lieven le bruyn's blog
Iguanodon series of simple groups
Inguanodon-simples
- Iguanodon series of simple groups
- the iguanodon dissected
- more iguanodons via kfarey.sage
Bruce Westbury has a page on recent work on series of Lie groups including exceptional groups. Moreover, he did put his slides of a recent talk (probably at MPI) online.
Probably, someone considered a similar problem for simple groups. Are there natural constructions leading to a series of finite simple groups including some sporadic groups as special members ? In particular, does the following sequence appear somewhere ?
Here, 
is the simple group of order 168 (the automorphism group of the Klein quartic), 
and 
are the sporadic Mathieu groups and the 
are the alternating simple groups.
I’ve stumbled upon this series playing around with Farey sequences and their associated ‘dessins d’enfants’ (I’ll come back to the details of the construction another time) and have dubbed this sequence the Iguanodon series because the shape of the doodle leading to its first few terms
reminded me of the Iguanodons of Bernissart (btw. this sketch outlines the construction to the experts). Conjecturally, all groups appearing in this sequence are simple and probably all of them (except for the first few) will be alternating.
I did verify that none of the known low-dimensional permutation representations of other sporadic groups appear in the series. However, there are plenty of similar sequences one can construct from the Farey sequences, and it would be nice if one of them would contain the Conway group 
. (to be continued)
Brauer, Conway, groups, Klein, Mathieu, permutation representation, representations| Print article | This entry was posted by lievenlb on November 7, 2007 at 5:27 pm, and is filed under groups, modular. Follow any responses to this post through RSS 2.0. You can leave a response or trackback from your own site. |
Seating the first few thousand Knights
about 7 months ago - No comments
The Knight-seating problems asks for a consistent placing of n-th Knight at an odd root of unity, compatible with the two different realizations of the algebraic closure of the field with two elements.
big Witt vectors for everyone (1/2)
about 7 months ago - 2 comments
Next time you visit your math-library, please have a look whether these books are still on the shelves : Michiel Hazewinkel‘s Formal groups and applications, William Fulton’s and Serge Lange’s Riemann-Roch algebra and Donald Knutson’s lambda-rings and the representation theory of the symmetric group. I wouldn’t be surprised if one or more of these books
The odd knights of the round table
about 7 months ago - No comments
Here’s a tiny problem illustrating our limited knowledge of finite fields : “Imagine an infinite queue of Knights , waiting to be seated at the unit-circular table. The master of ceremony (that is, you) must give Knights and a place at an odd root of unity, say and , such that the seat at the
Olivier Messiaen & Mathieu 12
about 8 months ago - 5 comments
To mark the end of 2009 and 6 years of blogging, two musical compositions with a mathematical touch to them. I wish you all a better 2010! Remember from last time that we identified Olivier Messiaen as the ‘Monsieur Modulo’ playing the musical organ at the Bourbaki wedding. This was based on the fact that
Seriously now, where was the Bourbaki wedding?
about 9 months ago - 3 comments
A few days before Halloween, Norbert Dufourcq (who died december 17th 1990…), sent me a comment, containing lots of useful information, hinting I did get it wrong about the church of the Bourbali wedding in the previous post. Norbert Dufourcq, an organist and student of Andre Machall, the organist-in-charge at the Saint-Germain-des-Prés church in 1939,
Where was the Bourbaki wedding?
about 10 months ago - 7 comments
I’m pretty certain I got the intended date & time of the Bourbaki-Pétard wedding right : June 3rd 1939 at 12h. Finding the exact location of the wedding-ceremony is an entirely different matter. And, quite probably, we are reading way too much in these pranks of the Weil-clan. Still, it’s fun trying to find an
Pollock your own noncommutative space
about 1 year ago - 4 comments
I really like Matilde Marcolli’s idea to use some of Jackson Pollock’s paintings as metaphors for noncommutative spaces. In her talk she used this painting and refered to it (as did I in my post) as : Jackson Pollock “Untitled N.3”. Before someone writes a post ‘The Pollock noncommutative space hoax’ (similar to my own
E(8) from moonshine groups
about 1 year ago - 1 comment
Are the valencies of the 171 moonshine groups are compatible, that is, can one construct a (disconnected) graph on the 171 vertices such that in every vertex (determined by a moonshine group G) the vertex-valency coincides with the valency of the corresponding group? Duncan describes a subset of 9 moonshine groups for which the valencies
looking for the moonshine picture
about 1 year ago - 4 comments
We have seen that Conway’s big picture helps us to determine all arithmetic subgroups of commensurable with the modular group , including all groups of monstrous moonshine. As there are exactly 171 such moonshine groups, they are determined by a finite subgraph of Conway’s picture and we call the minimal such subgraph the moonshine picture.
Conway’s big picture
about 1 year ago - No comments
Conway and Norton showed that there are exactly 171 moonshine functions and associated two arithmetic subgroups to them. We want a tool to describe these and here’s where Conway’s big picture comes in very handy. All moonshine groups are arithmetic groups, that is, they are commensurable with the modular group. Conway’s idea is to view
Hi, I'm a professor of mathematics at the University of Antwerp, in Belgium. My research areas are non-commutative algebra and non-commutative geometry. Sometimes, you can also find me here :
about 2 years ago
Interesting! But I think “Inguanadon” should be “Iguanadon“.
about 2 years ago
Oops! Ive corrected it. Thanks!