Timeline for Do all $\mathbb{E}_{k}$-comonoids in $\mathcal{C}_*$ come from “freely-pointed” $\mathbb{E}_{k}$-comonoids on $\mathcal{C}$?
Current License: CC BY-SA 4.0
8 events
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| Aug 11, 2021 at 21:58 | history | edited | Emily | CC BY-SA 4.0 |
Corrected an inaccuracy in the title (thanks, Maxi!)
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| Aug 11, 2021 at 21:58 | comment | added | Emily | An update: Maximilien replied to my question in email: 1) Lemma 2.4 is valid for all $(\mathcal{C}_*,\wedge,S^0)$; 2) One can carry this construction over to the $\infty$-setting too; 3) The analogue of his result with Shipley is true for $\mathcal{S}_*$, and in fact also for any $\infty$-topos. | |
| Aug 11, 2021 at 14:45 | history | edited | Emily | CC BY-SA 4.0 |
added 11 characters in body
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| Aug 11, 2021 at 12:56 | history | rollback | Emily |
Rollback to Revision 1
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| Aug 11, 2021 at 12:54 | comment | added | Emily | @DenisNardin sorry, I completely misunderstood your comment (and have reverted the edit back). Thanks! | |
| Aug 10, 2021 at 22:05 | comment | added | Denis Nardin | I am confused by your reference to my comment. I was talking about $E_k$-monoids, and here you seem to be talking about $E_k$-comonoids... | |
| Aug 10, 2021 at 17:28 | history | edited | Emily | CC BY-SA 4.0 |
reformulated the question
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| Aug 10, 2021 at 15:17 | history | asked | Emily | CC BY-SA 4.0 |