Uniform polyhedron compound

In

transitively on the compound's vertices

The uniform polyhedron compounds were first enumerated by John Skilling in 1976, with a proof that the enumeration is complete. The following table lists them according to his numbering.

The prismatic compounds of ${p / q}-$ gonal

tetrahedra with digonal

bases.

Compound	Bowers acronym	Polyhedral count	Polyhedral type	Faces	Edges	Vertices	Notes	Symmetry group	Subgroup restricting to one constituent
UC₀₁	sis	6	tetrahedra	24{3}	36	24	Rotational freedom	T_d	S₄
UC₀₂	dis	12	tetrahedra	48{3}	72	48	Rotational freedom	O_h	S₄
UC₀₃	snu	6	tetrahedra	24{3}	36	24		O_h	D_2d
UC₀₄	so	2	tetrahedra	8{3}	12	8	Regular	O_h	T_d
UC₀₅	ki	5	tetrahedra	20{3}	30	20	Regular	I	T
UC₀₆	e	10	tetrahedra	40{3}	60	20	Regular 2 polyhedra per vertex	I_h	T
UC₀₇	risdoh	6	cubes	(12+24){4}	72	48	Rotational freedom	O_h	C_4h
UC₀₈	rah	3	cubes	(6+12){4}	36	24		O_h	D_4h
UC₀₉	rhom	5	cubes	30{4}	60	20	Regular 2 polyhedra per vertex	I_h	T_h
UC₁₀	dissit	4	octahedra	(8+24){3}	48	24	Rotational freedom	T_h	S₆
UC₁₁	daso	8	octahedra	(16+48){3}	96	48	Rotational freedom	O_h	S₆
UC₁₂	sno	4	octahedra	(8+24){3}	48	24		O_h	D_3d
UC₁₃	addasi	20	octahedra	(40+120){3}	240	120	Rotational freedom	I_h	S₆
UC₁₄	dasi	20	octahedra	(40+120){3}	240	60	2 polyhedra per vertex	I_h	S₆
UC₁₅	gissi	10	octahedra	(20+60){3}	120	60		I_h	D_3d
UC₁₆	si	10	octahedra	(20+60){3}	120	60		I_h	D_3d
UC₁₇	se	5	octahedra	40{3}	60	30	Regular	I_h	T_h
UC₁₈	hirki	5	tetrahemihexahedra	20{3} 15{4}	60	30		I	T
UC₁₉	sapisseri	20	tetrahemihexahedra	(20+60){3} 60{4}	240	60	2 polyhedra per vertex	I	C₃
UC₂₀	-	2n (2n ≥ 2)	p/q-gonal prisms	4n{p/q} 2np{4}	6np	4np	Rotational freedom	D_nph	C_ph
UC₂₁	-	n (n ≥ 2)	p/q-gonal prisms	2n{p/q} np{4}	3np	2np		D_nph	D_ph
UC₂₂	-	2n (2n ≥ 2) (q odd)	p/q-gonal antiprisms (q odd)	4n{p/q} (if p/q ≠ 2) 4np{3}	8np	4np	Rotational freedom	D_npd (if n odd) D_nph (if n even)	S_2p
UC₂₃	-	n (n ≥ 2)	p/q-gonal antiprisms (q odd)	2n{p/q} (if p/q ≠ 2) 2np{3}	4np	2np		D_npd (if n odd) D_nph (if n even)	D_pd
UC₂₄	-	2n (2n ≥ 2)	p/q-gonal antiprisms (q even)	4n{p/q} (if p/q ≠ 2) 4np{3}	8np	4np	Rotational freedom	D_nph	C_ph
UC₂₅	-	n (n ≥ 2)	p/q-gonal antiprisms (q even)	2n{p/q} (if p/q ≠ 2) 2np{3}	4np	2np		D_nph	D_ph
UC₂₆	gadsid	12	pentagonal antiprisms	120{3} 24{5}	240	120	Rotational freedom	I_h	S₁₀
UC₂₇	gassid	6	pentagonal antiprisms	60{3} 12{5}	120	60		I_h	D_5d
UC₂₈	gidasid	12	pentagrammic crossed antiprisms	120{3} 24{5/2}	240	120	Rotational freedom	I_h	S₁₀
UC₂₉	gissed	6	pentagrammic crossed antiprisms	60{3} 125	120	60		I_h	D_5d
UC₃₀	ro	4	triangular prisms	8{3} 12{4}	36	24		O	D₃
UC₃₁	dro	8	triangular prisms	16{3} 24{4}	72	48		O_h	D₃
UC₃₂	kri	10	triangular prisms	20{3} 30{4}	90	60		I	D₃
UC₃₃	dri	20	triangular prisms	40{3} 60{4}	180	60	2 polyhedra per vertex	I_h	D₃
UC₃₄	kred	6	pentagonal prisms	30{4} 12{5}	90	60		I	D₅
UC₃₅	dird	12	pentagonal prisms	60{4} 24{5}	180	60	2 polyhedra per vertex	I_h	D₅
UC₃₆	gikrid	6	pentagrammic prisms	30{4} 12{5/2}	90	60		I	D₅
UC₃₇	giddird	12	pentagrammic prisms	60{4} 24{5/2}	180	60	2 polyhedra per vertex	I_h	D₅
UC₃₈	griso	4	hexagonal prisms	24{4} 8{6}	72	48		O_h	D_3d
UC₃₉	rosi	10	hexagonal prisms	60{4} 20{6}	180	120		I_h	D_3d
UC₄₀	rassid	6	decagonal prisms	60{4} 12{10}	180	120		I_h	D_5d
UC₄₁	grassid	6	decagrammic prisms	60{4} 12{10/3}	180	120		I_h	D_5d
UC₄₂	gassic	3	square antiprisms	24{3} 6{4}	48	24		O	D₄
UC₄₃	gidsac	6	square antiprisms	48{3} 12{4}	96	48		O_h	D₄
UC₄₄	sassid	6	pentagrammic antiprisms	60{3} 12{5/2}	120	60		I	D₅
UC₄₅	sadsid	12	pentagrammic antiprisms	120{3} 24{5/2}	240	120		I_h	D₅
UC₄₆	siddo	2	icosahedra	(16+24){3}	60	24		O_h	T_h
UC₄₇	sne	5	icosahedra	(40+60){3}	150	60		I_h	T_h
UC₄₈	presipsido	2	great dodecahedra	24{5}	60	24		O_h	T_h
UC₄₉	presipsi	5	great dodecahedra	60{5}	150	60		I_h	T_h
UC₅₀	passipsido	2	small stellated dodecahedra	24{5/2}	60	24		O_h	T_h
UC₅₁	passipsi	5	small stellated dodecahedra	60{5/2}	150	60		I_h	T_h
UC₅₂	sirsido	2	great icosahedra	(16+24){3}	60	24		O_h	T_h
UC₅₃	sirsei	5	great icosahedra	(40+60){3}	150	60		I_h	T_h
UC₅₄	tisso	2	truncated tetrahedra	8{3} 8{6}	36	24		O_h	T_d
UC₅₅	taki	5	truncated tetrahedra	20{3} 20{6}	90	60		I	T
UC₅₆	te	10	truncated tetrahedra	40{3} 40{6}	180	120		I_h	T
UC₅₇	tar	5	truncated cubes	40{3} 30{8}	180	120		I_h	T_h
UC₅₈	quitar	5	stellated truncated hexahedra	40{3} 30{8/3}	180	120		I_h	T_h
UC₅₉	arie	5	cuboctahedra	40{3} 30{4}	120	60		I_h	T_h
UC₆₀	gari	5	cubohemioctahedra	30{4} 20{6}	120	60		I_h	T_h
UC₆₁	iddei	5	octahemioctahedra	40{3} 20{6}	120	60		I_h	T_h
UC₆₂	rasseri	5	rhombicuboctahedra	40{3} (30+60){4}	240	120		I_h	T_h
UC₆₃	rasher	5	small rhombihexahedra	60{4} 30{8}	240	120		I_h	T_h
UC₆₄	rahrie	5	small cubicuboctahedra	40{3} 30{4} 30{8}	240	120		I_h	T_h
UC₆₅	raquahri	5	great cubicuboctahedra	40{3} 30{4} 30{8/3}	240	120		I_h	T_h
UC₆₆	rasquahr	5	great rhombihexahedra	60{4} 30{8/3}	240	120		I_h	T_h
UC₆₇	rosaqri	5	nonconvex great rhombicuboctahedra	40{3} (30+60){4}	240	120		I_h	T_h
UC₆₈	disco	2	snub cubes	(16+48){3} 12{4}	120	48		O_h	O
UC₆₉	dissid	2	snub dodecahedra	(40+120){3} 24{5}	300	120		I_h	I
UC₇₀	giddasid	2	great snub icosidodecahedra	(40+120){3} 24{5/2}	300	120		I_h	I
UC₇₁	gidsid	2	great inverted snub icosidodecahedra	(40+120){3} 24{5/2}	300	120		I_h	I
UC₇₂	gidrissid	2	great retrosnub icosidodecahedra	(40+120){3} 24{5/2}	300	120		I_h	I
UC₇₃	disdid	2	snub dodecadodecahedra	120{3} 24{5} 24{5/2}	300	120		I_h	I
UC₇₄	idisdid	2	inverted snub dodecadodecahedra	120{3} 24{5} 24{5/2}	300	120		I_h	I
UC₇₅	desided	2	snub icosidodecadodecahedra	(40+120){3} 24{5} 24{5/2}	360	120		I_h	I