Timeline for (Co)homology of the Eilenberg-MacLane spaces K(G,n)
Current License: CC BY-SA 3.0
13 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Feb 10, 2017 at 13:09 | comment | added | Bruno Stonek | Another reference for the $\mathbb{F}_p$-homology of the $K(\mathbb{F}_p, n)$ (following Cartan's method) is in the thesis of Alain Prouté: logique.jussieu.fr/~alp/these_A_Proute-TAC.pdf | |
| S Nov 24, 2016 at 4:04 | history | suggested | Thibaut Dumont | CC BY-SA 3.0 |
minor typo edit
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| Nov 24, 2016 at 3:19 | review | Suggested edits | |||
| S Nov 24, 2016 at 4:04 | |||||
| Feb 25, 2015 at 9:17 | answer | added | მამუკა ჯიბლაძე | timeline score: 8 | |
| Aug 16, 2011 at 9:00 | answer | added | Mark Grant | timeline score: 19 | |
| May 15, 2010 at 21:18 | comment | added | Lennart Meier | Hatcher's spectral sequence text computes only cohomologies of Eilenberg-MacLane spaces with Z/2-coefficients, but her refers to J. P. May, A general approach to Steenrod operations, Springer Lecture Notes 168 (1970), 153–231 for an integral computation. | |
| May 15, 2010 at 18:41 | answer | added | Paul | timeline score: 16 | |
| May 15, 2010 at 16:53 | vote | accept | Akela | ||
| May 15, 2010 at 14:50 | answer | added | algori | timeline score: 20 | |
| May 15, 2010 at 14:49 | answer | added | S. Carnahan♦ | timeline score: 11 | |
| May 15, 2010 at 14:29 | comment | added | Ryan Budney | See an introductory algebraic topology text like Hatcher or May. The (co)homology of Eilenberg-Maclane spaces are heavily studied. In a "stable range" this cohomology is called the Steenrod Algebra. | |
| May 15, 2010 at 14:23 | comment | added | Robin Chapman | The (co)homology of $K(G,1)$ is well-known to equal the group (co)homology of $G$ with integer coefficients. I don't know what happens for $n>1$. | |
| May 15, 2010 at 14:15 | history | asked | Akela | CC BY-SA 2.5 |