Timeline for The Norm Map in (group) cohomology via classifying spaces
Current License: CC BY-SA 3.0
9 events
| when toggle format | what | by | license | comment | |
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| Jan 3, 2012 at 8:28 | comment | added | Justin Noel | @Chris: Sorry about that. I'm stilling learning how to use this system. It's fixed now. | |
| Jan 3, 2012 at 8:27 | history | edited | Justin Noel | CC BY-SA 3.0 |
Fixed link.
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| Jan 3, 2012 at 0:51 | comment | added | Chris Gerig | @Justin: The link is broken, could you fix it / provide another link? And thanks, May's book seems like it will be very informative on top of his other suggestion. | |
| Dec 30, 2011 at 18:32 | comment | added | Justin Noel | I would also recommend Equivariant homotopy and cohomology theory available off of Peter's website here: math.uchicago.edu/~may/BOOKS/alaska.pdf as well as the course notes of Stefan Schwede which I linked to above. | |
| Dec 30, 2011 at 13:53 | vote | accept | Chris Gerig | ||
| Dec 30, 2011 at 13:53 | comment | added | Chris Gerig | Hi Justin and Prof. May! This is nice. Unfortunately, I know nothing about equivariant homotopy and spectrum level stuff; do you have a reference of a good place to start? | |
| Dec 29, 2011 at 13:09 | comment | added | Peter May | The article Justin refers to is ``Localization and completion theorems for $MU$-module spectra''. Annals of Math. 146(1997), 509-544. Its key technical tool is the multiplicative norm map. That is also a key technical tool in the work of Hill, Hopkins, and Ravenel on the Kervaire invariant problem. Their definition exhibits the norm map explicitly on the equivariant spectrum level, Greenlees and May only implicitly. Anna Marie Bohmann has lifted the Greenlees-May construction to the spectrum level and shown that the two coincide. | |
| Dec 29, 2011 at 12:22 | history | edited | Justin Noel | CC BY-SA 3.0 |
Fix mistake.
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| Dec 29, 2011 at 11:55 | history | answered | Justin Noel | CC BY-SA 3.0 |