Poincaré Duality Algebras, Macaulay's Dual Systems, and Steenrod Operations
Poincar Duality Algebras, Macaulay's Dual Systems, and Steenrod OperationsAuthor(s): Dagmar M. Meyer, Larry Smith\nFormat: Hardback\nPublisher: Cambridge University Press, United Kingdom\nImprint: Cambridge University Press\nISBN-13: 9780521850643, 978-0521850643\nSynopsis\nPoincar duality algebras originated in the work of topologists on the cohomology of closed manifolds, and Macaulay's dual systems in the study of irreducible ideals in polynomial algebras. These two ideas are tied together using basic commutative algebra involving Gorenstein algebras. Steenrod operations also originated in algebraic topology, but may best be viewed as a means of encoding the information often hidden behind the Frobenius map in characteristic p<>0. They provide a noncommutative tool to study commutative algebras over a Galois field. In this Tract the authors skilfully bring together these ideas and apply them to problems in invariant theory. A number of remarkable and unexpected interdiscipl.
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