The Fifty-Nine Icosahedra

The Fifty-Nine Icosahedra is a book written and illustrated by H. S. M. Coxeter, P. Du Val, H. T. Flather and J. F. Petrie. It enumerates certain stellations of the regular convex or Platonic icosahedron, according to a set of rules put forward by J. C. P. Miller.

The stellation diagram for the icosahedron with the central triangle marked for the original icosahedron

First published by the University of Toronto in 1938, a Second Edition reprint by Springer-Verlag followed in 1982. Tarquin's 1999 Third Edition included new reference material and photographs by K. and D. Crennell.

Authors' contributions

Miller's rules

Although Miller did not contribute to the book directly, he was a close colleague of Coxeter and Petrie. His contribution is immortalised in his set of rules for defining which stellation forms should be considered "properly significant and distinct":[1]

(i) The faces must lie in twenty planes, viz., the bounding planes of the regular icosahedron.
(ii) All parts composing the faces must be the same in each plane, although they may be quite disconnected.
(iii) The parts included in any one plane must have trigonal symmetry, without or with reflection. This secures icosahedral symmetry for the whole solid.
(iv) The parts included in any plane must all be "accessible" in the completed solid (i.e. they must be on the "outside". In certain cases we should require models of enormous size in order to see all the outside. With a model of ordinary size, some parts of the "outside" could only be explored by a crawling insect).
(v) We exclude from consideration cases where the parts can be divided into two sets, each giving a solid with as much symmetry as the whole figure. But we allow the combination of an enantiomorphous pair having no common part (which actually occurs in just one case).

Rules (i) to (iii) are symmetry requirements for the face planes. Rule (iv) excludes buried holes, to ensure that no two stellations look outwardly identical. Rule (v) prevents any disconnected compound of simpler stellations.

Coxeter

Coxeter was the main driving force behind the work. He carried out the original analysis based on Miller's rules, adopting a number of techniques such as combinatorics and abstract graph theory whose use in a geometrical context was then novel.

He observed that the stellation diagram comprised many line segments. He then developed procedures for manipulating combinations of the adjacent plane regions, to formally enumerate the combinations allowed under Miller's rules.

His graph, reproduced here, shows the connectivity of the various faces identified in the stellation diagram (see below). The Greek symbols represent sets of possible alternatives:

λ may be 3 or 4
μ may be 7 or 8
ν may be 11 or 12

Du Val

Du Val devised a symbolic notation for identifying sets of congruent cells, based on the observation that they lie in "shells" around the original icosahedron. Based on this he tested all possible combinations against Miller's rules, confirming the result of Coxeter's more analytical approach.

Flather

Flather's contribution was indirect: he made card models of all 59. When he first met Coxeter he had already made many stellations, including some "non-Miller" examples. He went on to complete the series of fifty-nine, which are preserved in the mathematics library of Cambridge University, England. The library also holds some non-Miller models, but it is not known whether these were made by Flather or by Miller's later students.[2]

Petrie

John Flinders Petrie was a lifelong friend of Coxeter and had a remarkable ability to visualise four-dimensional geometry. He and Coxeter had worked together on many mathematical problems. His direct contribution to the fifty nine icosahedra was the exquisite set of three-dimensional drawings which provide much of the fascination of the published work.

The Crennells

For the Third Edition, Kate and David Crennell reset the text and redrew the diagrams. They also added a reference section containing tables, diagrams, and photographs of some of the Cambridge models (which at that time were all thought to be Flather's). Corrections to this edition have been published online.[3]

List of the fifty nine icosahedra

Stellation diagram with numbered face sets
Cell diagram with Du Val notation for cells

Before Coxeter, only Brückner and Wheeler had recorded any significant sets of stellations, although a few such as the great icosahedron had been known for longer. Since publication of The 59, Wenninger published instructions on making models of some; the numbering scheme used in his book has become widely referenced, although he only recorded a few stellations.

Notes on the list

Index numbers are the Crennells' unless otherwise stated:

Crennell

  • In the index numbering added to the Third Edition by the Crennells, the first 32 forms (indices 1-32) are reflective models, and the last 27 (indices 33-59) are chiral with only the right-handed forms listed. This follows the order in which the stellations are depicted in the book.

Cells

  • In Du Val's notation, each shell is identified in bold type, working outwards, as a, b, c, ..., h with a being the original icosahedron. Some shells subdivide into two types of cell, for example e comprises e1 and e2. The set f1 further subdivides into right- and left-handed forms, respectively f1 (plain type) and f1 (italic). Where a stellation has all cells present within an outer shell, the outer shell is capitalised and the inner omitted, for example a + b + c + e1 is written as Ce1.

Faces

  • All of the stellations can be specified by a stellation diagram. In the diagram shown here, the numbered colors indicate the regions of the stellation diagram which must occur together as a set, if full icosahedral symmetry is to be maintained. The diagram has 13 such sets. Some of these subdivide into chiral pairs (not shown), allowing stellations with rotational but not reflexive symmetry. In the table, faces which are seen from underneath are indicated by an apostrophe, for example 3'.

Wenninger

  • The index numbers and the numbered names were allocated arbitrarily by Wenninger's publisher according to their occurrence in his book Polyhedron models and bear no relation to any mathematical sequence. Only a few of his models were of icosahedra. His names are given in shortened form, with "... of the icosahedron" left off.

Wheeler

  • Wheeler found his figures, or "forms" of the icosahedron, by selecting line segments from the stellation diagram. He carefully distinguished this from Kepler's classical stellation process. Coxeter et al. ignored this distinction and referred to all of them as stellations.

Brückner

  • Max Brückner made and photographed models of many polyhedra, only a few of which were icosahedra. Taf. is an abbreviation of Tafel, German for plate.

Remarks

  • No. 8 is sometimes called the echidnahedron after an imagined similarity to the spiny anteater or echidna. This usage is independent of Kepler's description of his regular star polyhedra as his echidnae.

Table of the fifty-nine icosahedra

Some images illustrate the mirror-image icosahedron with the f1 rather than the f1 cell.

CrennellCellsFacesWenningerWheelerBrückner Remarks Face diagram 3D
1 A004
Icosahedron
1 The Platonic icosahedron
2 B126
Triakis icosahedron
2Taf. VIII, Fig. 2 First stellation of the icosahedron,
small triambic icosahedron,
or Triakisicosahedron
3 C223
Compound of five octahedra
3Taf. IX, Fig. 6 Regular compound of five octahedra
4 D3 4994Taf. IX, Fig.17
5 E5 6 79999
6 F8 9 1027
Second stellation
19 Second stellation of icosahedron
7 G11 1241
Great icosahedron
11Taf. XI, Fig. 24 Great icosahedron
8 H1342
Final stellation
12Taf. XI, Fig. 14 Final stellation of the icosahedron or Echidnahedron
9 e13' 537
Twelfth stellation
99 Twelfth stellation of icosahedron
10 f15' 6' 9 109999
11 g110' 1229
Fourth stellation
21 Fourth stellation of icosahedron
12 e1f13' 6' 9 109999
13 e1f1g13' 6' 9 129920
14 f1g15' 6' 9 129999
15 e24' 6 79999
16 f27' 89922
17 g28' 9'119999
18 e2f24' 6 89999
19 e2f2g24' 6 9' 119999
20 f2g27' 9' 1130
Fifth stellation
99 Fifth stellation of icosahedron
21 De14 532
Seventh stellation
10 Seventh stellation of icosahedron
22 Ef17 9 1025
Compound of ten tetrahedra
8Taf. IX, Fig. 3 Regular compound of ten tetrahedra
23 Fg18 9 1231
Sixth stellation
17Taf. X, Fig. 3 Sixth stellation of icosahedron
24 De1f14 6' 9 109999
25 De1f1g14 6' 9 129999
26 Ef1g17 9 1228
Third stellation
9Taf. VIII, Fig. 26 Excavated dodecahedron
27 De23 6 7995
28 Ef25 6 89918Taf.IX, Fig. 20
29 Fg210 1133
Eighth stellation
14 Eighth stellation of icosahedron
30 De2f23 6 834
Ninth stellation
13 Medial triambic icosahedron or
Great triambic icosahedron
31 De2f2g23 6 9' 119999
32 Ef2g25 6 9' 119999
33 f15' 6' 9 1035
Tenth stellation
99 Tenth stellation of icosahedron
34 e1f13' 5 6' 9 1036
Eleventh stellation
99 Eleventh stellation of icosahedron
35 De1f14 5 6' 9 109999
36 f1g15' 6' 9 10' 129999
37 e1f1g13' 5 6' 9 10' 1239
Fourteenth stellation
99 Fourteenth stellation of icosahedron
38 De1f1g14 5 6' 9 10' 129999
39 f1g25' 6' 8' 9' 10 119999
40 e1f1g23' 5 6' 8' 9' 10 119999
41 De1f1g24 5 6' 8' 9' 10 119999
42 f1f2g25' 6' 7' 9' 10 119999
43 e1f1f2g23' 5 6' 7' 9' 10 119999
44 De1f1f2g24 5 6' 7' 9' 10 119999
45 e2f14' 5' 6 7 9 1040
Fifteenth stellation
99 Fifteenth stellation of icosahedron
46 De2f13 5' 6 7 9 109999
47 Ef1 5 6 7 9 10 24
Compound of five tetrahedra
7
(6: left handed)
Taf. IX, Fig. 11 Regular Compound of five tetrahedra (right handed)
48 e2f1g1 4' 5' 6 7 9 10' 12 9999
49 De2f1g1 3 5' 6 7 9 10' 12 9999
50 Ef1g1 5 6 7 9 10' 12 9999
51 e2f1f2 4' 5' 6 8 9 10 38
Thirteenth stellation
99 Thirteenth stellation of icosahedron
52 De2f1f2 3 5' 6 8 9 10 9999
53 Ef1f2 5 6 8 9 10 9915
(16: left handed)
54 e2f1f2g1 4' 5' 6 8 9 10' 12 9999
55 De2f1f2g1 3 5' 6 8 9 10' 12 9999
56 Ef1f2g1 5 6 8 9 10' 12 9999
57 e2f1f2g2 4' 5' 6 9' 10 11 9999
58 De2f1f2g2 3 5' 6 9' 10 11 9999
59 Ef1f2g2 5 6 9' 10 11 9999

See also

Notes

  1. Coxeter, du Val, et al (Third Edition 1999) Pages 15-16.
  2. Inchbald, G.; Some lost stellations of the icosahedron, steelpillow.com, 11 July 2006. (retrieved 14 September 2017)]
  3. K. and D. Crennell; The Fifty-Nine Icosahedra, Fortran Friends, (retrieved 14 September 2017).

References

  • Brückner, Max (1900). Vielecke und Vielflache: Theorie und Geschichte. Leipzig: B.G. Treubner. ISBN 978-1-4181-6590-1. (in German)
WorldCat English: Polygons and Polyhedra: Theory and History. Photographs of models: Tafel VIII (Plate VIII), etc. High res. scans.
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