Pullback of connection on a vector bundle

Definition

Suppose $f : N \to M$ is a smooth map between differential manifolds $N$ and $M$ . Let $E$ be a vector bundle over $M$ , and $f^{*} E$ denote the pullback of $E$ via $f$ (hence, $f^{*} E$ is a vector bundle over $N$ ).

Given a connection $\nabla$ for the vector bundle $E$ , we can define a connection $f^{*} (\nabla)$ for the vector bundle $f^{*} (E)$ , called the pullback of $\nabla$ , as the unique connection satisfying the following:

$(f^{*} \nabla)_{X} (f^{*} s) = f^{*} (\nabla_{(D f) (X)} (s))$

This is to be understood as follows. Start with a section $s \in Γ (E)$ . Take the pullback of $s$ to get a section $f^{*} s \in Γ (f^{*} E)$ . Then, given a vector field $X$ on $N$ , $(f^{*} \nabla)_{X}$ should send $f^{*} s$ to the pullback via $f$ of $\nabla_{D f (x)} (s)$ .

Related facts

Induced connection on submanifold

Further information: induced connection on submanifold

if $M$ is a Riemannian manifold and $N$ is a submanifold, then we can use a linear connection on $M$ to induce a linear connection on $N$ . This involves two steps:

Pull back the connection on $T M$ , to the connection on the pullback bundle on $N$ namely $T M |_{N}$
Project this to the connection on $T N$ , using the inner product structure on $T M |_{N}$

Connection along a curve

Further information: connection along a curve

A connection along a curve can be viewed as a special case of a pullback connection, where the pullback is to the interval $(0, 1)$ .