This is the twelfth “research” thread of the Polymath16 project to make progress on the Hadwiger–Nelson problem, continuing this post. This project is a follow-up to Aubrey de Grey’s breakthrough result that the chromatic number of the plane is at least 5. Discussion of the project of a non-research nature should continue in the Polymath proposal page. We will summarize progress on the Polymath wiki page.
Activity on this project has slowed considerably, as we’ve gone 6 months without having to roll over to a new thread. As mentioned in the original thread, the deadline for this project is April 15, 2019, so we only have a couple of weeks remaining. Dömötör and Aubrey took the time to summarize the highlights of what we’ve accomplished in the last year (see below). While we don’t have a single killer result to publish, there are several branches of minor results that warrant publication. Feel free to comment on additional results that were missed in the summaries below, as well as possible venues for publication.
Continue reading Polymath16, twelfth thread: Year in review and future plans
. Suppose you have 
distinct numbers in some field. Is it necessarily possible to arrange the numbers into an 
matrix? (The answer depends on whether you consider 
to be prime.) Recently, Boris reminded me of his email, and I finally bothered to solve it. His hint: Apply ![[0,w]\times\mathbb{R}](https://s0.wp.com/latex.php?latex=%5B0%2Cw%5D%5Ctimes%5Cmathbb%7BR%7D&bg=ffffff&fg=303030&s=0 "[0,w]\times\mathbb{R}")
is k-colorable. Then of course 
and 
for every 
. Furthermore,
![\mathbb{Z}[\omega_1,\omega_3,\omega_4]](https://s0.wp.com/latex.php?latex=%5Cmathbb%7BZ%7D%5B%5Comega_1%2C%5Comega_3%2C%5Comega_4%5D&bg=ffffff&fg=303030&s=0 "\mathbb{Z}[\omega_1,\omega_3,\omega_4]")
to an infinite strip.