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Global structure of the mod two symmetric algebra,
H*(BO;F2), over the Steenrod
algebra
David J Pengelley and Frank Williams
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Algebraic & Geometric Topology 3
(2003) 1119–1138
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Abstract
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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, ie, 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(2m-1) that classify finite dimensional
vector bundles, and the connected covers of BO. The presentations
then show that certain of these unstable A–algebras
coalesce to produce the Dickson algebras of general linear group
invariants, and we speculate about possible related topological
realizability.
Our methods also produce a related simple minimal A–module
presentation of the cohomology of infinite dimensional real projective space,
with filtered quotients the unstable modules F(2p-1)/AAp-2, as described in an
independent appendix.
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Keywords
symmetric algebra, Steenrod algebra,
unstable algebra, classifying space, Dickson algebra, BO,
real projective space.
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Mathematical Subject Classification
Primary: 55R45
Secondary: 13A50, 16W22, 16W50, 55R40,
55S05, 55S10
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Publication
Received: 24 October 2003
Accepted: 5 November 2003
Published: 10 November 2003
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