Lista över rymdgrupper

Det finns 230 rymdgrupper i tre dimensioner, givna av ett antal index, och ett fullständigt namn i Hermann–Mauguin-notation, och ett kort namn (internationell kort symbol). De långa namnen är givna med blanksteg för läsbarheten. Grupperna har vardera en punktgrupp av enhetscellen.

I Hermann–Mauguin-notation är rymdgrupper namngivna av en symbol som kombinerar punktgruppsidentifierare med versaler som beskriver gittertyp. Translationer inom gittret i form av skruvaxlar och glidplan är också noterade, vilket ger en komplett kristallografisk rymdgrupp.

Dessa är Bravaisgittren i tre dimensioner:

• P – primitiv
• I – rymdcentrerad (från tyska "Innenzentriert")
• F – ytcentrerad (från tyska "Flächenzentriert")
• A – enbart centrerad till A-ytan
• B – enbart centrerad till B-ytan
• C – enbart centrerad till C-ytan
• R – romboedrisk

Ett reflektionsplan m inom punktgrupperna kan ersättas av ett glidplan, märkt som a, b eller c beroende på vilken axel gliden är längs. Det finns också en n-glid, vilket är en glid längs hälften av diagonalen av a-ytan, och d-gliden, vilken är längs en fjärdedel av antingen en yt- eller rymddiagonal av enhetscellen. d-gliden kallas ofta för diamantglidplanet då den ingår i diamantstrukturen.

• ${\displaystyle a}$, ${\displaystyle b}$ eller ${\displaystyle c}$ – glidtranslation längs hälften av gittervektorn av ytan
• ${\displaystyle n}$ – glidtranslation längs en halv ytdiagonal
• ${\displaystyle d}$ – glidplan med translation längs en fjärdedels ytdiagonal.
• ${\displaystyle e}$ – två glider med samma glidplan och translation längs två (olika) halvgittervektorer.

En gyrationspunkt som kan ersättas av en skruvaxel är noterad med ett tal, n, där rotationsvinkeln är ${\displaystyle \color {Black}{\tfrac {360^{\circ }}{n}}}$. Graden av translation anges sedan nedsänkt och visar hur långt längs axeln translationen är, som en del av den parallella gittervektorn. Exempelvis, 2₁ är en 180° (tvåfaldig) rotation följt av en translation av hälften av gittervektorn. 3₁ ä en 120° (trefaldig) rotation följt av en translation av en tredjedel av gittervektorn.

De möjliga skruvaxlarna är: 2₁, 3₁, 3₂, 4₁, 4₂, 4₃, 6₁, 6₂, 6₃, 6₄ och 6₅.

I Schoenfliesnotation, är symbolen för en rymdgrupp representerad av symbolen för motsvarande punktgrupp upphöjd. Upphöjningen ger inte någon extra information om rymdgruppens symmetrielement. Det är relaterat till ordningen för Shoenflies-härledda rymdgrupper.

I Fjodorovsymbol, är rymdgruppstypen betecknad som s (symmorfik), h (hemisymmorfik) eller a (asymmorfik). Talet är relaterat till ordningen för Fjodorov-härledda rymdgrupper. Det finns 73 symmorfika, 54 hemisymmorfika och 103 asymmorfika rymdgrupper. Symmorfika rymdgrupper kan erhållas som en kombination av Bravaisgitter med motsvarande punktgrupp. Dessa grupper innehåller samma symmetrielement som de motsvarande punktgrupperna. Hemisymmorfika rymdgrupper innehåller enbart en axiell kombination av symmetrielementen från de motsvarande punktgrupperna. Alla andra rymdgrupper är asymmorfika. Exempel för punktgrupp 4/mmm (${\displaystyle {\tfrac {4}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$): de symmorfika rymdgrupperna är P4/mmm (${\displaystyle P{\tfrac {4}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$, 36s) och I4/mmm (${\displaystyle I{\tfrac {4}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$, 37s); hemisymmorfika rymdgrupper bör innehålla den axiella kombinationen 422, de är P4/mcc (${\displaystyle P{\tfrac {4}{m}}{\tfrac {2}{c}}{\tfrac {2}{c}}}$, 35h), P4/nbm (${\displaystyle P{\tfrac {4}{n}}{\tfrac {2}{b}}{\tfrac {2}{m}}}$, 36h), P4/nnc (${\displaystyle P{\tfrac {4}{n}}{\tfrac {2}{n}}{\tfrac {2}{c}}}$, 37h) och I4/mcm (${\displaystyle I{\tfrac {4}{m}}{\tfrac {2}{c}}{\tfrac {2}{m}}}$, 38h).

Triklina Bravaisgitter

Triklina kristallsystemet

Nummer	Punktgrupp	Kort namn	Fullständigt namn	Schoenflies	Fjodorov	Shubnikov	Fibrifold
1	1	P1	P 1	${\displaystyle C_{1}^{1}}$	1s	${\displaystyle (a/b/c)\cdot 1}$
2	1	P1	P 1	${\displaystyle C_{i}^{1}}$	2s	${\displaystyle (a/b/c)\cdot {\tilde {2}}}$

Monoklina Bravaisgitter

Enkel (P)	Bas (C)

Monoklina kristallsystemet

Nummer	Punktgrupp	Kort namn	Fullständigt namn		Schoenflies	Fjodorov	Shubnikov	Fibrifold
3	2	P2	P 1 2 1	P 1 1 2	${\displaystyle C_{2}^{1}}$	3s	${\displaystyle (b:(c/a)):2}$
4	2	P21	P 1 21 1	P 1 1 21	${\displaystyle C_{2}^{2}}$	1a	${\displaystyle (b:(c/a)):2_{1}}$
5	2	C2	C 1 2 1	B 1 1 2	${\displaystyle C_{2}^{3}}$	4s	${\displaystyle \left({\tfrac {a+b}{2}}/b:(c/a)\right):2}$
6	m	Pm	P 1 m 1	P 1 1 m	${\displaystyle C_{s}^{1}}$	5s	${\displaystyle (b:(c/a))\cdot m}$
7	m	Pc	P 1 c 1	P 1 1 b	${\displaystyle C_{s}^{2}}$	1h	${\displaystyle (b:(c/a))\cdot {\tilde {c}}}$
8	m	Cm	C 1 m 1	B 1 1 m	${\displaystyle C_{s}^{3}}$	6s	${\displaystyle \left({\tfrac {a+b}{2}}/b:(c/a)\right)\cdot m}$
9	m	Cc	C 1 c 1	B 1 1 b	${\displaystyle C_{s}^{4}}$	2h	${\displaystyle \left({\tfrac {a+b}{2}}/b:(c/a)\right)\cdot {\tilde {c}}}$
10	2/m	P2/m	P 1 2/m 1	P 1 1 2/m	${\displaystyle C_{2h}^{1}}$	7s	${\displaystyle (b:(c/a))\cdot m:2}$
11	2/m	P21/m	P 1 21/m 1	P 1 1 21/m	${\displaystyle C_{2h}^{2}}$	2a	${\displaystyle (b:(c/a))\cdot m:2_{1}}$
12	2/m	C2/m	C 1 2/m 1	B 1 1 2/m	${\displaystyle C_{2h}^{3}}$	8s	${\displaystyle \left({\tfrac {a+b}{2}}/b:(c/a)\right)\cdot m:2}$
13	2/m	P2/c	P 1 2/c 1	P 1 1 2/b	${\displaystyle C_{2h}^{4}}$	3h	${\displaystyle (b:(c/a))\cdot {\tilde {c}}:2}$
14	2/m	P21/c	P 1 21/c 1	P 1 1 21/b	${\displaystyle C_{2h}^{5}}$	3a	${\displaystyle (b:(c/a))\cdot {\tilde {c}}:2_{1}}$
15	2/m	C2/c	C 1 2/c 1	B 1 1 2/b	${\displaystyle C_{2h}^{6}}$	4h	${\displaystyle \left({\tfrac {a+b}{2}}/b:(c/a)\right)\cdot {\tilde {c}}:2}$

Ortorombiska kristallsystemet

Nummer	Punktgrupp	Kort namn	Fullständigt namn	Schoenflies	Fjodorov	Shubnikov	Fibrifold
16	222	P222	P 2 2 2	${\displaystyle D_{2}^{1}}$	9s	${\displaystyle (c:a:b):2:2}$
17	222	P2221	P 2 2 21	${\displaystyle D_{2}^{2}}$	4a	${\displaystyle (c:a:b):2_{1}:2}$
18	222	P21212	P 21 21 2	${\displaystyle D_{2}^{3}}$	7a	${\displaystyle (c:a:b):2}$ ${\displaystyle 2_{1}}$
19	222	P212121	P 21 21 21	${\displaystyle D_{2}^{4}}$	8a	${\displaystyle (c:a:b):2_{1}}$ ${\displaystyle 2_{1}}$
20	222	C2221	C 2 2 21	${\displaystyle D_{2}^{5}}$	5a	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right):2_{1}:2}$
21	222	C222	C 2 2 2	${\displaystyle D_{2}^{6}}$	10s	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right):2:2}$
22	222	F222	F 2 2 2	${\displaystyle D_{2}^{7}}$	12s	${\displaystyle \left({\tfrac {a+c}{2}}/{\tfrac {b+c}{2}}/{\tfrac {a+b}{2}}:c:a:b\right):2:2}$
23	222	I222	I 2 2 2	${\displaystyle D_{2}^{8}}$	11s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right):2:2}$
24	222	I212121	I 21 21 21	${\displaystyle D_{2}^{9}}$	6a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right):2:2_{1}}$
25	mm2	Pmm2	P m m 2	${\displaystyle C_{2v}^{1}}$	13s	${\displaystyle (c:a:b):m\cdot 2}$
26	mm2	Pmc21	P m c 21	${\displaystyle C_{2v}^{2}}$	9a	${\displaystyle (c:a:b):{\tilde {c}}\cdot 2_{1}}$
27	mm2	Pcc2	P c c 2	${\displaystyle C_{2v}^{3}}$	5h	${\displaystyle (c:a:b):{\tilde {c}}\cdot 2}$
28	mm2	Pma2	P m a 2	${\displaystyle C_{2v}^{4}}$	6h	${\displaystyle (c:a:b):{\tilde {a}}\cdot 2}$
29	mm2	Pca21	P c a 21	${\displaystyle C_{2v}^{5}}$	11a	${\displaystyle (c:a:b):{\tilde {a}}\cdot 2_{1}}$
30	mm2	Pnc2	P n c 2	${\displaystyle C_{2v}^{6}}$	7h	${\displaystyle (c:a:b):{\tilde {c}}\odot 2}$
31	mm2	Pmn21	P m n 21	${\displaystyle C_{2v}^{7}}$	10a	${\displaystyle (c:a:b):{\widetilde {ac}}\cdot 2_{1}}$
32	mm2	Pba2	P b a 2	${\displaystyle C_{2v}^{8}}$	9h	${\displaystyle (c:a:b):{\tilde {a}}\odot 2}$
33	mm2	Pna21	P n a 21	${\displaystyle C_{2v}^{9}}$	12a	${\displaystyle (c:a:b):{\tilde {a}}\odot 2_{1}}$
34	mm2	Pnn2	P n n 2	${\displaystyle C_{2v}^{10}}$	8h	${\displaystyle (c:a:b):{\widetilde {ac}}\odot 2}$
35	mm2	Cmm2	C m m 2	${\displaystyle C_{2v}^{11}}$	14s	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right):m\cdot 2}$
36	mm2	Cmc21	C m c 21	${\displaystyle C_{2v}^{12}}$	13a	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right):{\tilde {c}}\cdot 2_{1}}$
37	mm2	Ccc2	C c c 2	${\displaystyle C_{2v}^{13}}$	10h	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right):{\tilde {c}}\cdot 2}$
38	mm2	Amm2	A m m 2	${\displaystyle C_{2v}^{14}}$	15s	${\displaystyle \left({\tfrac {b+c}{2}}/c:a:b\right):m\cdot 2}$
39	mm2	Aem2	A b m 2	${\displaystyle C_{2v}^{15}}$	11h	${\displaystyle \left({\tfrac {b+c}{2}}/c:a:b\right):m\cdot 2_{1}}$
40	mm2	Ama2	A m a 2	${\displaystyle C_{2v}^{16}}$	12h	${\displaystyle \left({\tfrac {b+c}{2}}/c:a:b\right):{\tilde {a}}\cdot 2}$
41	mm2	Aea2	A b a 2	${\displaystyle C_{2v}^{17}}$	13h	${\displaystyle \left({\tfrac {b+c}{2}}/c:a:b\right):{\tilde {a}}\cdot 2_{1}}$
42	mm2	Fmm2	F m m 2	${\displaystyle C_{2v}^{18}}$	17s	${\displaystyle \left({\tfrac {a+c}{2}}/{\tfrac {b+c}{2}}/{\tfrac {a+b}{2}}:c:a:b\right):m\cdot 2}$
43	mm2	Fdd2	F dd2	${\displaystyle C_{2v}^{19}}$	16h	${\displaystyle \left({\tfrac {a+c}{2}}/{\tfrac {b+c}{2}}/{\tfrac {a+b}{2}}:c:a:b\right):{\tfrac {1}{2}}{\widetilde {ac}}\odot 2}$
44	mm2	Imm2	I m m 2	${\displaystyle C_{2v}^{20}}$	16s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right):m\cdot 2}$
45	mm2	Iba2	I b a 2	${\displaystyle C_{2v}^{21}}$	15h	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right):{\tilde {c}}\cdot 2}$
46	mm2	Ima2	I m a 2	${\displaystyle C_{2v}^{22}}$	14h	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right):{\tilde {a}}\cdot 2}$
47	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pmmm	P 2/m 2/m 2/m	${\displaystyle D_{2h}^{1}}$	18s	${\displaystyle \left(c:a:b\right)\cdot m:2\cdot m}$
48	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pnnn	P 2/n 2/n 2/n	${\displaystyle D_{2h}^{2}}$	19h	${\displaystyle \left(c:a:b\right)\cdot {\widetilde {ab}}:2\odot {\widetilde {ac}}}$
49	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pccm	P 2/c 2/c 2/m	${\displaystyle D_{2h}^{3}}$	17h	${\displaystyle \left(c:a:b\right)\cdot m:2\cdot {\tilde {c}}}$
50	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pban	P 2/b 2/a 2/n	${\displaystyle D_{2h}^{4}}$	18h	${\displaystyle \left(c:a:b\right)\cdot {\widetilde {ab}}:2\odot {\tilde {a}}}$
51	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pmma	P 21/m 2/m 2/a	${\displaystyle D_{2h}^{5}}$	14a	${\displaystyle \left(c:a:b\right)\cdot {\tilde {a}}:2\cdot m}$
52	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pnna	P 2/n 21/n 2/a	${\displaystyle D_{2h}^{6}}$	17a	${\displaystyle \left(c:a:b\right)\cdot {\tilde {a}}:2\odot {\widetilde {ac}}}$
53	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pmna	P 2/m 2/n 21/a	${\displaystyle D_{2h}^{7}}$	15a	${\displaystyle \left(c:a:b\right)\cdot {\tilde {a}}:2_{1}\cdot {\widetilde {ac}}}$
54	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pcca	P 21/c 2/c 2/a	${\displaystyle D_{2h}^{8}}$	16a	${\displaystyle \left(c:a:b\right)\cdot {\tilde {a}}:2\cdot {\tilde {c}}}$
55	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pbam	P 21/b 21/a 2/m	${\displaystyle D_{2h}^{9}}$	22a	${\displaystyle \left(c:a:b\right)\cdot m:2\odot {\tilde {a}}}$
56	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pccn	P 21/c 21/c 2/n	${\displaystyle D_{2h}^{10}}$	27a	${\displaystyle \left(c:a:b\right)\cdot {\widetilde {ab}}:2\cdot {\tilde {c}}}$
57	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pbcm	P 2/b 21/c 21/m	${\displaystyle D_{2h}^{11}}$	23a	${\displaystyle \left(c:a:b\right)\cdot m:2_{1}\odot {\tilde {c}}}$
58	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pnnm	P 21/n 21/n 2/m	${\displaystyle D_{2h}^{12}}$	25a	${\displaystyle \left(c:a:b\right)\cdot m:2\odot {\widetilde {ac}}}$
59	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pmmn	P 21/m 21/m 2/n	${\displaystyle D_{2h}^{13}}$	24a	${\displaystyle \left(c:a:b\right)\cdot {\widetilde {ab}}:2\cdot m}$
60	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pbcn	P 21/b 2/c 21/n	${\displaystyle D_{2h}^{14}}$	26a	${\displaystyle \left(c:a:b\right)\cdot {\widetilde {ab}}:2_{1}\odot {\tilde {c}}}$
61	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pbca	P 21/b 21/c 21/a	${\displaystyle D_{2h}^{15}}$	29a	${\displaystyle \left(c:a:b\right)\cdot {\tilde {a}}:2_{1}\odot {\tilde {c}}}$
62	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Pnma	P 21/n 21/m 21/a	${\displaystyle D_{2h}^{16}}$	28a	${\displaystyle \left(c:a:b\right)\cdot {\tilde {a}}:2_{1}\odot m}$
63	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Cmcm	C 2/m 2/c 21/m	${\displaystyle D_{2h}^{17}}$	18a	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right)\cdot m:2_{1}\cdot {\tilde {c}}}$
64	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Cmca	C 2/m 2/c 21/a	${\displaystyle D_{2h}^{18}}$	19a	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right)\cdot {\tilde {a}}:2_{1}\cdot {\tilde {c}}}$
65	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Cmmm	C 2/m 2/m 2/m	${\displaystyle D_{2h}^{19}}$	19s	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right)\cdot m:2\cdot m}$
66	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Cccm	C 2/c 2/c 2/m	${\displaystyle D_{2h}^{20}}$	20h	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right)\cdot m:2\cdot {\tilde {c}}}$
67	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Cmme	C 2/m 2/m 2/e	${\displaystyle D_{2h}^{21}}$	21h	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right)\cdot {\tilde {a}}:2\cdot m}$
68	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Ccce	C 2/c 2/c 2/e	${\displaystyle D_{2h}^{22}}$	22h	${\displaystyle \left({\tfrac {a+b}{2}}:c:a:b\right)\cdot {\tilde {a}}:2\cdot {\tilde {c}}}$
69	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Fmmm	F 2/m 2/m 2/m	${\displaystyle D_{2h}^{23}}$	21s	${\displaystyle \left({\tfrac {a+c}{2}}/{\tfrac {b+c}{2}}/{\tfrac {a+b}{2}}:c:a:b\right)\cdot m:2\cdot m}$
70	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Fddd	F 2/d 2/d 2/d	${\displaystyle D_{2h}^{24}}$	24h	${\displaystyle \left({\tfrac {a+c}{2}}/{\tfrac {b+c}{2}}/{\tfrac {a+b}{2}}:c:a:b\right)\cdot {\tfrac {1}{2}}{\widetilde {ab}}:2\odot {\tfrac {1}{2}}{\widetilde {ac}}}$
71	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Immm	I 2/m 2/m 2/m	${\displaystyle D_{2h}^{25}}$	20s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right)\cdot m:2\cdot m}$
72	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Ibam	I 2/b 2/a 2/m	${\displaystyle D_{2h}^{26}}$	23h	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right)\cdot m:2\cdot {\tilde {c}}}$
73	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Ibca	I 2/b 2/c 2/a	${\displaystyle D_{2h}^{27}}$	21a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right)\cdot {\tilde {a}}:2\cdot {\tilde {c}}}$
74	${\displaystyle {\tfrac {2}{m}}{\tfrac {2}{m}}{\tfrac {2}{m}}}$	Imma	I 2/m 2/m 2/a	${\displaystyle D_{2h}^{28}}$	20a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:b\right)\cdot {\tilde {a}}:2\cdot m}$

Tetragonala kristallsystemet

Nummer	Punktgrupp	Kort namn	Fullständigt namn	Schoenflies	Fjodorov	Shubnikov	Fibrifold
75	4	P4	P 4	${\displaystyle C_{4}^{1}}$	22s	${\displaystyle (c:a:a):4}$
76	4	P41	P 41	${\displaystyle C_{4}^{2}}$	30a	${\displaystyle (c:a:a):4_{1}}$
77	4	P42	P 42	${\displaystyle C_{4}^{3}}$	33a	${\displaystyle (c:a:a):4_{2}}$
78	4	P43	P 43	${\displaystyle C_{4}^{4}}$	31a	${\displaystyle (c:a:a):4_{3}}$
79	4	I4	I 4	${\displaystyle C_{4}^{5}}$	23s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):4}$
80	4	I41	I 41	${\displaystyle C_{4}^{6}}$	32a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):4_{1}}$
81	4	P4	P 4	${\displaystyle S_{4}^{1}}$	26s	${\displaystyle (c:a:a):{\tilde {4}}}$
82	4	I4	I 4	${\displaystyle S_{4}^{2}}$	27s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):{\tilde {4}}}$
83	4/m	P4/m	P 4/m	${\displaystyle C_{4h}^{1}}$	28s	${\displaystyle (c:a:a)\cdot m:4}$
84	4/m	P42/m	P 42/m	${\displaystyle C_{4h}^{2}}$	41a	${\displaystyle (c:a:a)\cdot m:4_{2}}$
85	4/m	P4/n	P 4/n	${\displaystyle C_{4h}^{3}}$	29h	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4}$
86	4/m	P42/n	P 42/n	${\displaystyle C_{4h}^{4}}$	42a	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4_{2}}$
87	4/m	I4/m	I 4/m	${\displaystyle C_{4h}^{5}}$	29s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right)\cdot m:4}$
88	4/m	I41/a	I 41/a	${\displaystyle C_{4h}^{6}}$	40a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right)\cdot {\tilde {a}}:4_{1}}$
89	422	P422	P 4 2 2	${\displaystyle D_{4}^{1}}$	30s	${\displaystyle (c:a:a):4:2}$
90	422	P4212	P4212	${\displaystyle D_{4}^{2}}$	43a	${\displaystyle (c:a:a):4}$ ${\displaystyle 2_{1}}$
91	422	P4122	P 41 2 2	${\displaystyle D_{4}^{3}}$	44a	${\displaystyle (c:a:a):4_{1}:2}$
92	422	P41212	P 41 21 2	${\displaystyle D_{4}^{4}}$	48a	${\displaystyle (c:a:a):4_{1}}$ ${\displaystyle 2_{1}}$
93	422	P4222	P 42 2 2	${\displaystyle D_{4}^{5}}$	47a	${\displaystyle (c:a:a):4_{2}:2}$
94	422	P42212	P 42 21 2	${\displaystyle D_{4}^{6}}$	50a	${\displaystyle (c:a:a):4_{2}}$ ${\displaystyle 2_{1}}$
95	422	P4322	P 43 2 2	${\displaystyle D_{4}^{7}}$	45a	${\displaystyle (c:a:a):4_{3}:2}$
96	422	P43212	P 43 21 2	${\displaystyle D_{4}^{8}}$	49a	${\displaystyle (c:a:a):4_{3}}$ ${\displaystyle 2_{1}}$
97	422	I422	I 4 2 2	${\displaystyle D_{4}^{9}}$	31s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):4:2}$
98	422	I4122	I 41 2 2	${\displaystyle D_{4}^{10}}$	46a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):4:2_{1}}$
99	4mm	P4mm	P 4 m m	${\displaystyle C_{4v}^{1}}$	24s	${\displaystyle (c:a:a):4\cdot m}$
100	4mm	P4bm	P 4 b m	${\displaystyle C_{4v}^{2}}$	26h	${\displaystyle (c:a:a):4\odot {\tilde {a}}}$
101	4mm	P42cm	P 42 c m	${\displaystyle C_{4v}^{3}}$	37a	${\displaystyle (c:a:a):4_{2}\cdot {\tilde {c}}}$
102	4mm	P42nm	P 42 n m	${\displaystyle C_{4v}^{4}}$	38a	${\displaystyle (c:a:a):4_{2}\odot {\widetilde {ac}}}$
103	4mm	P4cc	P 4 c c	${\displaystyle C_{4v}^{5}}$	25h	${\displaystyle (c:a:a):4\cdot {\tilde {c}}}$
104	4mm	P4nc	P 4 n c	${\displaystyle C_{4v}^{6}}$	27h	${\displaystyle (c:a:a):4\odot {\widetilde {ac}}}$
105	4mm	P42mc	P 42 m c	${\displaystyle C_{4v}^{7}}$	36a	${\displaystyle (c:a:a):4_{2}\cdot m}$
106	4mm	P42bc	P 42 b c	${\displaystyle C_{4v}^{8}}$	39a	${\displaystyle (c:a:a):4\odot {\tilde {a}}}$
107	4mm	I4mm	I 4 m m	${\displaystyle C_{4v}^{9}}$	25s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):4\cdot m}$
108	4mm	I4cm	I 4 c m	${\displaystyle C_{4v}^{10}}$	28h	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):4\cdot {\tilde {c}}}$
109	4mm	I41md	I 41 m d	${\displaystyle C_{4v}^{11}}$	34a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):4_{1}\odot m}$
110	4mm	I41cd	I 41 c d	${\displaystyle C_{4v}^{12}}$	35a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):4_{1}\odot {\tilde {c}}}$
111	42m	P42m	P 4 2 m	${\displaystyle D_{2d}^{1}}$	32s	${\displaystyle (c:a:a):{\tilde {4}}:2}$
112	42m	P42c	P 4 2 c	${\displaystyle D_{2d}^{2}}$	30h	${\displaystyle (c:a:a):{\tilde {4}}}$ ${\displaystyle 2}$
113	42m	P421m	P 4 21 m	${\displaystyle D_{2d}^{3}}$	52a	${\displaystyle (c:a:a):{\tilde {4}}\cdot {\widetilde {ab}}}$
114	42m	P421c	P 4 21 c	${\displaystyle D_{2d}^{4}}$	53a	${\displaystyle (c:a:a):{\tilde {4}}\cdot {\widetilde {abc}}}$
115	42m	P4m2	P 4 m 2	${\displaystyle D_{2d}^{5}}$	33s	${\displaystyle (c:a:a):{\tilde {4}}\cdot m}$
116	42m	P4c2	P 4 c 2	${\displaystyle D_{2d}^{6}}$	31h	${\displaystyle (c:a:a):{\tilde {4}}\cdot {\tilde {c}}}$
117	42m	P4b2	P 4 b 2	${\displaystyle D_{2d}^{7}}$	32h	${\displaystyle (c:a:a):{\tilde {4}}\odot {\tilde {a}}}$
118	42m	P4n2	P 4 n 2	${\displaystyle D_{2d}^{8}}$	33h	${\displaystyle (c:a:a):{\tilde {4}}\cdot {\widetilde {ac}}}$
119	42m	I4m2	I 4 m 2	${\displaystyle D_{2d}^{9}}$	35s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):{\tilde {4}}\cdot m}$
120	42m	I4c2	I 4 c 2	${\displaystyle D_{2d}^{10}}$	34h	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):{\tilde {4}}\cdot {\tilde {c}}}$
121	42m	I42m	I 4 2 m	${\displaystyle D_{2d}^{11}}$	34s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):{\tilde {4}}:2}$
122	42m	I42d	I 4 2 d	${\displaystyle D_{2d}^{12}}$	51a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right):{\tilde {4}}\odot {\tfrac {1}{2}}{\widetilde {abc}}}$
123	4/m 2/m 2/m	P4/mmm	P 4/m 2/m 2/m	${\displaystyle D_{4h}^{1}}$	36s	${\displaystyle (c:a:a)\cdot m:4\cdot m}$
124	4/m 2/m 2/m	P4/mcc	P 4/m 2/c 2/c	${\displaystyle D_{4h}^{2}}$	35h	${\displaystyle (c:a:a)\cdot m:4\cdot {\tilde {c}}}$
125	4/m 2/m 2/m	P4/nbm	P 4/n 2/b 2/m	${\displaystyle D_{4h}^{3}}$	36h	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4\odot {\tilde {a}}}$
126	4/m 2/m 2/m	P4/nnc	P 4/n 2/n 2/c	${\displaystyle D_{4h}^{4}}$	37h	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4\odot {\widetilde {ac}}}$
127	4/m 2/m 2/m	P4/mbm	P 4/m 21/b 2/m	${\displaystyle D_{4h}^{5}}$	54a	${\displaystyle (c:a:a)\cdot m:4\odot {\tilde {a}}}$
128	4/m 2/m 2/m	P4/mnc	P 4/m 21/n 2/c	${\displaystyle D_{4h}^{6}}$	56a	${\displaystyle (c:a:a)\cdot m:4\odot {\widetilde {ac}}}$
129	4/m 2/m 2/m	P4/nmm	P 4/n 21/m 2/m	${\displaystyle D_{4h}^{7}}$	55a	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4\cdot m}$
130	4/m 2/m 2/m	P4/ncc	P 4/n 21/c 2/c	${\displaystyle D_{4h}^{8}}$	57a	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4\cdot {\tilde {c}}}$
131	4/m 2/m 2/m	P42/mmc	P 42/m 2/m 2/c	${\displaystyle D_{4h}^{9}}$	60a	${\displaystyle (c:a:a)\cdot m:4_{2}\cdot m}$
132	4/m 2/m 2/m	P42/mcm	P 42/m 2/c 2/m	${\displaystyle D_{4h}^{10}}$	61a	${\displaystyle (c:a:a)\cdot m:4_{2}\cdot {\tilde {c}}}$
133	4/m 2/m 2/m	P42/nbc	P 42/n 2/b 2/c	${\displaystyle D_{4h}^{11}}$	63a	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4_{2}\odot {\tilde {a}}}$
134	4/m 2/m 2/m	P42/nnm	P 42/n 2/n 2/m	${\displaystyle D_{4h}^{12}}$	62a	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4_{2}\odot {\widetilde {ac}}}$
135	4/m 2/m 2/m	P42/mbc	P 42/m 21/b 2/c	${\displaystyle D_{4h}^{13}}$	66a	${\displaystyle (c:a:a)\cdot m:4_{2}\odot {\tilde {a}}}$
136	4/m 2/m 2/m	P42/mnm	P 42/m 21/n 2/m	${\displaystyle D_{4h}^{14}}$	65a	${\displaystyle (c:a:a)\cdot m:4_{2}\odot {\widetilde {ac}}}$
137	4/m 2/m 2/m	P42/nmc	P 42/n 21/m 2/c	${\displaystyle D_{4h}^{15}}$	67a	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4_{2}\cdot m}$
138	4/m 2/m 2/m	P42/ncm	P 42/n 21/c 2/m	${\displaystyle D_{4h}^{16}}$	65a	${\displaystyle (c:a:a)\cdot {\widetilde {ab}}:4_{2}\cdot {\tilde {c}}}$
139	4/m 2/m 2/m	I4/mmm	I 4/m 2/m 2/m	${\displaystyle D_{4h}^{17}}$	37s	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right)\cdot m:4\cdot m}$
140	4/m 2/m 2/m	I4/mcm	I 4/m 2/c 2/m	${\displaystyle D_{4h}^{18}}$	38h	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right)\cdot m:4\cdot {\tilde {c}}}$
141	4/m 2/m 2/m	I41/amd	I 41/a 2/m 2/d	${\displaystyle D_{4h}^{19}}$	59a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right)\cdot {\tilde {a}}:4_{1}\odot m}$
142	4/m 2/m 2/m	I41/acd	I 41/a 2/c 2/d	${\displaystyle D_{4h}^{20}}$	58a	${\displaystyle \left({\tfrac {a+b+c}{2}}/c:a:a\right)\cdot {\tilde {a}}:4_{1}\odot {\tilde {c}}}$