Overview
- Group
- SmallGroup(48,38)
- Rank
- 3
- Schläfli Type
- {4,6}
- Vertices, edges, …
- 4, 12, 6
- Order of s0s1s2
- 12
- Order of s0s1s2s1
- 2
- Also known as
- {4,6|2}. if this polytope has another name.
Special Properties
- Compact Hyperbolic Quotient
- Locally Spherical
- Orientable
- Flat
Quotients maximal quotients in bold
2-fold
3-fold
4-fold
6-fold
Covers minimal covers in bold
2-fold
3-fold
4-fold
5-fold
6-fold
7-fold
8-fold
- {4,24}*384a
- {8,24}*384a
- {8,24}*384b
- {8,12}*384a
- {8,24}*384c
- {8,24}*384d
- {4,48}*384a
- {4,48}*384b
- {4,12}*384a
- {4,24}*384b
- {8,12}*384b
- {16,12}*384a
- {16,12}*384b
- {32,6}*384
- {4,12}*384d
- {8,6}*384f
- {8,6}*384g
- {4,12}*384e
- {4,6}*384b
9-fold
10-fold
11-fold
12-fold
- {4,72}*576a
- {4,36}*576a
- {4,72}*576b
- {8,36}*576a
- {8,36}*576b
- {16,18}*576
- {48,6}*576a
- {24,12}*576a
- {12,12}*576a
- {12,12}*576b
- {24,12}*576b
- {12,24}*576c
- {12,24}*576d
- {24,12}*576c
- {12,24}*576e
- {12,24}*576f
- {24,12}*576e
- {48,6}*576c
- {4,18}*576b
- {12,12}*576d
- {12,6}*576b
- {12,6}*576e
- {12,6}*576f
13-fold
14-fold
15-fold
16-fold
- {8,24}*768a
- {8,12}*768a
- {8,24}*768b
- {4,24}*768a
- {8,24}*768c
- {8,24}*768d
- {16,12}*768a
- {4,48}*768a
- {16,12}*768b
- {4,48}*768b
- {8,48}*768a
- {16,24}*768a
- {8,48}*768b
- {16,24}*768b
- {16,24}*768c
- {8,48}*768c
- {8,48}*768d
- {16,24}*768d
- {16,24}*768e
- {8,48}*768e
- {8,48}*768f
- {16,24}*768f
- {32,12}*768a
- {4,96}*768a
- {32,12}*768b
- {4,96}*768b
- {4,12}*768a
- {4,24}*768b
- {8,12}*768b
- {8,12}*768c
- {8,24}*768e
- {4,24}*768c
- {4,24}*768d
- {8,12}*768d
- {8,24}*768f
- {8,24}*768g
- {8,24}*768h
- {64,6}*768
- {8,6}*768j
- {8,12}*768o
- {8,12}*768p
- {4,6}*768a
- {8,12}*768s
- {4,24}*768i
- {4,12}*768d
- {8,12}*768t
- {4,24}*768j
- {8,12}*768u
- {4,12}*768e
- {4,24}*768k
- {8,6}*768k
- {8,12}*768w
- {4,12}*768f
- {4,24}*768l
- {8,6}*768l
- {16,6}*768b
- {16,6}*768c
17-fold
18-fold
- {4,108}*864a
- {8,54}*864
- {72,6}*864a
- {24,18}*864a
- {24,6}*864b
- {12,36}*864a
- {12,36}*864b
- {36,12}*864a
- {12,12}*864b
- {12,12}*864c
- {24,18}*864b
- {24,6}*864c
- {24,6}*864f
- {12,12}*864h
- {4,12}*864c
- {4,12}*864d
- {8,6}*864b
- {12,12}*864l
19-fold
20-fold
- {80,6}*960
- {20,12}*960a
- {20,24}*960a
- {40,12}*960a
- {20,24}*960b
- {40,12}*960b
- {4,120}*960a
- {4,60}*960a
- {4,120}*960b
- {8,60}*960a
- {8,60}*960b
- {16,30}*960
- {20,6}*960e
- {4,30}*960b
21-fold
22-fold
23-fold
24-fold
- {8,36}*1152a
- {4,72}*1152a
- {12,24}*1152a
- {12,24}*1152b
- {24,12}*1152b
- {24,12}*1152c
- {8,72}*1152a
- {8,72}*1152b
- {8,72}*1152c
- {24,24}*1152a
- {24,24}*1152b
- {24,24}*1152f
- {24,24}*1152g
- {24,24}*1152h
- {24,24}*1152i
- {8,72}*1152d
- {24,24}*1152j
- {24,24}*1152k
- {16,36}*1152a
- {4,144}*1152a
- {12,48}*1152a
- {12,48}*1152b
- {48,12}*1152b
- {48,12}*1152c
- {16,36}*1152b
- {4,144}*1152b
- {12,48}*1152d
- {12,48}*1152e
- {48,12}*1152e
- {48,12}*1152f
- {4,36}*1152a
- {4,72}*1152b
- {8,36}*1152b
- {12,12}*1152b
- {12,24}*1152e
- {24,12}*1152d
- {24,12}*1152e
- {12,12}*1152c
- {12,24}*1152f
- {32,18}*1152
- {96,6}*1152a
- {96,6}*1152c
- {4,36}*1152d
- {8,18}*1152f
- {8,18}*1152g
- {4,36}*1152e
- {4,18}*1152b
- {12,24}*1152i
- {12,24}*1152k
- {24,6}*1152d
- {24,12}*1152o
- {24,12}*1152q
- {24,6}*1152h
- {12,6}*1152d
- {12,12}*1152i
- {12,12}*1152j
- {12,12}*1152k
- {12,12}*1152n
- {12,12}*1152o
- {24,6}*1152j
- {24,6}*1152k
- {12,6}*1152e
- {24,6}*1152l
- {12,12}*1152p
- {12,12}*1152r
- {12,6}*1152f
- {24,6}*1152m
25-fold
- {100,6}*1200a
- {4,150}*1200a
- {20,6}*1200a
- {20,6}*1200b
- {20,30}*1200a
- {20,30}*1200b
- {20,30}*1200c
- {4,30}*1200b
26-fold
27-fold
- {4,162}*1296a
- {36,18}*1296a
- {12,18}*1296a
- {36,6}*1296b
- {12,54}*1296a
- {108,6}*1296a
- {12,6}*1296a
- {12,6}*1296b
- {12,18}*1296b
- {36,6}*1296f
- {12,18}*1296c
- {36,6}*1296g
- {36,18}*1296c
- {12,18}*1296e
- {12,54}*1296b
- {12,18}*1296f
- {12,18}*1296g
- {12,18}*1296h
- {12,6}*1296d
- {36,6}*1296h
- {36,6}*1296l
- {12,18}*1296l
- {12,6}*1296g
- {12,6}*1296h
- {12,6}*1296i
- {4,18}*1296b
- {4,6}*1296a
- {12,6}*1296j
- {12,6}*1296k
- {12,6}*1296s
- {12,6}*1296t
28-fold
- {112,6}*1344
- {28,12}*1344a
- {28,24}*1344a
- {56,12}*1344a
- {28,24}*1344b
- {56,12}*1344b
- {4,168}*1344a
- {4,84}*1344a
- {4,168}*1344b
- {8,84}*1344a
- {8,84}*1344b
- {16,42}*1344
- {28,6}*1344e
- {4,42}*1344b
29-fold
30-fold
- {40,18}*1440
- {20,36}*1440
- {4,180}*1440a
- {8,90}*1440
- {120,6}*1440a
- {60,12}*1440a
- {24,30}*1440b
- {120,6}*1440b
- {12,60}*1440b
- {12,60}*1440c
- {60,12}*1440b
- {24,30}*1440c
31-fold
33-fold
34-fold
35-fold
36-fold
- {4,216}*1728a
- {4,108}*1728a
- {4,216}*1728b
- {8,108}*1728a
- {8,108}*1728b
- {16,54}*1728
- {144,6}*1728a
- {48,18}*1728a
- {48,6}*1728b
- {24,36}*1728a
- {24,12}*1728a
- {12,36}*1728a
- {12,36}*1728b
- {36,12}*1728a
- {12,12}*1728b
- {12,12}*1728c
- {24,36}*1728b
- {24,12}*1728b
- {12,72}*1728a
- {12,72}*1728b
- {72,12}*1728a
- {24,36}*1728c
- {36,24}*1728c
- {12,24}*1728c
- {12,24}*1728d
- {24,12}*1728d
- {12,72}*1728c
- {12,72}*1728d
- {72,12}*1728c
- {24,36}*1728d
- {36,24}*1728d
- {12,24}*1728e
- {12,24}*1728f
- {24,12}*1728f
- {48,18}*1728b
- {48,6}*1728c
- {4,54}*1728b
- {48,6}*1728f
- {12,24}*1728o
- {24,12}*1728o
- {12,24}*1728p
- {24,12}*1728p
- {12,12}*1728h
- {12,36}*1728c
- {36,6}*1728b
- {12,18}*1728b
- {36,12}*1728e
- {12,18}*1728c
- {12,12}*1728j
- {12,6}*1728b
- {12,18}*1728d
- {12,6}*1728e
- {12,6}*1728f
- {4,24}*1728e
- {4,24}*1728f
- {8,12}*1728e
- {4,24}*1728g
- {4,24}*1728h
- {8,12}*1728f
- {16,6}*1728b
- {8,12}*1728g
- {8,12}*1728h
- {4,12}*1728c
- {4,12}*1728d
- {12,12}*1728t
- {12,24}*1728u
- {24,12}*1728v
- {24,12}*1728w
- {12,24}*1728x
- {12,12}*1728v
- {12,6}*1728h
- {12,6}*1728i
- {4,6}*1728
37-fold
38-fold
39-fold
40-fold
- {8,60}*1920a
- {4,120}*1920a
- {40,12}*1920a
- {20,24}*1920a
- {8,120}*1920a
- {8,120}*1920b
- {8,120}*1920c
- {40,24}*1920a
- {40,24}*1920b
- {40,24}*1920c
- {8,120}*1920d
- {40,24}*1920d
- {16,60}*1920a
- {4,240}*1920a
- {80,12}*1920a
- {20,48}*1920a
- {16,60}*1920b
- {4,240}*1920b
- {80,12}*1920b
- {20,48}*1920b
- {4,60}*1920a
- {4,120}*1920b
- {8,60}*1920b
- {40,12}*1920b
- {20,24}*1920b
- {20,12}*1920a
- {32,30}*1920
- {160,6}*1920
- {40,6}*1920b
- {40,6}*1920d
- {20,6}*1920b
- {20,12}*1920b
- {20,12}*1920c
- {4,60}*1920d
- {8,30}*1920f
- {8,30}*1920g
- {4,60}*1920e
- {4,30}*1920b
41-fold
Irregular Quotients of which this is a minimal cover
None.
Representations
Permutation Representation (GAP)
s0 := ( 2, 5)( 6, 9)( 7,10);; s1 := ( 1, 2)( 3, 7)( 4, 6)( 5, 8)( 9,12)(10,11);; s2 := ( 1, 3)( 2, 6)( 5, 9)( 8,11);; poly := Group([s0,s1,s2]);;
Finitely Presented Group Representation (GAP)
F := FreeGroup("s0","s1","s2");;
s0 := F.1;; s1 := F.2;; s2 := F.3;;
rels := [ s0*s0, s1*s1, s2*s2, s0*s2*s0*s2, s0*s1*s0*s1*s0*s1*s0*s1,
s0*s1*s2*s1*s0*s1*s2*s1, s1*s2*s1*s2*s1*s2*s1*s2*s1*s2*s1*s2 ];;
poly := F / rels;;
Permutation Representation (Magma)
s0 := Sym(12)!( 2, 5)( 6, 9)( 7,10); s1 := Sym(12)!( 1, 2)( 3, 7)( 4, 6)( 5, 8)( 9,12)(10,11); s2 := Sym(12)!( 1, 3)( 2, 6)( 5, 9)( 8,11); poly := sub<Sym(12)|s0,s1,s2>;
Finitely Presented Group Representation (Magma)
poly<s0,s1,s2> := Group< s0,s1,s2 | s0*s0, s1*s1, s2*s2, s0*s2*s0*s2, s0*s1*s0*s1*s0*s1*s0*s1, s0*s1*s2*s1*s0*s1*s2*s1, s1*s2*s1*s2*s1*s2*s1*s2*s1*s2*s1*s2 >;
References
None.
to this polytope.