Steenrod reduced power

A stable cohomology operation , , of the type , where is a fixed odd prime number, which is the analogue modulo of the Steenrod square, and which is a homomorphism

defined for every pair of topological spaces and any integer . The Steenrod reduced powers possess the following properties (apart from naturality and stability , where is the coboundary homomorphism):

1) ;

2) if , then ;

3) if , then ;

4) (Cartan's formula) ;

5) (Adem's relation)

if ,

if , where is the Bockstein homomorphism associated with the short exact sequence of coefficient groups , while are the binomial coefficients reduced modulo .

These properties are analogous to the corresponding properties of Steenrod squares, whereby the operation corresponds to the operation . Just as for Steenrod squares, the multiplication in 4) can be considered to be both exterior (-multiplication) and interior (-multiplication). Steenrod reduced powers commute with suspension and transgression.

The properties 1)–3) uniquely characterize , and can be constructed in the same way as Steenrod squares using the minimal acyclic free chain -complex .

References

Comments

For more references see Steenrod algebra.