Polytope of Type {6,3,2,4}
This page is part of the Atlas of Small Regular Polytopes
Atlas Canonical Name : {6,3,2,4}*384
if this polytope has a name.
Group : SmallGroup(384,20051)
Rank : 5
Schlafli Type : {6,3,2,4}
Number of vertices, edges, etc : 8, 12, 4, 4, 4
Order of s0s1s2s3s4 : 4
Order of s0s1s2s3s4s3s2s1 : 2
Special Properties :
Degenerate
Universal
Orientable
Flat
Related Polytopes :
Facet
Vertex Figure
Dual
Facet Of :
{6,3,2,4,2} of size 768
{6,3,2,4,3} of size 1152
Vertex Figure Of :
{2,6,3,2,4} of size 768
{3,6,3,2,4} of size 1920
Quotients (Maximal Quotients in Boldface) :
2-fold quotients : {3,3,2,4}*192, {6,3,2,2}*192
4-fold quotients : {3,3,2,2}*96
Covers (Minimal Covers in Boldface) :
2-fold covers : {6,3,2,8}*768, {12,3,2,4}*768, {6,6,2,4}*768
3-fold covers : {6,3,2,12}*1152, {6,3,2,4}*1152
5-fold covers : {6,3,2,20}*1920, {6,15,2,4}*1920
Permutation Representation (GAP) :
s0 := (1,4)(2,6);;
s1 := (1,2)(3,4)(5,6);;
s2 := (1,4)(2,6)(3,5);;
s3 := (8,9);;
s4 := ( 7, 8)( 9,10);;
poly := Group([s0,s1,s2,s3,s4]);;
Finitely Presented Group Representation (GAP) :
F := FreeGroup("s0","s1","s2","s3","s4");;
s0 := F.1;; s1 := F.2;; s2 := F.3;; s3 := F.4;; s4 := F.5;;
rels := [ s0*s0, s1*s1, s2*s2, s3*s3, s4*s4, s0*s2*s0*s2,
s0*s3*s0*s3, s1*s3*s1*s3, s2*s3*s2*s3,
s0*s4*s0*s4, s1*s4*s1*s4, s2*s4*s2*s4,
s1*s2*s1*s2*s1*s2, s3*s4*s3*s4*s3*s4*s3*s4,
s0*s2*s1*s0*s2*s1*s0*s2*s1*s0*s2*s1,
s0*s1*s0*s1*s0*s1*s0*s1*s0*s1*s0*s1 ];;
poly := F / rels;;
Permutation Representation (Magma) :
s0 := Sym(10)!(1,4)(2,6);
s1 := Sym(10)!(1,2)(3,4)(5,6);
s2 := Sym(10)!(1,4)(2,6)(3,5);
s3 := Sym(10)!(8,9);
s4 := Sym(10)!( 7, 8)( 9,10);
poly := sub<Sym(10)|s0,s1,s2,s3,s4>;
Finitely Presented Group Representation (Magma) :
poly<s0,s1,s2,s3,s4> := Group< s0,s1,s2,s3,s4 | s0*s0, s1*s1, s2*s2,
s3*s3, s4*s4, s0*s2*s0*s2, s0*s3*s0*s3,
s1*s3*s1*s3, s2*s3*s2*s3, s0*s4*s0*s4,
s1*s4*s1*s4, s2*s4*s2*s4, s1*s2*s1*s2*s1*s2,
s3*s4*s3*s4*s3*s4*s3*s4, s0*s2*s1*s0*s2*s1*s0*s2*s1*s0*s2*s1,
s0*s1*s0*s1*s0*s1*s0*s1*s0*s1*s0*s1 >;
to this polytope