Connection along a curve: Difference between revisions

Definition

Let ${\displaystyle M}$ be a differential manifold and ${\displaystyle E}$ be a vector bundle over ${\displaystyle M}$. Let ${\displaystyle \gamma :[0,1]\to M}$ be a smooth curve in ${\displaystyle M}$. A connection along ${\displaystyle \gamma }$, of ${\displaystyle E}$, is defined as follows: it is a map ${\displaystyle D/dt}$ from the space of sections of ${\displaystyle E}$ along ${\displaystyle \gamma }$, to itself, such that:

${\displaystyle DV/dt+DW/dt=D(V+W)/dt}$

and for ${\displaystyle f:[0,1]\to \mathbb{R}}$ we have:

${\displaystyle D(fV)/dt=fDV/dt+Vdf/dt}$

where ${\displaystyle df/dt}$ is usual real differentiation.

Facts

Connection gives connection along a curve

Given a connection on the whole vector bundle ${\displaystyle E}$, we can obtain a connection along the curve ${\displaystyle \gamma }$. Simply define:

${\displaystyle DV/dt={\mathrm{\nabla }}_{{\gamma }^{\prime }(t)}V}$

where ${\displaystyle {\gamma }^{\prime }(t)}$ is the tangent vector to ${\displaystyle \gamma }$ at ${\displaystyle \gamma (t)}$. This can also be viewed as the pullback connection for the map ${\displaystyle \gamma }$ (which we might restrict to the open interval ${\displaystyle (0,1)}$, for convenience).

However, not every connection along a curve arises from a connection. A particular case is self-intersecting curves. We can construct connections along self-intersecting curves that behave very differently for the same point at two different times, and hence cannot arise from a connection.