Polynomials and the mod 2 Steenrod Algebra Volume 2 | Cambridge University Press & Assessment

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Polynomials and the mod 2 Steenrod Algebra

Volume 2: Representations of GL (<I>n</I>,F2)

Series:

London Mathematical Society Lecture Note Series

Author:

Grant Walker, University of Manchester
Reginald M. W. Wood, University of Manchester

Published:

November 2017

Volume:

2. Representations of GL (<I>n</I>,F2)

Availability:

Available

Format:

Paperback

ISBN:

9781108414456

NZD$148.95

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$99.99 USD

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Description

This is the first book to link the mod 2 Steenrod algebra, a classical object of study in algebraic topology, with modular representations of matrix groups over the field F of two elements. The link is provided through a detailed study of Peterson's `hit problem' concerning the action of the Steenrod algebra on polynomials, which remains unsolved except in special cases. The topics range from decompositions of integers as sums of 'powers of 2 minus 1', to Hopf algebras and the Steinberg representation of GL(n, F). Volume 1 develops the structure of the Steenrod algebra from an algebraic viewpoint and can be used as a graduate-level textbook. Volume 2 broadens the discussion to include modular representations of matrix groups.

Algebraic and combinatorial treatment of Steenrod algebra
Accessible to those without a background in topology
Largely self-contained with detailed proofs

Reviews & endorsements

'In these volumes, the authors draw upon the work of many researchers in addition to their own work, in places presenting new proofs or improvements of results. Moreover, the material in Volume 2 using the cyclic splitting of P(n) is based in part upon the unpublished Ph.D. thesis of Helen Weaver … Much of the material covered has not hitherto appeared in book form, and these volumes should serve as a useful reference. … readers will find different aspects appealing.' Geoffrey M. L. Powell, Mathematical Reviews

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Product details

Published: November 2017
Format: Paperback
ISBN: 9781108414456
Length: 378 pages
Dimensions: 227 × 152 × 23 mm
Weight: 0.55kg
Contains: 1 b/w illus.
Availability: Available

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Contents

Preface
16. The action of GL(n) on flags
17. Irreducible F2GL(n)-modules
18. Idempotents and characters
19. Splitting P(n) as an A2-module
20. The algebraic group Ḡ(n)
21. Endomorphisms of P(n) over A2
22. The Steinberg summands of P(n)
23. The d-spike module J(n)
24. Partial flags and J(n)
25. The symmetric hit problem
26. The dual of the symmetric hit problem
27. The cyclic splitting of P(n)
28. The cyclic splitting of DP(n)
29. The 4-variable hit problem, I
30. The 4-variable hit problem, II
Bibliography
Index of Notation for Volume 2
Index for Volume 2
Index of Notation for Volume 1
Index for Volume 1.

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About the authors

Authors

Grant Walker , University of Manchester
Grant Walker was a senior lecturer in the School of Mathematics at the University of Manchester before his retirement in 2005.
Reginald M. W. Wood , University of Manchester
Reginald M. W. Wood was a Professor in the School of Mathematics at the University of Manchester before his retirement in 2005.

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