Chiral Polytope of Type {9,6,6}

This page is part of the Atlas of Small Chiral Polytopes
Regular Cover :{9,6,6}*1944a with group SmallGroup(1944,949) = (C₃³ ⋊ (D₉ x C₂)) x C₂of order 1944
Rank : 4
Schlafli Type : {9,6,6}
Rotation Group : SmallGroup(324,77) = ((C₃³ ⋊ C₃) ⋊ C₂) x C₂ of order 324
Number of vertices, edges, etc : 9, 27, 18, 6
If Aut({9,6,6}*1944a)=<s₀, s₁, s₂, s₃>, then this chiral polytope is ({9,6,6}*1944a)/N, where
N=<s₀*s₁*s₀*s₂*s₁*s₀*s₁*s₂*s₁*s₂*s₁*s₂> of order 3
Facet : Chiral Quotient of {9,6}*324a
Vertex Figure : Regular {6,6}*72b
Finitely Presented Group Representation of the Rotation Group(GAP) :

F := FreeGroup("sig1","sig2","sig3");;
sig1 := F.1;;  sig2 := F.2;;  sig3 := F.3;;  
rels := [ sig1^-1*sig2^-1*sig1^-1*sig2^-1, sig2^-1*sig3^-1*sig2^-1*sig3^-1, sig1^-1*sig3*sig1*sig2*sig3*sig2^-1, 
sig2^-1*sig2^-1*sig3^-1*sig2*sig3^-1*sig2^-1, sig3^-1*sig2*sig3^-1*sig2*sig2*sig2, 
sig1*sig1*sig2^-1*sig1*sig1*sig2^-1, sig3*sig3*sig3*sig3*sig3*sig3, 
sig1*sig2^-1*sig1^-1*sig1^-1*sig3*sig2^-1*sig3 ];;
rotpoly := F / rels;;

Finitely Presented Group Representation of the Rotation Group (Magma) :

rotpoly<sig1,sig2,sig3> := Group< sig1,sig2,sig3 | sig1^-1*sig2^-1*sig1^-1*sig2^-1, sig2^-1*sig3^-1*sig2^-1*sig3^-1, sig1^-1*sig3*sig1*sig2*sig3*sig2^-1, sig2^-1*sig2^-1*sig3^-1*sig2*sig3^-1*sig2^-1, sig3^-1*sig2*sig3^-1*sig2*sig2*sig2, sig1*sig1*sig2^-1*sig1*sig1*sig2^-1, sig3*sig3*sig3*sig3*sig3*sig3, sig1*sig2^-1*sig1^-1*sig1^-1*sig3*sig2^-1*sig3 >;