C4[ 72, 1 ] related

Graphs related to C4[ 72, 1 ] = W(36,2)

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On this page are all graphs related to C4[ 72, 1 ].

Graphs which cover this one

2-fold covered by C4[ 144, 8 ] = {4, 4}_[ 18, 4]

2-fold covered by C4[ 144, 9 ] = {4, 4}_< 20, 16>

2-fold covered by C4[ 144, 14 ] = MPS( 4, 72; 17)

2-fold covered by C4[ 144, 51 ] = SDD(W( 18, 2))

3-fold covered by C4[ 216, 7 ] = {4, 4}_[ 18, 6]

3-fold covered by C4[ 216, 8 ] = {4, 4}_< 21, 15>

4-fold covered by C4[ 288, 7 ] = {4, 4}_[ 18, 8]

4-fold covered by C4[ 288, 8 ] = {4, 4}_< 22, 14>

4-fold covered by C4[ 288, 11 ] = {4, 4}_[ 36, 4]

4-fold covered by C4[ 288, 12 ] = {4, 4}_< 38, 34>

4-fold covered by C4[ 288, 13 ] = PS( 36, 16; 3)

4-fold covered by C4[ 288, 14 ] = MPS( 36, 16; 3)

4-fold covered by C4[ 288, 21 ] = PS( 8, 72; 17)

4-fold covered by C4[ 288, 25 ] = R_144(110, 37)

4-fold covered by C4[ 288, 26 ] = PX( 36, 3)

4-fold covered by C4[ 288, 29 ] = PL(MSY( 4, 36, 17, 0))

4-fold covered by C4[ 288, 30 ] = PL(MSY( 4, 36, 17, 18))

4-fold covered by C4[ 288, 38 ] = PL(MSY( 18, 8, 3, 0))

4-fold covered by C4[ 288, 39 ] = MSY( 4, 72, 37, 4)

4-fold covered by C4[ 288, 45 ] = PL(MC3( 6, 24, 1, 13, 7, 4, 1), [4^36, 36^4])

4-fold covered by C4[ 288, 46 ] = PL(MC3( 6, 24, 1, 13, 7, 16, 1), [4^36, 18^8])

4-fold covered by C4[ 288, 54 ] = PL(KE_36(9,1,18,35,9),[4^36,72^2])

4-fold covered by C4[ 288, 56 ] = PL(Curtain_36(1,18,2,19,20),[4^36,8^18])

4-fold covered by C4[ 288, 111 ] = UG(ATD[288,184])

4-fold covered by C4[ 288, 114 ] = UG(ATD[288,200])

4-fold covered by C4[ 288, 116 ] = UG(ATD[288,206])

4-fold covered by C4[ 288, 159 ] = SDD(R_ 36( 20, 19))

4-fold covered by C4[ 288, 164 ] = SDD(C_ 72(1, 17))

4-fold covered by C4[ 288, 174 ] = PL(CS(W( 18, 2)[ 18^ 4], 0))

4-fold covered by C4[ 288, 175 ] = PL(CS(W( 18, 2)[ 18^ 4], 1))

4-fold covered by C4[ 288, 207 ] = SDD(C_ 72(1, 19))

4-fold covered by C4[ 288, 263 ] = SS[288, 27]

4-fold covered by C4[ 288, 264 ] = SS[288, 28]

5-fold covered by C4[ 360, 6 ] = C_360(1,109)

5-fold covered by C4[ 360, 11 ] = {4, 4}_[ 18, 10]

5-fold covered by C4[ 360, 16 ] = PS( 36, 20; 3)

5-fold covered by C4[ 360, 17 ] = MPS( 36, 20; 3)

5-fold covered by C4[ 360, 31 ] = PS( 4,180; 17)

5-fold covered by C4[ 360, 45 ] = PL(MC3( 4, 45, 1, 19, 28, 25, 1), [10^18, 36^5])

5-fold covered by C4[ 360, 62 ] = PL(Br( 18, 10; 3))

6-fold covered by C4[ 432, 5 ] = {4, 4}_[ 18, 12]

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

6-fold covered by C4[ 432, 9 ] = {4, 4}_[ 36, 6]

6-fold covered by C4[ 432, 11 ] = {4, 4}_[ 54, 4]

6-fold covered by C4[ 432, 12 ] = {4, 4}_< 56, 52>

6-fold covered by C4[ 432, 14 ] = PS( 36, 24; 5)

6-fold covered by C4[ 432, 15 ] = MPS( 36, 24; 5)

6-fold covered by C4[ 432, 24 ] = MPS( 12, 72; 17)

6-fold covered by C4[ 432, 34 ] = PL(MSY( 6, 36, 17, 0))

6-fold covered by C4[ 432, 35 ] = PL(MSY( 6, 36, 17, 18))

6-fold covered by C4[ 432, 36 ] = PL(MSY( 18, 12, 5, 0))

6-fold covered by C4[ 432, 38 ] = PL(MC3( 6, 36, 1, 19, 17, 0, 1), [4^54, 6^36])

6-fold covered by C4[ 432, 39 ] = PL(MC3( 6, 36, 1, 19, 17, 18, 1), [4^54, 12^18])

6-fold covered by C4[ 432, 40 ] = PL(MC3( 6, 36, 1, 17, 19, 0, 1), [6^36, 18^12])

6-fold covered by C4[ 432, 111 ] = UG(ATD[432,163])

6-fold covered by C4[ 432, 142 ] = UG(ATD[432,301])

6-fold covered by C4[ 432, 186 ] = SDD(DW( 36, 3))

6-fold covered by C4[ 432, 191 ] = SDD({4, 4}_< 12, 6>)

6-fold covered by C4[ 432, 192 ] = SDD({4, 4}_[ 9, 6])

6-fold covered by C4[ 432, 201 ] = PL(CSI(W( 18, 2)[ 18^ 4], 3))

7-fold covered by C4[ 504, 6 ] = C_504(1,181)

7-fold covered by C4[ 504, 9 ] = {4, 4}_[ 18, 14]

7-fold covered by C4[ 504, 17 ] = PS( 36, 28; 3)

7-fold covered by C4[ 504, 18 ] = MPS( 36, 28; 3)

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

C4[ 288, 11 ] = {4, 4}_[ 36, 4] with connection graph [K_2]

C4[ 288, 12 ] = {4, 4}_< 38, 34> with connection graph [K_2]

C4[ 288, 29 ] = PL(MSY( 4, 36, 17, 0)) with connection graph [K_2]

C4[ 288, 39 ] = MSY( 4, 72, 37, 4) with connection graph [K_2]

C4[ 288, 45 ] = PL(MC3( 6, 24, 1, 13, 7, 4, 1), [4^36, 36^4]) with connection graph [K_2]

C4[ 288, 46 ] = PL(MC3( 6, 24, 1, 13, 7, 16, 1), [4^36, 18^8]) with connection graph [K_2]

C4[ 288, 111 ] = UG(ATD[288,184]) with connection graph [K_2]

Aut-Orbital graphs of this one:

C4[ 6, 1 ] = Octahedron

C4[ 8, 1 ] = K_4,4

C4[ 12, 1 ] = W( 6, 2)

C4[ 18, 1 ] = W( 9, 2)

C4[ 24, 1 ] = W( 12, 2)

C4[ 36, 1 ] = W( 18, 2)

C4[ 72, 1 ] = W( 36, 2)