Submersion
A mapping 
from an 
-dimensional manifold 
into an 
-dimensional manifold 
, 
, under which for any point 
it is possible to introduce local coordinates 
on 
near 
and 
on 
near 
such that 
is locally represented in terms of these coordinates by
 |
If 
and 
possess the structure of a piecewise-linear, -analytic or -differentiable (of class 
) manifold and the local coordinates can be chosen piecewise-linear, -analytic or -differentiable (of class 
, 
), then the submersion is said to be piecewise-linear, -analytic or -differentiable (of class 
). A submersion can also be defined for a manifold with boundary (in topological problems it is advisable to impose an extra condition on the behaviour of the mapping close to the boundary, see [1]) and in the infinite-dimensional case (see [2]). The concept of a submersion in an informal sense is the dual of the concept of an immersion (cf. also Immersion of a manifold), and their theories are analogous.
References
| [1] | V.A. Rokhlin, D.B. Fuks, "Beginner's course in topology. Geometrical chapters" , Springer (1984) (Translated from Russian) |
| [2] | S. Lang, "Introduction to differentiable manifolds" , Interscience (1967) pp. App. III |
Comments
Submersions are classified by the induced mapping 
of tangent bundles, when 
is an open manifold. See [a1].
References
| [a1] | A. Phillips, "Submersions of open manifolds" Topology , 6 (1966) pp. 171–206 |
Submersion. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Submersion&oldid=48895