A 2nd countable totally ordered compact space might NOT be order preserving embedable in the real line. Double cut open each point of [0,1], so that there are uncountably many successors. However this space CAN be topologically embedded in the real line, since it's homeomorphic to Cantor space. - ThreadSky

paulfabel.bsky.social • 24 days ago

A 2nd countable totally ordered compact space might NOT be order preserving embedable in the real line. Double cut open each point of [0,1], so that there are uncountably many successors. However this space CAN be topologically embedded in the real line, since it's homeomorphic to Cantor space.

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