Emanuel Lodewijk Elte

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]

[1]

n	Elte notation	Vertices	Edges	Faces	Cells	Facets	Schläfli symbol	Coxeter symbol
Polyhedra (Archimedean solids)
3	tT	12	18	4p₃+4p₆			t{3,3}
	tC	24	36	6p₈+8p₃			t{4,3}
	tO	24	36	6p₄+8p₆			t{3,4}
	tD	60	90	20p₃+12p₁₀			t{5,3}
	tI	60	90	20p₆+12p₅			t{3,5}
	TT = O	6	12	(4+4)p₃			r{3,3} = {3^1,1}	0₁₁
	CO	12	24	6p₄+8p₃			r{3,4}
	ID	30	60	20p₃+12p₅			r{3,5}
	P_q	2q	4q	2p_q+qp₄			t{2,q}
	AP_q	2q	4q	2p_q+2qp₃			s{2,2q}
semiregular 4-polytopes
4	tC₅	10	30	(10+20)p₃	5O+5T		r{3,3,3} = {3^2,1}	0₂₁
	tC₈	32	96	64p₃+24p₄	8CO+16T		r{4,3,3}
	tC₁₆=C₂₄(*)	48	96	96p₃	(16+8)O		r{3,3,4}
	tC₂₄	96	288	96p₃ + 144p₄	24CO + 24C		r{3,4,3}
	tC₆₀₀	720	3600	(1200 + 2400)p₃	600O + 120I		r{3,3,5}
	tC₁₂₀	1200	3600	2400p₃ + 720p₅	120ID+600T		r{5,3,3}
	HM₄ = C₁₆(*)	8	24	32p₃	(8+8)T		{3,3^1,1}	1₁₁
	–	30	60	20p₃ + 20p₆	(5 + 5)tT		2t{3,3,3}
	–	288	576	192p₃ + 144p₈	(24 + 24)tC		2t{3,4,3}
	–	20	60	40p₃ + 30p₄	10T + 20P₃		t_0,3{3,3,3}
	–	144	576	384p₃ + 288p₄	48O + 192P₃		t_0,3{3,4,3}
	–	q²	2q²	q²p₄ + 2qp_q	(q + q)P_q		2t{q,2,q}
semiregular 5-polytopes
5	S₅¹	15	60	(20+60)p₃	30T+15O	6C₅+6tC₅	r{3,3,3,3} = {3^3,1}	0₃₁
	S₅²	20	90	120p₃	30T+30O	(6+6)C₅	2r{3,3,3,3} = {3^2,2}	0₂₂
	HM₅	16	80	160p₃	(80+40)T	16C₅+10C₁₆	{3,3^2,1}	1₂₁
	Cr₅¹	40	240	(80+320)p₃	160T+80O	32tC₅+10C₁₆	r{3,3,3,4}
	Cr₅²	80	480	(320+320)p₃	80T+200O	32tC₅+10C₂₄	2r{3,3,3,4}
semiregular 6-polytopes
6	S₆¹ (*)						r{3⁵} = {3^4,1}	0₄₁
	S₆² (*)						2r{3⁵} = {3^3,2}	0₃₂
	HM₆	32	240	640p₃	(160+480)T	32S₅+12HM₅	{3,3^3,1}	1₃₁
	V₂₇	27	216	720p₃	1080T	72S₅+27HM₅	{3,3,3^2,1}	2₂₁
	V₇₂	72	720	2160p₃	2160T	(27+27)HM₆	{3,3^2,2}	1₂₂
semiregular 7-polytopes
7	S₇¹ (*)						r{3⁶} = {3^5,1}	0₅₁
	S₇² (*)						2r{3⁶} = {3^4,2}	0₄₂
	S₇³ (*)						3r{3⁶} = {3^3,3}	0₃₃
	HM₇(*)	64	672	2240p₃	(560+2240)T	64S₆+14HM₆	{3,3^4,1}	1₄₁
	V₅₆	56	756	4032p₃	10080T	576S₆+126Cr₆	{3,3,3,3^2,1}	3₂₁
	V₁₂₆	126	2016	10080p₃	20160T	576S₆+56V₂₇	{3,3,3^3,1}	2₃₁
	V₅₇₆	576	10080	40320p₃	(30240+20160)T	126HM₆+56V₇₂	{3,3^3,2}	1₃₂
semiregular 8-polytopes
8	S₈¹ (*)						r{3⁷} = {3^6,1}	0₆₁
	S₈² (*)						2r{3⁷} = {3^5,2}	0₅₂
	S₈³ (*)						3r{3⁷} = {3^4,3}	0₄₃
	HM₈(*)	128	1792	7168p₃	(1792+8960)T	128S₇+16HM₇	{3,3^5,1}	1₅₁
	V₂₁₆₀	2160	69120	483840p₃	1209600T	17280S₇+240V₁₂₆	{3,3,3^4,1}	2₄₁
	V₂₄₀	240	6720	60480p₃	241920T	17280S₇+2160Cr₇	{3,3,3,3,3^2,1}	4₂₁

Emanuel Lodewijk Elte

Elte's semiregular polytopes of the first kind

See also

Notes

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