Timeline for Seeing stacks in the Calculus of Functors
Current License: CC BY-SA 4.0
8 events
| when toggle format | what | by | license | comment | |
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| May 21, 2018 at 16:03 | comment | added | Tim Campion | I don't think the nforum discussion substantiates the claim that the homotopy calculus comes from the Weiss topology -- just that it comes from some hypertopology related to the atomic topology. After all, the $n$th Weiss topology of the atomic topology is still the atomic topology. Of course, the manifold calculus does come from the Weiss topology. See comments #45-47 at the nforum discussion. | |
| May 12, 2018 at 0:46 | history | edited | Dmitri Pavlov | CC BY-SA 4.0 |
Added a link to the nForum
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| Feb 13, 2016 at 15:10 | comment | added | Dmitri Pavlov | @UrsSchreiber: I answered on nForum. | |
| Feb 13, 2016 at 13:56 | comment | added | Urs Schreiber | Could we check the claim for Goodwillie calculus? Boavida-Weiss do not quite speak about that explicitly, do they. What exactly is the claim meant to be for this case? | |
| Feb 9, 2016 at 20:18 | comment | added | B. Bischof | Incredible, Dmitri, this question has been open for so long, and this seems like a great reply. | |
| Feb 9, 2016 at 11:58 | comment | added | Dmitri Pavlov | @UrsSchreiber: I learned this material from Hiro Tanaka's notes Manifold calculus is dual to factorization homology. It is more-or-less explained in this way in the paper of Boavida and Weiss. | |
| Feb 9, 2016 at 11:00 | comment | added | Urs Schreiber | Sounds great. Should this answer come with a reference or with the announcement of a reference? | |
| Feb 5, 2016 at 15:22 | history | answered | Dmitri Pavlov | CC BY-SA 3.0 |