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Algebraic topology From Wikipedia, the free encyclopedia
In algebraic topology, a Steenrod algebra was defined by Henri Cartan (1955) to be the algebra of stable cohomology operations for mod cohomology.
For a given prime number , the Steenrod algebra is the graded Hopf algebra over the field of order , consisting of all stable cohomology operations for mod cohomology. It is generated by the Steenrod squares introduced by Norman Steenrod (1947) for , and by the Steenrod reduced th powers introduced in Steenrod (1953a, 1953b) and the Bockstein homomorphism for .
The term "Steenrod algebra" is also sometimes used for the algebra of cohomology operations of a generalized cohomology theory.
A cohomology operation is a natural transformation between cohomology functors. For example, if we take cohomology with coefficients in a ring , the cup product squaring operation yields a family of cohomology operations:
Cohomology operations need not be homomorphisms of graded rings; see the Cartan formula below.
These operations do not commute with suspension—that is, they are unstable. (This is because if is a suspension of a space , the cup product on the cohomology of is trivial.) Steenrod constructed stable operations
for all greater than zero. The notation and their name, the Steenrod squares, comes from the fact that restricted to classes of degree is the cup square. There are analogous operations for odd primary coefficients, usually denoted and called the reduced -th power operations:
The generate a connected graded algebra over , where the multiplication is given by composition of operations. This is the mod 2 Steenrod algebra. In the case , the mod Steenrod algebra is generated by the and the Bockstein operation associated to the short exact sequence
In the case , the Bockstein element is and the reduced -th power is .
We can summarize the properties of the Steenrod operations as generators in the cohomology ring of Eilenberg–Maclane spectra
since there is an isomorphism
giving a direct sum decomposition of all possible cohomology operations with coefficients in . Note the inverse limit of cohomology groups appears because it is a computation in the stable range of cohomology groups of Eilenberg–Maclane spaces. This result[1] was originally computed[2] by Cartan (1954–1955, p. 7) and Serre (1953).
Note there is a dual characterization[3] using homology for the dual Steenrod algebra.
It should be observed if the Eilenberg–Maclane spectrum is replaced by an arbitrary spectrum , then there are many challenges for studying the cohomology ring . In this case, the generalized dual Steenrod algebra should be considered instead because it has much better properties and can be tractably studied in many cases (such as ).[4] In fact, these ring spectra are commutative and the bimodules are flat. In this case, these is a canonical coaction of on for any space , such that this action behaves well with respect to the stable homotopy category, i.e., there is an isomorphism hence we can use the unit the ring spectrum to get a coaction of on .
Norman Steenrod and David B. A. Epstein (1962) showed that the Steenrod squares are characterized by the following 5 axioms:
In addition the Steenrod squares have the following properties:
Similarly the following axioms characterize the reduced -th powers for .
As before, the reduced p-th powers also satisfy the Adem relations and commute with the suspension and boundary operators.
The Adem relations for were conjectured by Wen-tsün Wu (1952) and established by José Adem (1952). They are given by
for all such that . (The binomial coefficients are to be interpreted mod 2.) The Adem relations allow one to write an arbitrary composition of Steenrod squares as a sum of Serre–Cartan basis elements.
For odd the Adem relations are
for a<pb and
for .
Shaun R. Bullett and Ian G. Macdonald (1982) reformulated the Adem relations as the following identities.
For put
then the Adem relations are equivalent to
For put
then the Adem relations are equivalent to the statement that
is symmetric in and . Here is the Bockstein operation and .
There is a nice straightforward geometric interpretation of the Steenrod squares using manifolds representing cohomology classes. Suppose is a smooth manifold and consider a cohomology class represented geometrically as a smooth submanifold . Cohomologically, if we let represent the fundamental class of then the pushforward map
gives a representation of . In addition, associated to this immersion is a real vector bundle call the normal bundle . The Steenrod squares of can now be understood — they are the pushforward of the Stiefel–Whitney class of the normal bundle
which gives a geometric reason for why the Steenrod products eventually vanish. Note that because the Steenrod maps are group homomorphisms, if we have a class which can be represented as a sum
where the are represented as manifolds, we can interpret the squares of the classes as sums of the pushforwards of the normal bundles of their underlying smooth manifolds, i.e.,
Also, this equivalence is strongly related to the Wu formula.
On the complex projective plane , there are only the following non-trivial cohomology groups,
as can be computed using a cellular decomposition. This implies that the only possible non-trivial Steenrod product is on since it gives the cup product on cohomology. As the cup product structure on is nontrivial, this square is nontrivial. There is a similar computation on the complex projective space , where the only non-trivial squares are and the squaring operations on the cohomology groups representing the cup product. In the square
can be computed using the geometric techniques outlined above and the relation between Chern classes and Stiefel–Whitney classes; note that represents the non-zero class in . It can also be computed directly using the Cartan formula since and
The Steenrod operations for real projective spaces can be readily computed using the formal properties of the Steenrod squares. Recall that
where For the operations on we know that
The Cartan relation implies that the total square
is a ring homomorphism
Hence
Since there is only one degree component of the previous sum, we have that
Suppose that is any degree subgroup of the symmetric group on points, a cohomology class in , an abelian group acted on by , and a cohomology class in . Steenrod (1953a, 1953b) showed how to construct a reduced power in , as follows.
The Steenrod squares and reduced powers are special cases of this construction where is a cyclic group of prime order acting as a cyclic permutation of elements, and the groups and are cyclic of order , so that is also cyclic of order .
In addition to the axiomatic structure the Steenrod algebra satisfies, it has a number of additional useful properties.
Jean-Pierre Serre (1953) (for ) and Henri Cartan (1954, 1955) (for ) described the structure of the Steenrod algebra of stable mod cohomology operations, showing that it is generated by the Bockstein homomorphism together with the Steenrod reduced powers, and the Adem relations generate the ideal of relations between these generators. In particular they found an explicit basis for the Steenrod algebra. This basis relies on a certain notion of admissibility for integer sequences. We say a sequence
is admissible if for each , we have that . Then the elements
where is an admissible sequence, form a basis (the Serre–Cartan basis) for the mod 2 Steenrod algebra, called the admissible basis. There is a similar basis for the case consisting of the elements
such that
The Steenrod algebra has more structure than a graded -algebra. It is also a Hopf algebra, so that in particular there is a diagonal or comultiplication map
induced by the Cartan formula for the action of the Steenrod algebra on the cup product. This map is easier to describe than the product map, and is given by
These formulas imply that the Steenrod algebra is co-commutative.
The linear dual of makes the (graded) linear dual of A into an algebra. John Milnor (1958) proved, for , that is a polynomial algebra, with one generator of degree , for every k, and for the dual Steenrod algebra is the tensor product of the polynomial algebra in generators of degree and the exterior algebra in generators τk of degree . The monomial basis for then gives another choice of basis for A, called the Milnor basis. The dual to the Steenrod algebra is often more convenient to work with, because the multiplication is (super) commutative. The comultiplication for is the dual of the product on A; it is given by
The only primitive elements of for are the elements of the form , and these are dual to the (the only indecomposables of A).
The dual Steenrod algebras are supercommutative Hopf algebras, so their spectra are algebra supergroup schemes. These group schemes are closely related to the automorphisms of 1-dimensional additive formal groups. For example, if then the dual Steenrod algebra is the group scheme of automorphisms of the 1-dimensional additive formal group scheme that are the identity to first order. These automorphisms are of the form
The Steenrod algebra admits a filtration by finite sub-Hopf algebras. As is generated by the elements [5]
we can form subalgebras generated by the Steenrod squares
giving the filtration
These algebras are significant because they can be used to simplify many Adams spectral sequence computations, such as for , and .[6]
Larry Smith (2007) gave the following algebraic construction of the Steenrod algebra over a finite field of order q. If V is a vector space over then write SV for the symmetric algebra of V. There is an algebra homomorphism
where F is the Frobenius endomorphism of SV. If we put
or
for then if V is infinite dimensional the elements generate an algebra isomorphism to the subalgebra of the Steenrod algebra generated by the reduced p′th powers for p odd, or the even Steenrod squares for .
Early applications of the Steenrod algebra were calculations by Jean-Pierre Serre of some homotopy groups of spheres, using the compatibility of transgressive differentials in the Serre spectral sequence with the Steenrod operations, and the classification by René Thom of smooth manifolds up to cobordism, through the identification of the graded ring of bordism classes with the homotopy groups of Thom complexes, in a stable range. The latter was refined to the case of oriented manifolds by C. T. C. Wall. A famous application of the Steenrod operations, involving factorizations through secondary cohomology operations associated to appropriate Adem relations, was the solution by J. Frank Adams of the Hopf invariant one problem. One application of the mod 2 Steenrod algebra that is fairly elementary is the following theorem.
Theorem. If there is a map of Hopf invariant one, then n is a power of 2.
The proof uses the fact that each is decomposable for k which is not a power of 2; that is, such an element is a product of squares of strictly smaller degree.
Michael A. Mandell gave a proof of the following theorem by studying the Steenrod algebra (with coefficients in the algebraic closure of ):
Theorem. The singular cochain functor with coefficients in the algebraic closure of induces a contravariant equivalence from the homotopy category of connected -complete nilpotent spaces of finite -type to a full subcategory of the homotopy category of [[-algebras]] with coefficients in the algebraic closure of .
The cohomology of the Steenrod algebra is the term for the (p-local) Adams spectral sequence, whose abutment is the p-component of the stable homotopy groups of spheres. More specifically, the term of this spectral sequence may be identified as
This is what is meant by the aphorism "the cohomology of the Steenrod algebra is an approximation to the stable homotopy groups of spheres."
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