Steenrod algebra
The graded algebra 
over the field 
of all stable cohomology operations (cf. Cohomology operation) modulo 
. For any space (spectrum of spaces) 
, the group 
is a module over the Steenrod algebra 
.
The Steenrod algebra is multiplicatively generated by the Steenrod operations (cf. Steenrod operation). Thus, the Steenrod algebra 
is a graded associative algebra, multiplicatively generated by the symbols 
with 
, which satisfy the Adem relation:
 |
, so that an additive basis (over 
) of the Steenrod algebra 
consists of the operations 
, 
(the so-called Cartan–Serre basis). Similar results are true for 
with 
. Furthermore,
 |
where 
is an Eilenberg–MacLane space. The multiplication
 |
induces the diagonal 
in 
, which is a homomorphism of algebras, and, consequently, turns 
into a Hopf algebra.
References
| [1] | N.E. Steenrod, D.B.A. Epstein, "Cohomology operations" , Princeton Univ. Press (1962) |
| [2] | J. Milnor, "The Steenrod algebra and its dual" Ann. of Math. , 67 (1958) pp. 150–171 |
| [3] | M.K. Tangora, "Cohomology operations and applications in homotopy theory" , Harper & Row (1968) |
Comments
The analogue of the Steenrod algebra for a cohomology theory defined by a spectrum 
is 
; cf. Generalized cohomology theories and Spectrum of spaces. The 
-term of the Adams spectral sequence, cf. Spectral sequence, 
is a purely (homological) algebra construct obtained by regarding the homology groups as modules over the Hopf algebra 
.
References
| [a1] | J. Dieudonné, "A history of algebraic and differential topology 1900–1960" , Birkhäuser (1989) |
| [a2] | R.M. Switzer, "Algebraic topology - homotopy and homology" , Springer (1975) pp. Chapts. 18–19 |
| [a3] | J.F. Adams, "Stable homotopy and generalized homology" , Univ. Chicago Press (1974) pp. Part III, Chapts. 12, 15 |
Steenrod algebra. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Steenrod_algebra&oldid=48824