Let $B_n^0$ be the kernel of the abelianization map of the braid group $B_n\to \mathbb{Z}$. Then the geometric realization of the groupoid $\coprod_{n>0} BB_n^0$ of classifying spaces has the homotopy type of $\Omega^2(S^3\langle 3\rangle)$, a double loop space. However, that groupoid is not braided monoidal (it's only monoidal, as far as I know). Anyone have an explanation for this?
http://www.rkursem.com/poll/view.php?id=cd9d896d35fb9a5a4 A poll where you can suggest and vote for, for what is, in your opinon, the most important papers in algebraic topology that has appeared on the arXiv during 2017 (that has appeared so far).
@JonathanBeardsley there is a potential utilitarian calculus here. It could be argued that if the breakthrough prizes really "arrive" in the public consciousness, they could raise the profile of math enough to draw vastly more funding than their cost
I don't know how plausible that seems to me, but some rich and powerful people seem to want to make it happen, because there was a link to the breakthrough prizes from the main google search page the other day
@TylerLawson Am I seeing the same poll everyone else is? It has Nikolaus-Scholze, a button that says Test, a button that says "delete this nephew," and then a space to write something in?
@SaulGlasman Yeah I considered this. I guess I feel like it seems pretty unlikely? But I'm not 100% certain about that.
The reason there are not any more papers on the poll is not meant to be biased, I was just lazy and took a paper I recalled was heavily starred on this webpage.The hope was that people would add some papers they thought were interesting. I did not mean it to be a serious ranking, more as a list of papers that people found particularily important this year.
It was not meant to be too serious. While I agree that it puts a lot of value on certain members of the community, I am not aware of a better forum than this one.