Pontryagin character
The characteristic class defined by the equality 
, where 
is the complexification of the fibre bundle 
and 
is the Chern character. The Pontryagin character as an element of the ring 
is determined by the even series 
and has the following properties
 |
The index class 
is defined to be equal to 
, where 
is the Todd class. The index class 
is expressed in Wu generators (see Characteristic class) by the formula
 |
The following theorem on the relationship between the Pontryagin class and the 
-class holds (cf. Pontryagin class). Let 
be a real vector bundle over the base 
with a 
-structure, 
. For such bundles there is the Thom isomorphism in real 
-theory:
 |
Let
 |
be the Thom isomorphism, which is uniquely determined by the orientation of the bundle 
. Then
 |
This formula is an exact analogue of the corresponding statement on the relationship between the Chern character and the Todd class.
If 
is a complex vector bundle, then 
. Here 
is the real part of the bundle, and 
is the Todd class.
For references see Pontryagin class.
Pontryagin character. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Pontryagin_character&oldid=48238