Thom isomorphism
An isomorphism between the (generalized) (co)homology groups of the base space of a vector (sphere) bundle 
and the (co)homology groups of its Thom space 
.
Suppose the 
-dimensional vector bundle 
over a finite cell complex 
is oriented in some multiplicative generalized cohomology theory 
(cf. Generalized cohomology theories), that is, there exists a Thom class 
. Then 
is an 
-module, and the homomorphism 
, given by multiplication by the Thom class, is an isomorphism, called the Thom isomorphism (or Thom–Dold isomorphism).
There is a dually-defined isomorphism 
.
In the case where 
is the classical cohomology theory 
, the isomorphism is described in [1], and it was established for an arbitrary theory 
in [2]. Moreover, if 
is not oriented in the integral cohomology theory 
, then there is an isomorphism 
, where the right-hand side is the cohomology group with coefficients in the local system of groups 
. More generally, if 
is non-oriented in the cohomology theory 
, there is an isomorphism which generalizes both the Thom isomorphism described above and the Thom–Dold isomorphism for 
-oriented bundles [3].
References
| [1] | R. Thom, "Quelques propriétés globales des variétés différentiables" Comm. Math. Helv. , 28 (1954) pp. 17–86 |
| [2] | A. Dold, "Relations between ordinary and extraordinary homology" , Colloq. Algebraic Topology, August 1–10, 1962 , Inst. Math. Aarhus Univ. (1962) pp. 2–9 |
| [3] | Yu.B. Rudyak, "On the Thom–Dold isomorphism for nonorientable bundles" Soviet Math. Dokl. , 22 (1980) pp. 842–844 Dokl. Akad. Nauk. SSSR , 255 : 6 (1980) pp. 1323–1325 |
| [4] | R.M. Switzer, "Algebraic topology - homotopy and homology" , Springer (1975) |
Thom isomorphism. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Thom_isomorphism&oldid=12087