Timeline for What does it mean for the $\Pi_\infty$ groupoid to be fully fibrant?
Current License: CC BY-SA 3.0
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| Oct 1, 2013 at 13:19 | history | edited | Ricardo Andrade | CC BY-SA 3.0 |
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| Oct 1, 2013 at 13:14 | comment | added | Charles Rezk | Also look at mathoverflow.net/questions/18926/… | |
| Oct 1, 2013 at 13:13 | comment | added | Charles Rezk | I'd have to look at the Anderson paper to be sure, but I suspect his funny $\Pi_\infty$ condition is related to something called the "$\pi_*$-Kan condition", which was introduced by Bousfield and Friedlander as a hypothesis for results of exactly the one you quote from Anderson. I believe there is a discussion of this in the Goerss-Jardine book on simplicial sets. | |
| Oct 1, 2013 at 12:59 | history | edited | Simon Markett | CC BY-SA 3.0 |
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| Oct 1, 2013 at 9:47 | history | edited | Simon Markett | CC BY-SA 3.0 |
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| Oct 1, 2013 at 8:55 | history | edited | Simon Markett | CC BY-SA 3.0 |
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| Oct 1, 2013 at 7:36 | history | edited | Simon Markett | CC BY-SA 3.0 |
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| Sep 30, 2013 at 18:27 | history | edited | Benjamin Steinberg | CC BY-SA 3.0 |
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| Sep 30, 2013 at 16:08 | comment | added | Simon Markett | Sure, it's 'fibrations and geometric realizations' Bulletin of the AMS, Vol 84 No 5, Sept 1978 | |
| Sep 30, 2013 at 15:49 | comment | added | Fernando Muro | Could you add a reference for Anderson's paper? | |
| Sep 30, 2013 at 13:40 | history | asked | Simon Markett | CC BY-SA 3.0 |