Timeline for Projections in a W*-algebra as a continuous lattice?
Current License: CC BY-SA 3.0
9 events
| when toggle format | what | by | license | comment | |
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| Feb 12, 2014 at 8:29 | answer | added | user46855 | timeline score: 2 | |
| Jul 3, 2013 at 16:49 | history | edited | Rennela | CC BY-SA 3.0 |
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| Jun 21, 2013 at 10:03 | history | edited | Rennela | CC BY-SA 3.0 |
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| Jun 10, 2013 at 9:28 | comment | added | Rennela | According to Gierz' Compendium on continuous lattices, continuous lattices form an overlapping subclass of continuous geometry. | |
| Jun 10, 2013 at 8:39 | vote | accept | Rennela | ||
| Jun 9, 2013 at 18:34 | comment | added | Rennela | Theorem 6 of this article states that any orthocomplemented modular lattice of type II is a continuous geometry. A continuous geometry is a lattice L that is complemented, modular, meet continuous, and join continuous. I don't know how it relates to continuous lattices but I know that continuous lattices can be characterized equationally : encyclopediaofmath.org/index.php/Continuous_lattice | |
| Jun 7, 2013 at 7:38 | comment | added | Abel Stolz | Is the article by Kaplansky "Any orthocomplemented complete modular lattice is a continuous geometry." useful? | |
| Jun 7, 2013 at 6:01 | answer | added | Nik Weaver | timeline score: 9 | |
| Jun 7, 2013 at 2:43 | history | asked | Rennela | CC BY-SA 3.0 |