Timeline for A linear algebra question regarding the eigenvalues of the product of a diagonal matrix and a projection matrix
Current License: CC BY-SA 4.0
11 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| S Apr 13, 2020 at 23:19 | history | suggested | Rodrigo de Azevedo | CC BY-SA 4.0 |
Added tag. Minor improvements
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| Apr 13, 2020 at 20:10 | review | Close votes | |||
| Apr 17, 2020 at 6:13 | |||||
| Apr 13, 2020 at 19:52 | comment | added | Darth Vader | I see- I mistakenly read $\xi$ as eigenvector :). Sorry, | |
| Apr 13, 2020 at 19:51 | comment | added | user44191 | @DarthVader Each $\xi_i$ is a number (one of the $p - 1$ eigenvalues of $AP$). | |
| Apr 13, 2020 at 19:49 | comment | added | Darth Vader | $\xi$ is a vector and $1$ is a number- that's why I am confused by your notation. | |
| Apr 13, 2020 at 19:42 | comment | added | Ken | 1 + t$\xi$ is "the sum of one and the product of t and $\xi_i$" | |
| Apr 13, 2020 at 19:39 | answer | added | Ken | timeline score: 1 | |
| Apr 13, 2020 at 19:29 | comment | added | Darth Vader | What does $1+t\xi_i$ mean? | |
| Apr 13, 2020 at 19:14 | review | Suggested edits | |||
| S Apr 13, 2020 at 23:19 | |||||
| Apr 13, 2020 at 18:35 | review | First posts | |||
| Apr 13, 2020 at 19:52 | |||||
| Apr 13, 2020 at 18:34 | history | asked | Ken | CC BY-SA 4.0 |