Log24

Wednesday, December 7, 2016

Emch as a Forerunner of S(5, 8, 24)

Filed under: General,Geometry — m759 @ 1:00 pm

Commentary —

"The close relationships between group theory and structural combinatorics go back well over a century. Given a combinatorial object, it is natural to consider its automorphism group. Conversely, given a group, there may be a nice object upon which it acts. If the group is given as a group of permutations of some set, it is natural to try to regard the elements of that set as the points of some structure which can be at least partially visualized. For example, in 1861 Mathieu… discovered five multiply transitive permutation groups. These were constructed as groups of permutations of 11, 12, 22, 23 or 24 points, by means of detailed calculations. In a little-known 1931 paper of Carmichael [5], they were first observed to be automorphism groups of exquisite finite geometries. This fact was rediscovered soon afterwards by Witt [11], who provided direct constructions for the groups and then the geometries. It is now more customary to construct first the designs, and then the groups…."

  5.  R. D. Carmichael, Tactical configurations of rank two,
Amer. J. Math. 53 (1931), 217-240.

11.  E. Witt, Die 5-fach transitiven Gruppen von Mathieu,
Abh. Hamburg 12 (1938), 256-264. 

— William M. Kantor, book review (pdf), 
Bulletin of the American Mathematical Society, September 1981

Tuesday, August 6, 2024

Steiner gegen den Untergang

Filed under: General — m759 @ 11:02 am

Emch.

Monday, December 11, 2023

Infamy Date: December 7th, 2016

Filed under: General — Tags: — m759 @ 8:46 pm

This  journal on that date —

A Steiner System Forerunner —

Midrash —

Sunday October 21, 2007

10:31 AM

Halloween
Meditations

continued from
October 31, 2005

The image “http://www.log24.com/log/pix05B/Gameplayers12.jpg” cannot be displayed, because it contains errors.

From The Gameplayers of Zan

“The Game in the Ship cannot be approached as a job, a vocation, a career, or a recreation. To the contrary, it is Life and Death itself at work there. In the Inner Game, we call the Game Dhum Welur, the Mind of God. And that Mind is a terrible mind, that one may not face directly and remain whole. Some of the forerunners guessed it long ago– first the Hebrews far back in time, others along the way, and they wisely left it alone, left the Arcana alone.”

Monday, December 19, 2022

Mathematics and Narrative, Continued . . .
“Apart from that, Mrs. Lincoln . . .”

Filed under: General — Tags: , , , , — m759 @ 3:50 am

   Midrash from Philip Pullman . . .

"The 1929 Einstein-Carmichael Expedition"

    I prefer the 1929 Emch-Carmichael expedition —

This is from . . .

“By far the most important structure in design theory
is the Steiner system S(5, 8, 24).”

— “Block Designs,” by Andries E. Brouwer
(Ch. 14 (pp. 693-746) of Handbook of Combinatorics,
Vol. I, MIT Press, 1995, edited by Ronald L. Graham,
Martin Grötschel, and László Lovász, Section 16 (p. 716))

Thursday, December 8, 2016

Finite Groups and Their Geometric Representations

Filed under: General,Geometry — Tags: — m759 @ 8:06 am

The title is that of a presentation by Arnold Emch
at the 1928 International Congress of Mathematicians:

See also yesterday's "Emch as a Forerunner of S(5, 8, 24)."

Related material: Diamond Theory in 1937.

Further remarks:  Christmas 2013 and the fact that
759 × 322,560 = the order of the large Mathieu group  M24 .

Thursday, July 17, 2014

Paradigm Shift:

Filed under: General,Geometry — Tags: , — m759 @ 11:01 am
 

Continuous Euclidean space to discrete Galois space*

Euclidean space:

Point, line, square, cube, tesseract

From a page by Bryan Clair

Counting symmetries in Euclidean space:

Galois space:

Image-- examples from Galois affine geometry

Counting symmetries of  Galois space:
IMAGE - The Diamond Theorem

The reason for these graphic symmetries in affine Galois space —

symmetries of the underlying projective Galois space:

* For related remarks, see posts of May 26-28, 2012.

Wednesday, December 25, 2013

Rotating the Facets

Filed under: General,Geometry — Tags: , , — m759 @ 12:00 pm

Previous post

“… her mind rotated the facts….”

Related material— hypercube rotation,* in the context
of rotational symmetries of the Platonic solids:

IMAGE- Count rotational symmetries by rotating facets. Illustrated with 'Plato's Dice.'

“I’ve heard of affairs that are strictly Platonic”

Song lyric by Leo Robin

* Footnote added on Dec. 26, 2013 —

 See Arnold Emch, “Triple and Multiple Systems, Their Geometric
Configurations and Groups
,” Trans. Amer. Math. Soc.  31 (1929),
No. 1, 25–42.

 On page 42, Emch describes the above method of rotating a
hypercube’s 8 facets (i.e., three-dimensional cubes) to count
rotational symmetries —

See also Diamond Theory in 1937.

Also on p. 42, Emch mentions work of Carmichael on a
Steiner system with the Mathieu group M11 as automorphism
group, and poses the problem of finding such systems and
groups that are larger. This may have inspired the 1931
discovery by Carmichael of the Steiner system S(5, 8, 24),
which has as automorphisms the Mathieu group M24 .

Monday, June 25, 2012

Design (continued)

Filed under: General — m759 @ 1:28 am

The New York Times  this morning reports the death
last Tuesday (June 19, 2012) in Boston
of Gerhard Kallman, a Brutalist architect
born in Berlin in 1915.

Some Log24 images from the date of his death

IMAGE- Log24 on June 19, 2012-Gropius and the North Face of Harvard Design

The above view shows the south side of Kirkland Street (at Quincy).

IMAGE- Map from http://www.map.harvard.edu/

A more appealing architectural image, from the other side
of Kirkland Street—

IMAGE- Adolphus Busch Hall, 29 Kirkland St., Cambridge, MA

Wednesday, March 29, 2006

Wednesday March 29, 2006

Filed under: General,Geometry — Tags: , , — m759 @ 8:00 pm

The image “http://www.log24.com/theory/images/Carmichael440.gif” cannot be displayed, because it contains errors.
Note: Carmichael's reference is to
A. Emch, "Triple and multiple systems, their geometric configurations and groups," Trans. Amer. Math. Soc. 31 (1929), 25–42.

"There is such a thing as a tesseract."
A Wrinkle in Time

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