Timeline for Is it that only with normal matrices, the transition matrix to its [del: inherent] [ins: own] basis is unitary?
Current License: CC BY-SA 2.5
6 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Nov 7, 2009 at 16:33 | vote | accept | person | ||
| Nov 7, 2009 at 14:58 | comment | added | José Figueroa-O'Farrill | Sorry, not among my languages (I have always regretted not studying any Slavic language...) But at any rate, the only theorem i know with the words "matrix", "normal", "unitary" and "basis" is the one I quoted. What throws me off is "inherent": is this a basis where the matrix is diagonal? | |
| Nov 7, 2009 at 14:52 | comment | added | person | Serbian: Da li je samo kod normalnih matrica matrica prelaska na svojstvenu bazu unitarna? | |
| Nov 7, 2009 at 14:48 | comment | added | José Figueroa-O'Farrill | Then it's difficult to say whether my answer makes any sense. Which language is this, by the way? Perhaps I can understand the original question... | |
| Nov 7, 2009 at 14:44 | comment | added | person | I don't really know what I'm asking... A physics friend of mine asked me this (in another language though) and I'm just re-asking it here (translated) :P | |
| Nov 7, 2009 at 14:39 | history | answered | José Figueroa-O'Farrill | CC BY-SA 2.5 |