Evaluation of some Maunder cohomology operations

2009 ◽

Vol 16 (1) ◽

pp. 1-12

Author(s):

Hans-Joachim Baues

Keyword(s):

Homotopy Groups ◽

Homotopy Groups Of Spheres ◽

Cohomology Operations

Abstract The computation of the algebra of secondary cohomology operations in [Baues, The algebra of secondary cohomology operations, Birkhäuser Verlag, 2006] leads to a conjecture concerning the algebra of higher cohomology operations in general and an Ext-formula for the homotopy groups of spheres. This conjecture is discussed in detail in this paper.

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Higher cohomology operations and R–completion

Algebraic & Geometric Topology ◽

10.2140/agt.2018.18.247 ◽

2018 ◽

Vol 18 (1) ◽

pp. 247-312 ◽

Cited By ~ 2

Author(s):

David Blanc ◽

Debasis Sen

Keyword(s):

Cohomology Operations

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Book Review: Cohomology operations and applications in homotopy theory

Bulletin of the American Mathematical Society ◽

10.1090/s0002-9904-1969-12296-2 ◽

1969 ◽

Vol 75 (5) ◽

pp. 929-930

Author(s):

M. Mahowald

Keyword(s):

Homotopy Theory ◽

Cohomology Operations

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Functional Cohomology Operations and Relations

American Journal of Mathematics ◽

10.2307/2373067 ◽

1965 ◽

Vol 87 (3) ◽

pp. 649 ◽

Cited By ~ 4

Author(s):

Jean-Pierre Meyer

Keyword(s):

Cohomology Operations

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Secondary Cohomology Operations: Two Formulas

American Journal of Mathematics ◽

10.2307/2372745 ◽

1959 ◽

Vol 81 (2) ◽

pp. 281 ◽

Cited By ~ 27

Author(s):

F. P. Peterson ◽

N. Stein

Keyword(s):

Cohomology Operations

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An Overview of the Proof

The Norm Residue Theorem in Motivic Cohomology ◽

10.23943/princeton/9780691191041.003.0001 ◽

2019 ◽

pp. 3-22

Author(s):

Christian Haesemeyer ◽

Charles A. Weibel

Keyword(s):

Motivic Cohomology ◽

Norm Residue ◽

Cohomology Operations ◽

Definition Of ◽

Special Case

This chapter provides the main steps in the proof of Theorems A and B regarding the norm residue homomorphism. It also proves several equivalent (but more technical) assertions in order to prove the theorems in question. This chapter also supplements its approach by defining the Beilinson–Lichtenbaum condition. It thus begins with the first reductions, the first of which is a special case of the transfer argument. From there, the chapter presents the proof that the norm residue is an isomorphism. The definition of norm varieties and Rost varieties are also given some attention. The chapter also constructs a simplicial scheme and introduces some features of its cohomology. To conclude, the chapter discusses another fundamental tool—motivic cohomology operations—as well as some historical notes.

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