Dual Steenrod algebra

In algebraic topology, through an algebraic operation (dualization), there is an associated commutative algebra^[1] from the noncommutative Steenrod algebras called the dual Steenrod algebra. This dual algebra has a number of surprising benefits, such as being commutative and provided technical tools for computing the Adams spectral sequence in many cases (such as ${\displaystyle {\pi }_{\ast }(MU)}$^[2]Template:Rp) with much ease.

Recall^[2]Template:Rp that the Steenrod algebra

(also denoted

) is a graded noncommutative Hopf algebra which is cocommutative, meaning its comultiplication is cocommutative. This implies if we take the dual Hopf algebra, denoted

, or just

, then this gives a graded-commutative algebra which has a noncommutative comultiplication. We can summarize this duality through dualizing a commutative diagram of the Steenrod's Hopf algebra structure:

${\displaystyle {𝒜}_p^{\ast }\stackrel{{\psi }^{\ast }}{\to }{𝒜}_p^{\ast }\otimes {𝒜}_p^{\ast }\stackrel{{\varphi }^{\ast }}{\to }{𝒜}_p^{\ast }}$

If we dualize we get maps

${\displaystyle {𝒜}_{p,\ast }\stackrel{{\psi }_{\ast }}{\leftarrow }{𝒜}_{p,\ast }\otimes {𝒜}_{p,\ast }\stackrel{{\varphi }_{\ast }}{\leftarrow }{𝒜}_{p,\ast }}$

giving the main structure maps for the dual Hopf algebra. It turns out there's a nice structure theorem for the dual Hopf algebra, separated by whether the prime is

or odd.

In this case, the dual Steenrod algebra is a graded commutative polynomial algebra

where the degree

. Then, the coproduct map is given by

${\displaystyle \Delta :{𝒜}_{\ast }\to {𝒜}_{\ast }\otimes {𝒜}_{\ast }}$

sending

${\displaystyle \Delta {\xi }_n=\sum _{0\le i\le n}{\xi }_{n-i}^{2^i}\otimes {\xi }_i}$

where

.

For all other prime numbers, the dual Steenrod algebra is slightly more complex and involves a graded-commutative exterior algebra in addition to a graded-commutative polynomial algebra. If we let

denote an exterior algebra over

with generators

and

, then the dual Steenrod algebra has the presentation

${\displaystyle {𝒜}_{\ast }=\mathbb{Z}/p[{\xi }_1,{\xi }_2,\dots ]\otimes \Lambda ({\tau }_0,{\tau }_1,\dots )}$

where

${\displaystyle \begin{array}{cc}\mathrm{deg}({\xi }_n)& =2(p^n-1)\\ \mathrm{deg}({\tau }_n)& =2p^n-1\end{array}}$

In addition, it has the comultiplication

defined by

${\displaystyle \begin{array}{cc}\Delta ({\xi }_n)& =\sum _{0\le i\le n}{\xi }_{n-i}^{p^i}\otimes {\xi }_i\\ \Delta ({\tau }_n)& ={\tau }_n\otimes 1+\sum _{0\le i\le n}{\xi }_{n-i}^{p^i}\otimes {\tau }_i\end{array}}$

where again

.

The rest of the Hopf algebra structures can be described exactly the same in both cases. There is both a unit map

and counit map

${\displaystyle \begin{array}{cc}\eta & :\mathbb{Z}/p\to {𝒜}_{\ast }\\ \epsilon & :{𝒜}_{\ast }\to \mathbb{Z}/p\end{array}}$

which are both isomorphisms in degree

: these come from the original Steenrod algebra. In addition, there is also a conjugation map

defined recursively by the equations

${\displaystyle \begin{array}{cc}c({\xi }_0)& =1\\ \sum _{0\le i\le n}{\xi }_{n-i}^{p^i}c({\xi }_i)& =0\end{array}}$

In addition, we will denote

as the kernel of the counit map

which is isomorphic to

in degrees

.

• Adams-Novikov spectral sequence

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