Timeline for Is there a name for matrices of the form $a_{ij}=\frac{1}{a_{ji}}$?
Current License: CC BY-SA 4.0
10 events
| when toggle format | what | by | license | comment | |
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| Dec 27, 2023 at 23:12 | vote | accept | bryceadam1 | ||
| Dec 27, 2023 at 14:06 | answer | added | Rodrigo de Azevedo | timeline score: 9 | |
| Dec 27, 2023 at 11:27 | history | edited | Rodrigo de Azevedo | CC BY-SA 4.0 |
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| Dec 27, 2023 at 11:17 | history | edited | Rodrigo de Azevedo | CC BY-SA 4.0 |
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| Dec 27, 2023 at 10:28 | answer | added | Carlo Beenakker | timeline score: 15 | |
| Dec 27, 2023 at 4:59 | comment | added | Ryan Budney | Skew symmetric matrices are interesting largely because they are the tangent space to the identity in the orthogonal group. I'd hesitate to call these matrices skew symmetric in any sense unless there was some kind of similar interesting interpretation to this symmetry. | |
| Dec 27, 2023 at 3:55 | history | edited | Sam Hopkins | CC BY-SA 4.0 |
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| Dec 27, 2023 at 3:54 | comment | added | Sam Hopkins | I would say it is more “kind of skew-symmetric” than “kind of symmetric.” In fact, I might call this matrix “multiplicatively skew-symmetric” if another name doesn’t already exist… EDIT: indeed, Google confirms that “multiplicatively skew-symmetric” has been used for this property. | |
| S Dec 27, 2023 at 3:38 | review | First questions | |||
| Dec 27, 2023 at 5:26 | |||||
| S Dec 27, 2023 at 3:38 | history | asked | bryceadam1 | CC BY-SA 4.0 |