Timeline for Algebraic independence in normed spaces
Current License: CC BY-SA 3.0
5 events
| when toggle format | what | by | license | comment | |
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| Jul 5, 2015 at 8:13 | comment | added | user62562 | Hmmm, I could add more details to the description if it would help? I didn't include any of the jargon originally because the underlying thought is simple - I want a link between 'generic' arrangements of points and 'generic' sets of distances in real normed linear spaces. I guess the notion of generic would not be via algebraic independence, as you say, but it would have been much nicer for me if there was some such notion. I had hoped someone would have considered this sort of thing at least for $l_p$ norms with $p>1$ an integer. | |
| Jul 3, 2015 at 19:13 | comment | added | Igor Rivin | By the way, I had trouble backing out the statement from the lemma you mention (I did not try very hard to unravel all the jargon, it's true...) | |
| Jul 3, 2015 at 18:02 | comment | added | user62562 | Yes, that's what I fearer. Even the case $p=4$ is not clear to me... | |
| Jul 2, 2015 at 20:36 | comment | added | Igor Rivin | I don't see how you would be able to say anything in general (since the algebricity of the $l^2$ norm is obviously essential); the $l^p$ case is obviously quite special. | |
| Jul 2, 2015 at 10:52 | history | asked | user62562 | CC BY-SA 3.0 |