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My plea failed; I’m curious why. April 27, 2011

Posted by Ben Webster in jobs.
18 comments

So, I put up a post a few days ago asking for people’s assistance making their old grant and job applications available. This turned out to be, as the kids say nowadays, an epic fail. I got no emails from anyone on the subject (well, William Stein replied affirmatively when I asked if he was OK with linking to his page), and one comment pointing to Dror Bar-Natan’s proposals which have been online for a long time (those of you who are paranoid about putting too much math information online should look at his webpage; it is a model of radical openness).

And now I’m really curious: that post had 400 website views and 1200 syndicated views since it went up. So on the order of 1600 people (of course, that’s not very accurate, but fine, whatever, 1000), at least a few hundred of whom are professional mathematicians who have looked for an academic job or applied for a grant before, looked at that post and decided not to put up their documents up or email them to me to put up on my webpage (or to email me about existing posted documents). Probably if you’re reading this now, you read that post and decided not to do that. And now I’m curious: why not?

Which is not to suggest that I can’t imagine a downside, but I’m curious what people think it is.

Petition to save the Geometry group at VU Amsterdam April 27, 2011

Posted by Ben Webster in Uncategorized.
13 comments

Tilman Bauer writes:

Dear colleagues,

I would like to ask you for your support in a difficult political situation at the VU University Amsterdam. They intend to close down pure mathematics and fire everybody in that section, i.e. Dietrich Notbohm, the algebraic K-theorist Rob de Jeu, the general/geometric topologist Jan Dijkstra and myself (a couple of other mathematicians will retire and their positions will disappear as well). That’s four tenured positions. We are trying to rally for support against this plan, as we think that only strong opposition from the mathematical community has any chance of averting this disaster. We have set up an online petition at

http://www.gopetition.com/petitions/save-pure-mathematics-at-the-vu-university-amsterdam.html

and if you support our cause, it would be a great help if you joined it. Here’s the text of the petition, which has some more details about the plan. Please don’t hesitate to contact me if you want more information about what’s going on. (more…)

Mike Freedman on SPC4 April 19, 2011

Posted by Scott Morrison in low-dimensional topology, Poincaré conjecture.
15 comments

Mike Freedman gave a talk last week at Berkeley titled “(Still) thinking about the smooth 4-dimensional Poincare conjecture”, and I’d like to try and relate the main idea.

Back in 2009 Mike, Bob Gompf, Kevin Walker and I wrote a paper “Man and machine thinking about the smooth 4-dimensional Poincare conjecture”, in which we discussed various equivalent and stronger conjectures with more of a “three manifold flavour”, as well as proposing a way to show that certain potential counterexamples, the Cappell-Shaneson spheres, really were counterexamples, using Khovanov homology.

As it turned out, for the Cappell-Shaneson spheres that our computers could cope with Khovanov homology didn’t provide an obstruction. Shortly thereafter, Selman Akbulut posted a short paper showing that a certain integer family of CS spheres (including the two examples we considered) were all in fact standard, and not long after that Bob Gompf killed off some more. In fact, there’s been a whole flurry of work on SPC4 recently: Nash proposing some more counterexamples, Akbulut killing these off too, Akbulut proving a very general class of 4-spheres are standard, along with [1], [2] and [3]. There’s also a paper on Property 2R by Gompf, Scharlemann and Thompson.

Even though recent progress means that there are far far fewer potential counterexamples to SPC4 available, Mike has come up with another idea for detecting counterexamples! Essentially, from each proposed counterexample to the Andrews-Curtis conjecture (below), one can produce a homotopy 4-spheres. This part of the story is old news, but I’ll go over it carefully below. Mike points out that this construction also provides a family of embedded homology 3-spheres. Now any 3-manifold embeds in S^5, but not every 3-manifold embeds in S^4 (e.g. lens spaces, but see more below). The hope now is to show that one of these homology 3-spheres can not embed in the standard S^4, and thus that the homotopy 4-sphere it sits in must be exotic. Mike gave a condition on a 3-manifold Y that exactly determines whether it embeds in S^4, and talked about his ideas towards making this condition an effective test.

So, what is the Andrews-Curtis conjecture? A balanced presentation of a group is simply a presentation with equal numbers of generators and relations. The Andrews-Curtis moves on a balanced presentation are

  • “1-handle slides”: replace a pair of generators \{x, y\} by \{x, xy\}.
  • “2-handle slides”: replace a pair of relations \{r, s\} by \{g r g^{-1} s, s\} (here g is any word in the generators).
  • “handle cancellation”: add a generator along with a new relation killing it

The Andrews-Curtis conjecture says that any balanced presentation of the trivial group can be transformed by Andrews-Curtis moves to the trivial presentation. (There’s a stronger version that says handle cancellation isn’t even needed.) Despite the name, it’s widely expected to be false.

Before continuing, I should explain the funny names I’ve given the moves. Given any presentation of a group, we can build a two-complex whose fundamental group is the group: just take some 1-handles for the generators, and attach 2-handles killing the relations. The names I’ve given the moves correspond to the appropriate geometric operations on this 2-complex.

As an example, consider the presentation xyx=yxy, x^5 = y^4. It’s easy to check that this is the trivial group: y = x^{-1}y^{-1}xyx, so y^5 = x^{-1}y^{-1}x^5yx = x^{-1}y^4x = x^5. Thus y^5 = y^4, and y=1. Even though that was easy, no one has found a sequence of Andrews-Curtis move, even after having looked extremely hard! (e.g. this paper) This is just one case of the family \{ xyx=yxy, x^{n+1} = y^n \} of proposed counterexamples that appears in the paper “A potential smooth counterexample in dimension 4 to the Poincaré conjecture, the Schoenflies conjecture, and the Andrews-Curtis conjecture”, by Selman Akbulut and Rob Kirby (Topology 24 (1985), 375–390). So far the Andrews-Curtis conjecture is just a problem in group theory, but the title of that paper should clue you in that we’re about to construct some manifolds!

Given a balanced presentation P, we can build a 5-manifold Q(P)—just like we built the 2-complex above, start with a 5-ball, attach some 5-dimensional 1-handles for the generators, and then attach some 5-dimensional 2-handles for the relations. To attach the two handles, we actually need to pick links in the boundary of the 0- and 1-handles representing in \pi_1 the relation, but since these boundaries are 4-dimensional there are actually no choices to make. If we started with a presentation of the trivial group, then \partial Q(P) is a homotopy 4-sphere. Moreover, if the presentation is a counterexample to the Andrews-Curtis conjecture, then perhaps this homotopy 4-sphere is a good candidate counterexample to SPC4: you can’t make it standard just by handle slides corresponding to some Andrews-Curtis moves! Of course, you have more freedom to simplify presentations of 4-manifolds, so just having a counterexample to AC doesn’t ensure a counterexample to SPC4.

As it turns out, Bob Gompf subsequently showed that \partial Q(xyx=yxy, x^5 = y^4) is in fact the standard 4-sphere (by introducing a cancelling pair of 2- and 3-handles!). Nevertheless all the higher values of n are still open.

We can alternatively build \partial Q(P) in a different way. Start with a 4-ball, attached some 4-dimensional 1-handles for the generators, and now pick some links L realizing the relations, and attach 4-dimensional 2-handles along these. This produces a 4-manifold W(P,L), which genuinely depends on L, but whose double (the boundary of W \times I) is just our homotopy 4-sphere \partial Q(P). This way of building the homotopy 4-sphere gives us something extra; a 3-manifold Y(P, L) = \partial W(P, L) \times \{1/2\} sitting inside \partial Q(P). In fact, this 3-manifold is a homology sphere.

The challenge now is to pick some counterexample to the AC conjecture, along with a corresponding link, and then to prove that the resulting homology sphere can not be embedded in the standard 4-sphere.

Now Mike wasn’t claiming he knew how to do this; but he did explain a relatively easy theorem giving a precise characterization of when a 3-manifold embeds in the standard 4-sphere, which has a very “3-manifold flavour”. This was

Theorem. A 3-manifold Y embeds in S^4 if and only if it has an Heegaard diagram (\Sigma, \alpha, \beta) and an embedding \iota: \Sigma \to R^3, such that \iota(\alpha) is an unlink, and \iota(\beta) is an unlink.

Mike calls this a doubly unlinked embedded Heegaard diagram. The proof of this theorem is via ambient Morse theory, but I won’t try to give the details here. In fact, every homology 3-sphere has an embedded Heegaard diagram which is doubly null, meaning that the linking matrices for \iota(\alpha) and \iota(\beta) vanish. Of course, actually using this theorem to show that Y doesn’t embed would involve a lot of work. It seems that we’d need to consider all possible embeddings of \Sigma, as well as all possible systems of curves \alpha and \beta. I think Mike has some ideas about this (if you go “far out in the mapping class group”, it should be impossible that the images of the curves are unlinked), but I don’t think I could reproduce those ideas usefully here. Perhaps some of our readers can comment on how plausible this seems, and maybe if we’re lucky Mike will turn up too and say some more.

A plea for putting grant applications online April 19, 2011

Posted by Ben Webster in jobs, math life.
15 comments

A few years ago, I decided as a public service to post my old job application materials online.  Hopefully they were helpful to a person or two out there in the world.  I also tried to make that blog post a bit of a hint to people that they could do the same; I know Noah did, and at least one other person said in comments to that post that they would as well.

The problem with such things is that they aren’t that easy to find even when people put them up.  Being an old fogey who (God I hope) won’t be applying for jobs any time too soon, I’m more interested in NSF grant applications (which while lower stakes than job applications are more mystifying), but I don’t see any need to make a distinction.  I think the world as a whole would be a better place if more people put these documents online.  In that vein, I have a two-part proposal.

  1. You (the internet) make your old job application materials and grant applications available online.  You, of course, should use your judgement about how recent to go and what to include.
  2. I will make a webpage collating these; if you put them on your own website, I will link to them.  If you want I can host the documents myself.  Obviously, if you’d prefer I didn’t link, that’s fine too.

I’ve put a “proof of concept” webpage up with a few examples I already know. I may look a little bit for more for examples people have posted, but mostly I’m hoping people will come to me (after all, I don’t want to give people publicity they don’t want).

Hall algebras are Grothendieck groups April 18, 2011

Posted by Ben Webster in hopf algebras, representation theory.
13 comments

I’ve been attending a seminar/class run by Nick Proudfoot preparing for his workshop this summer on canonical bases. In conversations with Nick and graduate students, and there’s been some confusion about the relationship between Hall algebras and Grothendieck groups. Obviously, if you read the definitions you’ll see they are not the same, but the idea seems to be floating around that there is something going on with them. At some point, I decided writing a blog post on the subject would be a good idea. What are Hall algebras?

The Hall algebra of a category is the Grothendieck group of constructible sheaves/perverse sheaves on the moduli stack of objects in the category. The Hall algebra is an algebra because the constructible derived category of the moduli stack of objects in abelian category is monoidal in a canonical way.

To my mind, this is what makes Hall algebras worth studying, yet it’s oddly ignored in the literature on them (as far as I know; people should feel free to correct me). For example, it’s never mentioned in Schiffmann’s Lectures on Hall Algebras, the closest thing the subject has to a standard reference. (more…)

Some advice on job hunting April 15, 2011

Posted by Ben Webster in jobs.
18 comments

Since Noah at some point produced some useful (if not unanimously endorsed) advice on graduate school, and the topic has been on my mind recently, I thought I would write a post on job-hunting. Interestingly, I’m not sure my 3 rounds of job applications have left me a lot wiser on the subject, but being a faculty member in a department doing a job search has been very educational, if only because it got me looking at the problem from the other side.  Anyways, I don’t claim that I have a very complete view of how to things work or to give comprehensive advice.  But there are some things that popped out at me that maybe candidates don’t know and should.  If I think of more, I might add them. (more…)

On MathOverflow career advice questions April 14, 2011

Posted by Ben Webster in jobs.
Tags:
7 comments

Since this blog has already spawned one rant about career advice on MO, I thought I would make a play for first post written for PlanetMO by commenting a little more on such questions. I’m of a very split opinion of such posts. On one hand, I think most of them are a bad fit for MO and it’s very hard to get good advice from them, given how little MO commenters know of the author. I’m moving more and more to a policy of writing this as a reply to essentially all such questions.

On the other hand, I feel tremendous empathy for the questioners, and really want to help them (seriously, I am announcing here, if you want to write an MO question asking for career advice, email me instead with actual details, and I will answer). Good advice is incredibly hard to get in general. The writer of this question has a genuine quandry, and I’m sure could benefit from discussing the matter with a more senior and experienced person, and I understand the temptation to use MO as a substitute for such a discussion.

Even worse, there’s some part of my psychology that makes it hard not to answer these questions (for example, I couldn’t help answering this question after it moved to math.SE). And there’s no compelling suggestion I have for where to go instead; it’s easy to say that you should discuss these things with a trusted older colleague (especially since its true), but not everybody has such people in their lives. Even though I certainly do, it hasn’t always been trivial to get good advice.

So, maybe the point I’m getting to at the end of this is, is there somewhere to send people? I really wish I had a place to send people like, say, the author of this post, since I think MO is not really filling her/his needs. If s/he doesn’t have someone to ask such basic questions of instead of MO, it’s hard to imagine s/he has someone to talk to about the more serious matters involved in switching jobs.

We broke MathBlogging April 14, 2011

Posted by Ben Webster in Uncategorized.
1 comment so far

I should clarify that the “we” above means “the internet,” not this blog. I was looking for a good moment to MathBlogging, since it’s a promising looking site, but it looks like I’m behind the curve, since I’m getting a 503 “Over Quota” error.

EDIT: Looks like things are fixed now. I guess I just chose an infelicitous time to peek at the site.

Job news April 14, 2011

Posted by Ben Webster in jobs.
5 comments

It’s a sad comment on the place of this blog in my thoughts that I’m putting a post here weeks after posting it on the Jobs Wiki, but better late than never: I’ve accepted a job at Northeastern University starting next year.  Since this is my chance to say so on the internet, let me say that this is not a reflection of any ill will on my part toward the University of Oregon, City of Eugene, Williamette River or the hypothetical nation of Cascadia.  In fact, it was a very tough decision because it was between two good options, but for a number of reasons, many of them personal, I decided the move made sense.

When confusions annihilate April 13, 2011

Posted by Noah Snyder in big list, conferences, planar algebras, quantum algebra, subfactors.
4 comments

As mathematicians we spend most of our lives confused about something or other. Of course, this is occasionally interrupted by moments of clarity that make it worth it. I wanted to discuss a particularly pleasant circumstance: when two confusions annihilate each other. I’ll give two examples of times that this happened to me, but people are encouraged to provide similar examples in the comments.

In both cases what happened was that I had:

  • A question to which I didn’t know the answer
  • An answer to which I didn’t know the question

(more…)

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