This is the eleventh “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.
Here’s a brief summary of the progress made in the previous thread:
– Let w(k) denote the supremum of w such that ![[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}")
Colorings that produce these lower bounds are depicted here. The upper bound for k=3 is given here.
– The largest known k-colorable disks for k=2,3,4,5 are depicted here.
Presumably, we can obtain descent upper bounds on w(4) by restricting (a finite subset of) the ring ![\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]")
