Curvature is tensorial

This article gives the statement, and possibly proof, that a map constructed in a certain way is tensorial
View other such statements

Statement

Let $\nabla$ be a connection on a vector bundle $E$ over a differential manifold $M$ . The Riemann curvature tensor of $\nabla$ is given as a map $Γ (T M) \otimes Γ (T M) \otimes Γ (E) \to Γ (E)$ defined by:

$R (X, Y) Z = \nabla_{X} \nabla_{Y} Z - \nabla_{Y} \nabla_{X} Z - \nabla_{[X, Y]} Z$

We claim that $R$ is a tensorial map in each of the variables $X, Y, Z$ .

Related facts

Facts used

Fact no.	Name	Full statement
1	Leibniz rule for derivations	For a vector field $X$ and functions $f, g$ , we have: $X (f g) = (X f) (g) + f (X g)$
2	Corollary of Leibniz rule for Lie bracket	For a function $f$ and vector fields $X, Y$ : $f [X, Y] = [f X, Y] + (Y f) X$ $f [X, Y] = [X, f Y] - (X f) Y$
3	The Leibniz-like axiom that is part of the definition of a connection	For a function $f$ and vector fields $A, B$ , and a connection $\nabla$ , we have $\nabla_{A} (f B) = (A f) (B) + f \nabla_{A} (B)$

Proof

To prove tensoriality in a variable, it suffices to show $C^{\infty}$ -linearity in that variable. This is because linearity in $C^{\infty}$ -functions guarantees linearity in a function that is 1 at exactly one point, and zero at others.

The proofs for $X$ and $Y$ are analogous, and rely on manipulation of the Lie bracket $[f X, Y]$ and the property of a connection being $C^{\infty}$ in the subscript vector. These proofs do not involve any explicit use of $Z$ . The proof for $Z$ relies simply on repeated application of the product rule, and the fact that $X Y - Y X = [X, Y]$ .

Tensoriality in the first variable

Given: $f : M \to R$ is a $C^{\infty}$ -function.

To prove: $R (f X, Y) = f R (X, Y)$ , or more explicitly, $\nabla_{f X} \nabla_{Y} - \nabla_{Y} \nabla_{f X} - \nabla_{[f X, Y]} = f (\nabla_{X} \nabla_{Y} - \nabla_{Y} \nabla_{X} - \nabla_{[X, Y]}$

We start out with the left side:

$\nabla_{f X} \nabla_{Y} - \nabla_{Y} \nabla_{f X} - \nabla_{[f X, Y]}$

Each step below is obtained from the previous one via some manipulation explained along side.

Step no.	Current status of left side	Facts/properties used	Specific rewrites
1	$f \nabla_{X} \nabla_{Y} - \nabla_{Y} (f \nabla_{X}) - \nabla_{[f X, Y]}$	By definition of a connection, $\nabla$ is $C^{\infty}$ -linear in its subscript argument.	$\nabla_{f X} \to f \nabla_{X}$
2	$f \nabla_{X} \nabla_{Y} - (Y f) \nabla_{X} - f \nabla_{Y} \nabla_{X} - \nabla_{[f X, Y]}$	Fact (3), the Leibniz-like axiom for connection.	$\nabla_{Y} (f \nabla_{X}) \to (Y f) \nabla_{X} + f \nabla_{Y} \nabla_{X}$ . To understand this more clearly imagine an input $Z$ to the whole expression, so that the rewrite becomes $\nabla_{Y} (f \nabla_{X} (Z)) \to (Y f) \nabla_{X} (Z) + f \nabla_{Y} \nabla_{X} (Z)$ . In the notation of fact (3), $A = Y$ , $f = f$ , and $B = \nabla_{X} (Z)$ .
3	$f (\nabla_{X} \nabla_{Y} - \nabla_{Y} \nabla_{X}) - \nabla_{(Y f) X + [f X, Y]}$	$\nabla$ is $C^{\infty}$ -linear in its subscript argument	<nath>(Yf)\nabla_X \to \nabla_{(Yf)X}</math>
4	$f (\nabla_{X} \nabla_{Y} - \nabla_{Y} \nabla_{X} - \nabla_{[X, Y]})$	Fact (2)	$[f X, Y] \to f [X, Y] - (Y f) X$ .

Tensoriality in the second variable

Let $f : M \to R$ be a scalar function. We will show that:

$R (X, f Y) = f R (X, Y)$

We start out with the left side:

$\nabla_{X} \nabla_{f Y} - \nabla_{f Y} \nabla_{X} - \nabla_{[X, f Y]}$

Applying the Leibniz rule and the property of a connection being $C^{\infty}$ in its subscript variable yields:

$(X f) \nabla_{Y} + f (\nabla_{X} \nabla_{Y} - \nabla_{Y} \nabla_{X}) - \nabla_{[X, f Y]}$

which simplifies to:

$f (\nabla_{X} \nabla_{y} - \nabla_{Y} \nabla_{X}) - \nabla_{[X, f Y] - (X f) Y}$

We now use the corollary stated above:

$f [X, Y] = [X, f Y] - (X f) Y$

substituting this gives:

$f (\nabla_{X} \nabla_{Y} - \nabla_{Y} \nabla_{X} - \nabla_{[X, Y]}$

which is $f R (X, Y)$

Tensoriality in the third variable

Let $f : M \to R$ be a scalar function. We will show that:

$R (X, Y) (f Z) = f R (X, Y) Z$

We start out with the left side:

$\nabla_{X} \nabla_{Y} (f Z) - \nabla_{Y} \nabla_{X} (f Z) - \nabla_{[X, Y]} (f Z)$

Now we apply the Leibniz rule for connnections on each term:

$\nabla_{X} ((Y f) (Z) + f \nabla_{Y} Z) - \nabla_{Y} ((X f) Z + f \nabla_{X} Z) - f \nabla_{[X, Y]} Z - ([X, Y] f) Z$

We again apply the Leibniz rule to the first two term groups:

$(X Y f) (Z) + (Y f) \nabla_{X} Z + (X f) \nabla_{Y} Z + f \nabla_{X} \nabla_{Y} Z - (Y X f) Z - (X f) \nabla_{Y} Z - (Y f) \nabla_{X} Z - f \nabla_{Y} \nabla_{X} Z - f \nabla_{[X, Y]} Z - ([X, Y] f) Z$

After cancellations we are left with the following six terms:

$f (\nabla_{X} \nabla_{Y} - \nabla_{Y} \nabla_{X} - \nabla_{[X, Y]}) Z + ((X Y - Y X - [X, Y]) f) Z$

But since $[X, Y] = X Y - Y X$ , the last three terms vanish, and we are left with:

$f R (X, Y) Z$