User Peter May

8 votes

Terminology question for real K-theory

answered Dec 14, 2012 at 15:18

8 votes

Accepted

Connection between complex orientations and R-orientations for a ring spectrum R?

answered Feb 13, 2013 at 5:35

8 votes

Accepted

What space classifies bundles of K(pi,1)'s?

answered Feb 15, 2013 at 3:38

8 votes

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Filtration on Smash Product of Cofibers

answered Feb 19, 2013 at 3:06

7 votes

Triality of Spin(8)

answered Dec 18, 2012 at 21:55

7 votes

Coherent MU_*-Modules

answered Sep 23, 2012 at 21:38

7 votes

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Does a pointed homotopy equivalence between pointed $G$-spaces which is $G$-equivariant induce a (weak) homotopy equivalence on pointed Borel constructions?

answered Aug 21, 2012 at 15:44

7 votes

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Equivalence between $E_\infty$-spaces and connective spectra

answered Mar 8, 2012 at 4:20

7 votes

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Derived functors of symmetric powers

answered May 17, 2012 at 14:05

7 votes

Stable homotopy theory of orbifolds

answered Nov 11, 2011 at 2:36

7 votes

Filtered ring giving rise to a graded-commutative ring

answered Dec 28, 2011 at 2:34

7 votes

Meaning of A-infinity relations

answered Oct 1, 2019 at 15:25

7 votes

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Homotopy of functors

answered Jan 1, 2020 at 21:28

7 votes

Massey products in the Steenrod algebra

answered Mar 20, 2016 at 20:39

7 votes

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Postnikov tower for $S^2$

answered Jan 18, 2020 at 15:31

7 votes

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Different ways to “deloop” a (topological) $A_\infty$-algebra

answered Sep 11, 2020 at 2:29

7 votes

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Why is the path fibration a strong Hurewicz fibration?

answered Jul 6, 2013 at 21:48

7 votes

Projective objects in the category of chain complexes

answered May 5, 2013 at 21:44

7 votes

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Semi-free resolutions

answered Dec 6, 2013 at 2:37

7 votes

What (if anything) unifies stable homotopy theory and Grothendieck's six functors formalism?

answered Jun 8, 2014 at 1:07

7 votes

How to recognize a Hopf algebra?

answered Apr 6, 2014 at 3:05

7 votes

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Algebraic $K$-theory of algebras in symmetric spectra: reference

answered Jul 27, 2014 at 20:15

7 votes

Is the category of $G$-spaces a model category?

answered Aug 7, 2014 at 1:56

6 votes

Is an A-infinity thing the same the same as strict thing viewed through a homotopy equivalence?

answered Nov 25, 2014 at 0:18

6 votes

Computations in modular cohomology of finite groups

answered Sep 14, 2015 at 3:52

6 votes

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Technology for various models of spectra

answered Dec 12, 2013 at 18:44

6 votes

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Two-sided bar construction

answered Oct 12, 2013 at 13:56

6 votes

Reading list for Equivariant Cohomology

answered Jan 6, 2020 at 14:55

6 votes

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Model categories and chain complexes

answered May 8, 2020 at 14:11

6 votes

Lecture notes by Mahowald and Unell

answered Jun 21, 2019 at 22:14

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268 Answers

Terminology question for real K-theory

Connection between complex orientations and R-orientations for a ring spectrum R?

What space classifies bundles of K(pi,1)'s?

Filtration on Smash Product of Cofibers

Triality of Spin(8)

Coherent MU_*-Modules

Does a pointed homotopy equivalence between pointed $G$-spaces which is $G$-equivariant induce a (weak) homotopy equivalence on pointed Borel constructions?

Equivalence between $E_\infty$-spaces and connective spectra

Derived functors of symmetric powers

Stable homotopy theory of orbifolds

Filtered ring giving rise to a graded-commutative ring

Meaning of A-infinity relations

Homotopy of functors

Massey products in the Steenrod algebra

Postnikov tower for $S^2$

Different ways to “deloop” a (topological) $A_\infty$-algebra

Why is the path fibration a strong Hurewicz fibration?

Projective objects in the category of chain complexes

Semi-free resolutions

What (if anything) unifies stable homotopy theory and Grothendieck's six functors formalism?

How to recognize a Hopf algebra?

Algebraic $K$-theory of algebras in symmetric spectra: reference

Is the category of $G$-spaces a model category?

Is an A-infinity thing the same the same as strict thing viewed through a homotopy equivalence?

Computations in modular cohomology of finite groups

Technology for various models of spectra

Two-sided bar construction

Reading list for Equivariant Cohomology

Model categories and chain complexes

Lecture notes by Mahowald and Unell