Emanuel Lodewijk Elte Explained

Emanuel Lodewijk Elte (16 March 1881 in Amsterdam – 9 April 1943 in Sobibór)[1] was a Dutch mathematician. He is noted for discovering and classifying semiregular polytopes in dimensions four and higher.

Elte's father Hartog Elte was headmaster of a school in Amsterdam. Emanuel Elte married Rebecca Stork in 1912 in Amsterdam, when he was a teacher at a high school in that city. By 1943 the family lived in Haarlem. When on January 30 of that year a German officer was shot in that town, in reprisal a hundred inhabitants of Haarlem were transported to the Camp Vught, including Elte and his family. As Jews, he and his wife were further deported to Sobibór, where they were murdered; his two children were murdered at Auschwitz.[1]

Elte's semiregular polytopes of the first kind

His work rediscovered the finite semiregular polytopes of Thorold Gosset, and further allowing not only regular facets, but recursively also allowing one or two semiregular ones. These were enumerated in his 1912 book, The Semiregular Polytopes of the Hyperspaces.[2] He called them semiregular polytopes of the first kind, limiting his search to one or two types of regular or semiregular k-faces. These polytopes and more were rediscovered again by Coxeter, and renamed as a part of a larger class of uniform polytopes.[3] In the process he discovered all the main representatives of the exceptional En family of polytopes, save only 142 which did not satisfy his definition of semiregularity.

Summary of the semiregular polytopes of the first kind[4]
nElte
notation
VerticesEdgesFacesCellsFacetsSchläfli
symbol
Coxeter
symbol
Coxeter
diagram
Polyhedra (Archimedean solids)
3tT12 18 4p3+4p6
tC24 36 6p8+8p3
tO24 36 6p4+8p6
tD60 90 20p3+12p10
tI60 90 20p6+12p5
TT = O6 12 (4+4)p3 r = 011
CO12 24 6p4+8p3
ID30 60 20p3+12p5
Pq2q 4q 2pq+qp4
APq2q 4q 2pq+2qp3
semiregular 4-polytopes
4 tC510 30 (10+20)p3 5O+5T r = 021
tC832 96 64p3+24p4 8CO+16T
tC16=C24(*)48 96 96p3 (16+8)O
tC2496 288 96p3 + 144p4 24CO + 24C
tC600720 3600 (1200 + 2400)p3 600O + 120I
tC1201200 36002400p3 + 720p5120ID+600T
HM4 = C16(*)8 24 32p3 (8+8)T 111
30 60 20p3 + 20p6 (5 + 5)tT
288 576 192p3 + 144p8(24 + 24)tC
20 60 40p3 + 30p410T + 20P3
144 576 384p3 + 288p4 48O + 192P3
q2 2q2 q2p4 + 2qpq (q + q)Pq
semiregular 5-polytopes
5 S51 15 60 (20+60)p330T+15O 6C5+6tC5 r =
S5220 90 120p330T+30O (6+6)C5 2r =
HM516 80 160p3(80+40)T 16C5+10C16 121
Cr5140 240 (80+320)p3160T+80O 32tC5+10C16
Cr5280 480 (320+320)p380T+200O 32tC5+10C24
semiregular 6-polytopes
6S61 (*)r =
S62 (*)2r =
HM632 240 640p3(160+480)T 32S5+12HM5
V2727 216 720p31080T 72S5+27HM5
V72 72 720 2160p3 2160T (27+27)HM6
semiregular 7-polytopes
7S71 (*)r =
S72 (*)2r =
S73 (*)3r =
HM7(*) 64 6722240p3 (560+2240)T 64S6+14HM6
V56 56 756 4032p310080T 576S6+126Cr6
V126126 2016 10080p3 20160T 576S6+56V27
V576 576 10080 40320p3 (30240+20160)T 126HM6+56V72
semiregular 8-polytopes
8S81 (*) r =
S82 (*) 2r =
S83 (*)3r =
HM8(*) 128 1792 7168p3 (1792+8960)T 128S7+16HM7
V2160 2160 69120 483840p3 1209600T 17280S7+240V126
V240 240 6720 60480p3 241920T 17280S7+2160Cr7421

(*) Added in this table as a sequence Elte recognized but did not enumerate explicitly

Regular dimensional families:

Semiregular polytopes of first order:

Polygons

Polyhedra:

4-polytopes:

See also

Notes and References

  1. http://www.joodsmonument.nl/person/447995/en Emanuël Lodewijk Elte
  2. https://www.amazon.com/Semiregular-Polytopes-Hyperspaces-Emanuel-Lodewijk/dp/141817968X http://hdl.handle.net/2027/miun.abr2632.0001.001
  3. [Coxeter|Coxeter, H.S.M.]
  4. http://babel.hathitrust.org/cgi/pt?seq=2;view=image;size=100;id=miun.abr2632.0001.001;u=1;num=128;page=root;orient=1 Page 128