An update to double origin plane (S66) #1420
Conversation
P200 (Simply connected): I will propose a PR about S51 (Khalimsky line) and S213 (pseudocircle) to prove this, see #1422, maybe I will resolve S66|P200 in that PR (construct a continuous map from S66 to S213, and it induce a homomorphism between their fund. groups). |
P217 (Strongly zero-dimensional): already resolved by T400 of #1414, if you merge main branch. 
|
Co-authored-by: yhx-12243 <yhx12243@gmail.com>
|
@yhx-12243 how do you see it on a graph like that? |
See pi-base/web#81. |
|
@yhx-12243 hmm... thanks. How would you actually apply it though? Do you need to download main web, merge graph into main, then download the data? |
Roughly yes, by deploying it at my local machine/server. |
Most of missing traits, zbMath references and cleanup.
I guess strongly zero dimensional will be resolved by a theorem in the future (I suppose strongly 0-dim + Hausdorff => totally path disconnected).
To my understanding the space is not simply connected (the fundamental group should be$\mathbb Z$ ) but I am not that confident about algebraic topology to write the proof down (I guess one can find a universal cover for it, but it would be a bit odd space).