Timeline for Classification of finite complex reflection groups
Current License: CC BY-SA 2.5
9 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Jul 20, 2020 at 2:03 | comment | added | LSpice | After Springer's re-organisation, the current link is Wagner - Determination of the finite primitive reflection groups over an arbitrary field of characteristic not $2$ - I. | |
| Jul 1, 2012 at 18:24 | comment | added | LSpice | The link works fine (although it's still not free) if you strip out the 'proxy' part: springerlink.com/content/v15174k6t232k105. | |
| Jun 23, 2010 at 10:33 | comment | added | GS | Geez I'm having a hard time with tex in comments... | |
| Jun 23, 2010 at 10:33 | comment | added | GS | Wassup Bugs, Sorry about the broken tex/link! The question (see above) is "Is there also a classification of the finite irreducible reflection representations over $\mathbb{C}$?" The OP began by defining refl. groups over a field K, but then switched the char. 0. The paper (which I have not found available free online) was "Determination of the finite primitive reflection groups over an arbitrary field of characteristic not 2". I. Geom. Dedicata 9 (1980), no. 2, 239--253 by A. Wagner. It's part of a three part series. | |
| Jun 23, 2010 at 7:13 | comment | added | Bugs Bunny | BTW, the question is about $K$, not $\CC$, unless I missed something | |
| Jun 23, 2010 at 7:11 | comment | added | Bugs Bunny | Your link brings me to UofEdinburgh site that asks me for some stupid password and my command of whiterussian is somewhat rusty but thanks for info, anyway! | |
| Jun 22, 2010 at 10:19 | comment | added | GS | ...and here is a paper which might be easier to get: springerlink.com.ezproxy.webfeat.lib.ed.ac.uk/content/… | |
| Jun 22, 2010 at 10:07 | comment | added | GS | The question was about $\CC$... but you're right, the list gets longer. Here is one reference: MR0603578 (82i:20060) Zalesskiĭ, A. E.; Serežkin, V. N. Finite linear groups generated by reflections. (Russian) Izv. Akad. Nauk SSSR Ser. Mat. 44 (1980), no. 6, 1279--1307, 38. | |
| Jun 22, 2010 at 9:50 | history | answered | Bugs Bunny | CC BY-SA 2.5 |