Global structure of the mod two symmetric algebra,H^∗(BO; 𝔽₂), over the Steenrod algebra

Abstract: The algebra S of symmetric invariants over the field with two elements is an unstable algebra over the Steenrod algebra A, and is isomorphic to the mod two cohomology of BO , the classifying space for vector bundles. We provide a minimal presentation for S in the category of unstable A-algebras, i.e., minimal generators and minimal relations.From this we produce minimal presentations for various unstable A-algebras associated with the cohomology of related spaces, such as the BO(2 m − 1) that classify finite d… Show more

“…Finally, in roughly the same way that our minimal A-presentation of H * (RP (∞); F 2 ) led to a minimal unstable A-algebra presentation of the symmetric algebra H * (BO; F 2 ) [9], our minimal unstable A-module presentation for H * (CP (∞); F p ) will lead to a minimal unstable A-algebra presentation of the symmetric algebra H * (BU ; F p ). Many of our methods will be the same ones we used in [7,9,10] to determine minimal relations for unstable A-modules and A-algebras.…”

“…We accomplished this for H * (RP (∞); F 2 ) in [9], and will now do so for H * (CP (∞); F p ) (with p odd), where the answer has some fascinating extra twists but is still tractable. In so doing, we will analyze the cyclic subquotients of the Afiltration of H * (CP (∞); F p ) given by alpha-number of complex degree, and determine their minimal A-relations.…”

“…However, there are differences that are quite interesting. The filtered quotients in the mod two case are fairly well-known A-modules; i.e., they are isomorphic to the free unstable modules on single generators t 2 n−1 −1 in degree 2 n−1 − 1 subject to the A-relations Sq 2 k t 2 n−1 −1 = 0 for 0 k n − 3 [9]. In the odd-primary case, since the Steenrod algebra is concentrated in complex degrees divisible by p − 1, any A-module splits as a direct sum of p − 1 A-modules, each of these in degrees with fixed residue mod (p − 1).…”

“…Many of our methods will be the same ones we used in [7,9,10] to determine minimal relations for unstable A-modules and A-algebras. A fundamental element of our computations is the odd-primary even topological Kudo-Araki-May algebra, K, whose definition and properties we developed in [11], and which is well-suited to studying unstable A-modules.…”

Beyond the hit problem: Minimal presentations of odd-primary Steenrod modules, with application to $CP(\infty)$ and BU

“…Finally, in roughly the same way that our minimal A-presentation of H * (RP (∞); F 2 ) led to a minimal unstable A-algebra presentation of the symmetric algebra H * (BO; F 2 ) [9], our minimal unstable A-module presentation for H * (CP (∞); F p ) will lead to a minimal unstable A-algebra presentation of the symmetric algebra H * (BU ; F p ). Many of our methods will be the same ones we used in [7,9,10] to determine minimal relations for unstable A-modules and A-algebras.…”

“…We accomplished this for H * (RP (∞); F 2 ) in [9], and will now do so for H * (CP (∞); F p ) (with p odd), where the answer has some fascinating extra twists but is still tractable. In so doing, we will analyze the cyclic subquotients of the Afiltration of H * (CP (∞); F p ) given by alpha-number of complex degree, and determine their minimal A-relations.…”

“…However, there are differences that are quite interesting. The filtered quotients in the mod two case are fairly well-known A-modules; i.e., they are isomorphic to the free unstable modules on single generators t 2 n−1 −1 in degree 2 n−1 − 1 subject to the A-relations Sq 2 k t 2 n−1 −1 = 0 for 0 k n − 3 [9]. In the odd-primary case, since the Steenrod algebra is concentrated in complex degrees divisible by p − 1, any A-module splits as a direct sum of p − 1 A-modules, each of these in degrees with fixed residue mod (p − 1).…”

“…Many of our methods will be the same ones we used in [7,9,10] to determine minimal relations for unstable A-modules and A-algebras. A fundamental element of our computations is the odd-primary even topological Kudo-Araki-May algebra, K, whose definition and properties we developed in [11], and which is well-suited to studying unstable A-modules.…”

Beyond the hit problem: Minimal presentations of odd-primary Steenrod modules, with application to $CP(\infty)$ and BU

“…First we describe minimal A-presentations for H * RP (∞) and its natural A-filtration pieces F s H * RP (∞). Our A-presentation for H * RP (∞) is in [6,Theorem 6.5], but the proofs there are circuitous and rely on methods that are ill-suited to our primary goal here of minimally presenting the cohomologies H * RP (m) of the finite projective spaces from the presentations of F s H * RP (∞)). We thus propose a new perspective, taking three distinctive and atypical points of view on unstable modules, and we provide proofs of all our results from this perspective.…”

Unstable module presentations for the cohomology of real projective spaces

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