Mapping cylinder
cylindrical construction
A construction associating with every continuous mapping of topological spaces 
the topological space 
that is obtained from the topological sum (disjoint union) 
by the identification 
, 
. The space 
is called the mapping cylinder of 
, the subspace 
is a deformation retract of 
. The imbedding 
has the property that the composite 
coincides with 
(here 
is the natural retraction of 
onto 
). The mapping 
is a homotopy equivalence, and from the homotopy point of view every continuous mapping can be regarded as an imbedding and even as a cofibration. A similar assertion holds for a Serre fibration. For any continuous mapping 
the fibre and cofibre are defined up to a homotopy equivalence.
References
| [1] | E.H. Spanier, "Algebraic topology" , McGraw-Hill (1966) |
| [2] | R.E. Mosher, M.C. Tangora, "Cohomology operations and their application in homotopy theory" , Harper & Row (1968) |
Comments
The literal translation from the Russian yields the phrase "cylindrical construction" for the mapping cylinder. This phrase sometimes turns up in translations.
References
| [a1] | G.W. Whitehead, "Elements of homotopy theory" , Springer (1978) pp. 22, 23 |
Mapping cylinder. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Mapping_cylinder&oldid=47758