Timeline for Is every finite poset a subset of a finite complemented distributive lattice?
Current License: CC BY-SA 4.0
8 events
| when toggle format | what | by | license | comment | |
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| Apr 14 at 15:00 | answer | added | Sam Hopkins | timeline score: 2 | |
| Jul 13, 2023 at 22:21 | vote | accept | Pedram | ||
| Jul 13, 2023 at 16:15 | history | became hot network question | |||
| Jul 13, 2023 at 9:54 | answer | added | Joel David Hamkins | timeline score: 6 | |
| Jul 13, 2023 at 6:07 | history | edited | LSpice | CC BY-SA 4.0 |
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| Jul 13, 2023 at 5:44 | history | edited | YCor |
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| Jul 13, 2023 at 2:46 | comment | added | Sam Hopkins | Let $P$ be a poset. Associate to any $p \in P$ the subset $S_p := \{q\in P\colon q \leq p\}$. Then the induced subposet of the Boolean lattice of subsets of $P$ given by the subsets $S_p$ for $p \in P$ is isomorphic to $P$. | |
| Jul 13, 2023 at 2:42 | history | asked | Pedram | CC BY-SA 4.0 |