[Home] [Table] [Glossary] [Families]

On this page are all graphs related to C4[ 144, 5 ].

Graphs which this one covers

     18-fold cover of C4[ 8, 1 ] = K_4,4

     16-fold cover of C4[ 9, 1 ] = DW( 3, 3)

     9-fold cover of C4[ 16, 2 ] = {4, 4}_ 4, 0

     8-fold cover of C4[ 18, 2 ] = DW( 6, 3)

     4-fold cover of C4[ 36, 3 ] = {4, 4}_ 6, 0

     2-fold cover of C4[ 72, 5 ] = {4, 4}_ 6, 6

Graphs which cover this one

     2-fold covered by C4[ 288, 5 ] = {4, 4}_ 12, 12

     2-fold covered by C4[ 288, 40 ] = MSY( 12, 24, 13, 12)

     2-fold covered by C4[ 288, 58 ] = CPM( 12, 2, 4, 1)

     2-fold covered by C4[ 288, 85 ] = UG(ATD[288,62])

     2-fold covered by C4[ 288, 89 ] = UG(ATD[288,75])

     3-fold covered by C4[ 432, 8 ] = {4, 4}_< 24, 12>

     3-fold covered by C4[ 432, 23 ] = MPS( 12, 72; 11)

     3-fold covered by C4[ 432, 47 ] = CPM( 12, 2, 3, 1)

     3-fold covered by C4[ 432, 101 ] = UG(ATD[432,142])

     3-fold covered by C4[ 432, 137 ] = UG(ATD[432,235])

     3-fold covered by C4[ 432, 138 ] = UG(ATD[432,238])

BGCG dissections of this graph

     Base Graph: C4[ 36, 3 ] = {4, 4}_ 6, 0   connection graph:  [K_2]

     Base Graph: C4[ 72, 5 ] = {4, 4}_ 6, 6   connection graph:  [K_1]

Graphs which have this one as the base graph in a BGCG dissection:

      C4[ 288, 5 ] = {4, 4}_ 12, 12    with connection graph  [K_1]

      C4[ 288, 40 ] = MSY( 12, 24, 13, 12)    with connection graph  [K_1]

      C4[ 288, 80 ] = UG(ATD[288,46])    with connection graph  [K_1]

      C4[ 288, 88 ] = UG(ATD[288,72])    with connection graph  [K_1]

      C4[ 288, 208 ] = BGCG({4, 4}_ 6, 6; K2;{2, 5})    with connection graph  [K_1]

      C4[ 288, 209 ] = BGCG({4, 4}_ 6, 6; K2;{13, 16})    with connection graph  [K_1]

      C4[ 288, 220 ] = BGCG({4, 4}_ 12, 0; K1;{2, 10})    with connection graph  [K_1]

      C4[ 288, 221 ] = BGCG({4, 4}_ 12, 0; K1;{9, 13})    with connection graph  [K_1]

      C4[ 288, 222 ] = BGCG({4, 4}_ 12, 0; K1;{17, 24})    with connection graph  [K_1]

      C4[ 288, 223 ] = BGCG({4, 4}_ 12, 0; K1;{23, 26})    with connection graph  [K_1]

Aut-Orbital graphs of this one:

      C4[ 8, 1 ] = K_4,4

      C4[ 9, 1 ] = DW( 3, 3)

      C4[ 16, 2 ] = {4, 4}_ 4, 0

      C4[ 18, 2 ] = DW( 6, 3)

      C4[ 36, 3 ] = {4, 4}_ 6, 0

      C4[ 72, 5 ] = {4, 4}_ 6, 6

      C4[ 144, 5 ] = {4, 4}_ 12, 0