Definition:Koszul Connection

Definition
Let $M$ be a smooth manifold with or without boundary.

Let $E$ be a smooth manifold.

Let $\pi : E \to M$ be a smooth vector bundle.

Let $\map \Gamma E$ be the space of smooth sections of $E$.

Let $\map {\mathfrak{X}} M$ be the space of smooth vector fields on $M$.

Let $\map {C^\infty} M$ be the space of smooth real functions on $M$.

Let $\nabla : \map {\mathfrak{X}} M \times \map \Gamma E \to \map \Gamma E$ be the map be written $\tuple {X, Y} \mapsto \nabla_X Y$ where $X \in \map {\mathfrak{X}} M$, $Y \in \map \Gamma E$, and $\times$ denotes the cartesian product.

Suppose $\nabla$ satisfies the following:


 * $\ds \nabla_{f_1 X_1 + f_2 X_2} Y = f_1 \nabla_{X_1} Y + f_2 \nabla_{X_2} Y$


 * $\ds \map {\nabla_X} {a_1 Y_1 + a_2 Y_2} = a_1 \nabla_X Y_1 + a_2 \nabla_X Y_2$


 * $\ds \map {\nabla_X} {f Y} = f \nabla_X Y + \paren {X f} Y$

where:


 * $\ds f, f_1, f_2 \in \map {C^\infty} M$


 * $a_1, a_2 \in \R$

Then $\nabla$ is known as the connection in $E$.