Graphs
related to C4[ 52, 2 ] = {4,4}_6,4
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On this page are all graphs related to C4[ 52, 2 ].
Graphs which this one covers
4-fold cover of
C4[ 13, 1 ]
= C_ 13(1, 5)
2-fold cover of
C4[ 26, 2 ]
= C_ 26(1, 5)
Graphs which cover this one
2-fold covered by
C4[ 104, 4 ]
= {4, 4}_ 10, 2
2-fold covered by
C4[ 104, 5 ]
= PS( 8, 13; 5)
2-fold covered by
C4[ 104, 6 ]
= MPS( 4, 52; 5)
3-fold covered by
C4[ 156, 7 ]
= PS( 12, 13; 5)
3-fold covered by
C4[ 156, 10 ]
= PS( 4, 39; 5)
4-fold covered by
C4[ 208, 4 ]
= {4, 4}_ 12, 8
4-fold covered by
C4[ 208, 7 ]
= PS( 16, 13; 5)
4-fold covered by
C4[ 208, 8 ]
= PS( 8, 52; 5)
4-fold covered by
C4[ 208, 9 ]
= MPS( 8, 52; 5)
4-fold covered by
C4[ 208, 10 ]
= PS( 4,104; 5)
4-fold covered by
C4[ 208, 11 ]
= MPS( 4,104; 5)
4-fold covered by
C4[ 208, 17 ]
= KE_52(1,11,2,43,1)
5-fold covered by
C4[ 260, 4 ]
= {4, 4}_ 14, 8
5-fold covered by
C4[ 260, 5 ]
= {4, 4}_ 16, 2
5-fold covered by
C4[ 260, 8 ]
= PS( 20, 13; 5)
5-fold covered by
C4[ 260, 10 ]
= PS( 4, 65; 21)
5-fold covered by
C4[ 260, 17 ]
= SS[260, 1]
6-fold covered by
C4[ 312, 13 ]
= PS( 24, 13; 5)
6-fold covered by
C4[ 312, 15 ]
= PS( 12, 52; 5)
6-fold covered by
C4[ 312, 18 ]
= MPS( 12, 52; 5)
6-fold covered by
C4[ 312, 20 ]
= PS( 8, 39; 5)
6-fold covered by
C4[ 312, 25 ]
= PS( 4,156; 5)
6-fold covered by
C4[ 312, 26 ]
= MPS( 4,156; 5)
7-fold covered by
C4[ 364, 5 ]
= PS( 28, 13; 5)
7-fold covered by
C4[ 364, 6 ]
= PS( 4, 91; 8)
8-fold covered by
C4[ 416, 4 ]
= {4, 4}_ 20, 4
8-fold covered by
C4[ 416, 11 ]
= PS( 32, 13; 5)
8-fold covered by
C4[ 416, 12 ]
= PS( 16, 52; 5)
8-fold covered by
C4[ 416, 13 ]
= MPS( 16, 52; 5)
8-fold covered by
C4[ 416, 14 ]
= PS( 8,104; 5)
8-fold covered by
C4[ 416, 16 ]
= MPS( 8,104; 5)
8-fold covered by
C4[ 416, 17 ]
= PS( 4,208; 5)
8-fold covered by
C4[ 416, 18 ]
= PS( 4,208; 31)
8-fold covered by
C4[ 416, 19 ]
= MPS( 4,208; 5)
8-fold covered by
C4[ 416, 20 ]
= MPS( 4,208; 31)
8-fold covered by
C4[ 416, 29 ]
= MSY( 4,104, 53, 20)
8-fold covered by
C4[ 416, 30 ]
= MSZ ( 52, 8, 5, 3)
8-fold covered by
C4[ 416, 42 ]
= UG(ATD[416,9])
8-fold covered by
C4[ 416, 43 ]
= UG(ATD[416,15])
8-fold covered by
C4[ 416, 45 ]
= UG(ATD[416,47])
8-fold covered by
C4[ 416, 46 ]
= UG(ATD[416,52])
8-fold covered by
C4[ 416, 47 ]
= UG(ATD[416,56])
8-fold covered by
C4[ 416, 59 ]
= SS[416, 3]
8-fold covered by
C4[ 416, 60 ]
= SS[416, 4]
9-fold covered by
C4[ 468, 5 ]
= {4, 4}_ 18, 12
9-fold covered by
C4[ 468, 11 ]
= PS( 36, 13; 5)
9-fold covered by
C4[ 468, 16 ]
= PS( 12, 39; 5)
9-fold covered by
C4[ 468, 25 ]
= PS( 4,117; 8)
9-fold covered by
C4[ 468, 28 ]
= MSZ ( 12, 39, 5, 5)
BGCG dissections of this graph
Base Graph:
C4[ 13, 1 ]
= C_ 13(1, 5)
connection graph: [K_2]
Graphs which have this one as the base graph in a BGCG dissection:
C4[ 104, 9 ]
= PL(MC3( 4, 13, 1, 12, 5, 0, 1), [4^13, 26^2])
with connection graph [K_1]
C4[ 104, 10 ]
= PL(Br( 4, 13; 5))
with connection graph [K_1]
C4[ 208, 4 ]
= {4, 4}_ 12, 8
with connection graph [K_2]
C4[ 208, 15 ]
= PL(MC3( 4, 26, 1, 25, 5, 0, 1), [4^26, 26^4])
with connection graph [K_2]
C4[ 208, 17 ]
= KE_52(1,11,2,43,1)
with connection graph [K_2]
C4[ 312, 48 ]
= UG(ATD[312,38])
with connection graph [C_3]
C4[ 312, 52 ]
= SS[312, 1]
with connection graph [C_3]
C4[ 416, 30 ]
= MSZ ( 52, 8, 5, 3)
with connection graph [C_4]
C4[ 416, 32 ]
= PL(MC3( 4, 52, 1, 25, 31, 26, 1), [8^26, 26^8])
with connection graph [C_4]
C4[ 416, 45 ]
= UG(ATD[416,47])
with connection graph [C_4]
C4[ 416, 48 ]
= PL(ATD[8,2]#ATD[26,1])
with connection graph [C_4]
C4[ 416, 59 ]
= SS[416, 3]
with connection graph [C_4]
C4[ 416, 60 ]
= SS[416, 4]
with connection graph [C_4]
Aut-Orbital graphs of this one:
C4[ 13, 1 ] = C_ 13(1, 5)
C4[ 26, 2 ] = C_ 26(1, 5)
C4[ 52, 2 ] = {4, 4}_ 6, 4