A Micrographia of Beastly Feynman Diagrams

Earlier this year, I had a paper about the weird multi-dimensional curves you get when you try to compute trickier and trickier Feynman diagrams. These curves were “Calabi-Yau”, a type of curve string theorists have studied as a way to curl up extra dimensions to preserve something called supersymmetry. At the time, string theorists asked me why Calabi-Yau curves showed up in these Feynman diagrams. Do they also have something to do with supersymmetry?

I still don’t know the general answer. I don’t know if all Feynman diagrams have Calabi-Yau curves hidden in them, or if only some do. But for a specific class of diagrams, I now know the reason. In this week’s paper, with Jacob Bourjaily, Andrew McLeod, and Matthias Wilhelm, we prove it.

We just needed to look at some more exotic beasts to figure it out.

tardigrade_eyeofscience_960

Like this guy!

Meet the tardigrade. In biology, they’re incredibly tenacious microscopic animals, able to withstand the most extreme of temperatures and the radiation of outer space. In physics, we’re using their name for a class of Feynman diagrams.

even_loop_tardigrades

A clear resemblance!

There is a long history of physicists using whimsical animal names for Feynman diagrams, from the penguin to the seagull (no relation). We chose to stick with microscopic organisms: in addition to the tardigrades, we have paramecia and amoebas, even a rogue coccolithophore.

The diagrams we look at have one thing in common, which is key to our proof: the number of lines on the inside of the diagram (“propagators”, which represent “virtual particles”) is related to the number of “loops” in the diagram, as well as the dimension. When these three numbers are related in the right way, it becomes relatively simple to show that any curves we find when computing the Feynman diagram have to be Calabi-Yau.

This includes the most well-known case of Calabi-Yaus showing up in Feynman diagrams, in so-called “banana” or “sunrise” graphs. It’s closely related to some of the cases examined by mathematicians, and our argument ended up pretty close to one made back in 2009 by the mathematician Francis Brown for a different class of diagrams. Oddly enough, neither argument works for the “traintrack” diagrams from our last paper. The tardigrades, paramecia, and amoebas are “more beastly” than those traintracks: their Calabi-Yau curves have more dimensions. In fact, we can show they have the most dimensions possible at each loop, provided all of our particles are massless. In some sense, tardigrades are “as beastly as you can get”.

We still don’t know whether all Feynman diagrams have Calabi-Yau curves, or just these. We’re not even sure how much it matters: it could be that the Calabi-Yau property is a red herring here, noticed because it’s interesting to string theorists but not so informative for us. We don’t understand Calabi-Yaus all that well yet ourselves, so we’ve been looking around at textbooks to try to figure out what people know. One of those textbooks was our inspiration for the “bestiary” in our title, an author whose whimsy we heartily approve of.

Like the classical bestiary, we hope that ours conveys a wholesome moral. There are much stranger beasts in the world of Feynman diagrams than anyone suspected.

Advertisements

5 thoughts on “A Micrographia of Beastly Feynman Diagrams

  1. mitchellporter

    I’m shocked by the very idea that every Feynman diagram with loops, is an integral over a Calabi-Yau space. If it’s true, it seems to be saying something fundamental about path integrals, and the geometry of the infinite-dimensional configuration space over which they are defined. I guess I’d be looking for some preferred role that Calabi-Yaus play in (infinite-dimensional?) complex analysis.

    Like

    Reply
    1. 4gravitonsandagradstudent Post author

      Possibly, yeah, though I’d caution that we can’t prove the “every” yet…we’ve been looking for counterexamples, but the tricky part is that for anything that isn’t in a form where it’s already obviously Calabi-Yau people seem to have a hard time computing its first Chern class (which would be the way to confirm that a specific case wasn’t Calabi-Yau). It’s still possible that this is limited to the propagator counting we look at in the paper and a few accidental additional cases.

      Like

      Reply
  2. Anant Saxena

    Off topic: Do you plan to respond to Sabine’s pro’s and con’s of String theory? As in, do you think this is a fair review?

    Like

    Reply
    1. 4gravitonsandagradstudent Post author

      So, it looks like this is basically just a video version of her older post about this with some topical updates.

      I don’t think either was intended to be a serious review of the subject in any sense, which makes critiquing it as such more than a little silly. There are definitely aspects of how she usually talks about string theory that I think are misleading (talking about low-energy SUSY as if it was an inherent part of the string theory picture, treating tweaks to the theory and discoveries of stuff the theory can do as interchangeable), but that isn’t really unique to that post.

      I am pretty annoyed at her summary of string theory’s contributions to QFT as “so far this approach has not been terribly successful”, but it’s clearly a throwaway comment in a section where she’s trying to be “nice” so I probably shouldn’t complain. (I don’t know if amplitudes should “count” as an application of string theory, but there are techniques there that wouldn’t have been invented without string theory and are currently used for practical LHC calculations, so…)

      Like

      Reply

Leave a Reply

Fill in your details below or click an icon to log in:

WordPress.com Logo

You are commenting using your WordPress.com account. Log Out /  Change )

Google photo

You are commenting using your Google account. Log Out /  Change )

Twitter picture

You are commenting using your Twitter account. Log Out /  Change )

Facebook photo

You are commenting using your Facebook account. Log Out /  Change )

Connecting to %s