Timeline for Why do these two Monster-related calculations yield $163$?

Current License: CC BY-SA 4.0

14 events

when toggle format	what		by	license	comment
Jul 17, 2023 at 6:38	history	edited	Tito Piezas III	CC BY-SA 4.0	Emphasized sum
Apr 5, 2018 at 11:26	comment	added	Wolfgang		Thank you. Now of course, as 163 does not divide the order of the Monster, that would not correspond exactly. But out of curiosity: what would be the similar counts for the Lyons group and the Janko groups (and why not look at the other "Pariah groups")? Supposing that enough is known about their irreducible representations...
Apr 4, 2018 at 10:25	comment	added	Tito Piezas III		@Wolfgang: Of the 26 sporadic groups, the Monster contains 19 others as subquotients. Of the remaining 6, curiously the largest prime $p$ that divides the order of the Lyons group is $67$, for the Janko group $J_3$ is $43$, and $J_2$ is $19$. In Conway and Norton's paper, they asked "if there a similar period three automorphism for the case $\Gamma(67)+$".
Apr 3, 2018 at 20:32	comment	added	Wolfgang		Are there similar counts for the corresponding groups related to 43 and 67?
Mar 31, 2018 at 11:06	history	edited	Tito Piezas III	CC BY-SA 3.0	Details
Mar 30, 2018 at 7:45	comment	added	Tito Piezas III		@F.C. It is done.
Mar 30, 2018 at 7:02	history	edited	Tito Piezas III	CC BY-SA 3.0	Details.
Mar 30, 2018 at 6:43	comment	added	F. C.		It would nevertheless be good to have the monster tag here.
Mar 29, 2018 at 19:47	review	Suggested edits
Mar 29, 2018 at 20:55
Mar 29, 2018 at 15:29	answer	added	Stopple		timeline score: 9
Mar 29, 2018 at 14:53	comment	added	Tito Piezas III		The above is *Table 5: Summary of genus 0 moonshine groups data* by C.J. Cummins.
Mar 29, 2018 at 14:44	history	edited	YCor		edited tags
Mar 29, 2018 at 13:49	history	edited	LSpice	CC BY-SA 3.0	Changed arXiv link to abstract
Mar 29, 2018 at 9:46	history	asked	Tito Piezas III	CC BY-SA 3.0