a connection

This curvature is also sometimes known as the Riemann curvature tensor. However, the latter term is usually reserved for situations where we have a linear connection, in particular, the Levi-Civita connection for a Riemannian manifold

Definition

Given data

• A connected differential manifold ${\displaystyle M}$
• A vector bundle ${\displaystyle E}$ over ${\displaystyle M}$
• A connection ${\displaystyle \mathrm{\nabla }}$ for ${\displaystyle E}$

Definition part

The curvature of ${\displaystyle \mathrm{\nabla }}$ is defined as the map:

${\displaystyle R(X,Y)={\mathrm{\nabla }}_X\circ {\mathrm{\nabla }}_Y-{\mathrm{\nabla }}_Y\circ {\mathrm{\nabla }}_X-{\mathrm{\nabla }}_{[X,Y]}}$

where ${\displaystyle X,Y\in \mathrm{\Gamma }}$

Note that ${\displaystyle R(X,Y)}$ itself outputs a linear map ${\displaystyle \mathrm{\Gamma }(E)\to \mathrm{\Gamma }(E)}$. We can thus write this as:

${\displaystyle R(X,Y)Z={\mathrm{\nabla }}_X({\mathrm{\nabla }}_{Y}Z)-{\mathrm{\nabla }}_Y({\mathrm{\nabla }}_{X}Z)-{\mathrm{\nabla }}_{[X,Y]}Z}$

In the linear case

In the special case where ${\displaystyle E=TM}$ (the case of a linear connection) we get that ${\displaystyle X,Y,Z\in \mathrm{\Gamma }(TM)}$. We can thus think of this map as a (1,3)-tensor because it takes as input three vector fields and outputs one vector field.

Properties

Tensoriality

Further information: Curvature is tensorial