Tubular neighbourhood
A neighbourhood of a smooth submanifold 
in a smooth manifold 
that is fibred over 
with fibre 
, where
 |
Suppose that in 
a Riemannian metric is chosen and consider segments of geodesics that are normal to 
and start in 
. If 
is compact, then there exists an 
such that no two segments of length 
and starting at different points of 
intersect. The union of all such segments of length 
is an open neighbourhood 
of 
, and is called a tubular neighbourhood of 
. It is possible to construct for a non-compact 
a tubular neighbourhood by covering 
with a countable family of compacta and by decreasing 
as the number of elements of the covering increases. There is a deformation retract 
associating with each point of 
the beginning of a geodesic containing this point. This retract determines a vector bundle with fibre 
that is isomorphic to the normal bundle 
of the imbedding 
. In this way, the quotient space 
is homeomorphic to the Thom space of 
.
An analogue of the notion of a tubular neighbourhood can also be introduced for topological manifolds (where one has to consider locally flat imbeddings, [2]).
References
| [1] | R. Thom, "Quelques propriétés globales des variétés différentiables" Comm. Math. Helv. , 28 (1954) pp. 17–86 |
| [2] | R.C. Kirby, L.C. Siebenmann, "Foundational essays on topological manifolds, smoothings, and triangulations" , Princeton Univ. Press (1977) |
Comments
Tubular neighbourhoods were introduced by H. Whitney in his treatment of differentiable manifolds (see [a2] for some history).
References
| [a1] | M.W. Hirsch, "Differential topology" , Springer (1976) pp. Chapt. 5, Sect. 3 |
| [a2] | J. Dieudonné, "A history of algebraic and differential topology: 1900–1960" , Birkhäuser (1989) pp. Chapt. III |
Tubular neighbourhood. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Tubular_neighbourhood&oldid=49045