Boundary parallel

A closed n-manifold embedded in an (n+1)-manifold is boundary parallel if it can be isotoped onto a boundary component.

Consider the annulus ${\displaystyle I\times S^{1}}$. Let f denote the projection map

${\displaystyle f:I\times S^{1}\rightarrow S^{1},(x,z)\mapsto z.}$

If a circle S is embedded into the annulus so that f restricted to S is a bijection, then S is boundary parallel. (The converse is not true.)

If, on the other hand, a circle S is embedded into the annulus so that f restricted to S is not surjective, then S is not boundary parallel. (Again, the converse is not true.)