[Home] [Table] [Glossary]
[Families]
On this page are all graphs related to C4[ 90, 3 ].
Graphs which this one covers
10-fold cover of
C4[ 9, 1 ]
= DW( 3, 3)
6-fold cover of
C4[ 15, 1 ]
= C_ 15(1, 4)
5-fold cover of
C4[ 18, 2 ]
= DW( 6, 3)
3-fold cover of
C4[ 30, 2 ]
= C_ 30(1, 11)
2-fold cover of
C4[ 45, 2 ]
= DW( 15, 3)
Graphs which cover this one
2-fold covered by
C4[ 180, 4 ]
= DW( 60, 3)
2-fold covered by
C4[ 180, 7 ]
= {4, 4}_[ 15, 6]
2-fold covered by
C4[ 180, 8 ]
= {4, 4}_< 18, 12>
2-fold covered by
C4[ 180, 44 ]
= SDD(DW( 15, 3))
3-fold covered by
C4[ 270, 3 ]
= DW( 90, 3)
3-fold covered by
C4[ 270, 4 ]
= {4, 4}_[ 15, 9]
3-fold covered by
C4[ 270, 6 ]
= PS( 30, 9; 2)
3-fold covered by
C4[ 270, 9 ]
= PS( 6, 45; 14)
3-fold covered by
C4[ 270, 11 ]
= AMC( 30, 3, [ 0. 1: 2. 2])
3-fold covered by
C4[ 270, 24 ]
= XI(Rmap(135,4){15,6|6}_30)
4-fold covered by
C4[ 360, 8 ]
= DW(120, 3)
4-fold covered by
C4[ 360, 9 ]
= {4, 4}_[ 15, 12]
4-fold covered by
C4[ 360, 12 ]
= {4, 4}_< 21, 9>
4-fold covered by
C4[ 360, 13 ]
= {4, 4}_[ 30, 6]
4-fold covered by
C4[ 360, 14 ]
= {4, 4}_< 33, 27>
4-fold covered by
C4[ 360, 18 ]
= PS( 30, 24; 5)
4-fold covered by
C4[ 360, 19 ]
= PS( 30, 24; 7)
4-fold covered by
C4[ 360, 47 ]
= PL(MC3( 6, 30, 1, 16, 11, 3, 1), [4^45, 60^3])
4-fold covered by
C4[ 360, 48 ]
= PL(MC3( 6, 30, 1, 16, 11, 18, 1), [4^45, 30^6])
4-fold covered by
C4[ 360, 54 ]
= PL(WH_ 60( 2, 0, 13, 17), [3^60, 30^6])
4-fold covered by
C4[ 360, 57 ]
= PL(WH_ 60( 15, 1, 24, 31), [4^45, 15^12])
4-fold covered by
C4[ 360, 58 ]
= PL(WH_ 60( 15, 1, 31, 54), [4^45, 30^6])
4-fold covered by
C4[ 360, 75 ]
= UG(ATD[360,50])
4-fold covered by
C4[ 360, 77 ]
= UG(ATD[360,56])
4-fold covered by
C4[ 360, 127 ]
= PL(ATD[6,1]#ATD[15,2])
4-fold covered by
C4[ 360, 145 ]
= SDD(DW( 30, 3))
4-fold covered by
C4[ 360, 153 ]
= XI(Rmap(180,165){12,30|4}_15)
4-fold covered by
C4[ 360, 171 ]
= PL(CS(DW( 15, 3)[ 6^ 15], 1))
5-fold covered by
C4[ 450, 3 ]
= DW(150, 3)
5-fold covered by
C4[ 450, 8 ]
= PS( 30, 15; 4)
BGCG dissections of this graph
Base Graph:
C4[ 45, 2 ]
= DW( 15, 3)
connection graph: [K_1]
Graphs which have this one as the base graph in a BGCG dissection:
C4[ 180, 4 ]
= DW( 60, 3)
with connection graph [K_1]
C4[ 180, 7 ]
= {4, 4}_[ 15, 6]
with connection graph [K_1]
C4[ 360, 13 ]
= {4, 4}_[ 30, 6]
with connection graph [K_2]
C4[ 360, 18 ]
= PS( 30, 24; 5)
with connection graph [K_2]
C4[ 360, 46 ]
= PL(MC3( 6, 30, 1, 19, 11, 0, 1), [6^30, 10^18])
with connection graph [K_2]
C4[ 360, 58 ]
= PL(WH_ 60( 15, 1, 31, 54), [4^45, 30^6])
with connection graph [K_2]
C4[ 360, 72 ]
= UG(ATD[360,36])
with connection graph [K_2]
C4[ 360, 73 ]
= UG(ATD[360,44])
with connection graph [K_2]
C4[ 360, 167 ]
= BGCG({4, 4}_ 6, 0, C_ 5, 1)
with connection graph [K_2]
Aut-Orbital graphs of this one:
C4[ 9, 1 ] = DW( 3, 3)
C4[ 15, 1 ] = C_ 15(1, 4)
C4[ 18, 2 ] = DW( 6, 3)
C4[ 30, 2 ] = C_ 30(1, 11)
C4[ 45, 2 ] = DW( 15, 3)
C4[ 90, 3 ] = DW( 30, 3)