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On this page are computer-accessible forms for the graph C4[ 34, 2 ] =
C_34(1,13).
(I) Following is a form readable by MAGMA:
g:=Graph<34|{ {2, 3}, {32, 33}, {30, 31}, {28, 29}, {26, 27}, {24, 25}, {22,
23}, {20, 21}, {18, 19}, {10, 11}, {8, 9}, {6, 7}, {4, 5}, {12, 13}, {14, 15},
{16, 17}, {1, 2}, {33, 34}, {29, 30}, {25, 26}, {21, 22}, {17, 18}, {9, 10}, {5,
6}, {13, 14}, {3, 4}, {27, 28}, {19, 20}, {11, 12}, {2, 15}, {18, 31}, {16, 29},
{1, 14}, {23, 24}, {17, 30}, {7, 8}, {3, 16}, {7, 20}, {11, 24}, {15, 28}, {2,
23}, {8, 29}, {6, 19}, {4, 17}, {10, 31}, {12, 25}, {14, 27}, {1, 22}, {9, 30},
{5, 18}, {13, 26}, {3, 24}, {7, 28}, {4, 25}, {8, 21}, {6, 27}, {10, 23}, {5,
26}, {9, 22}, {15, 16}, {1, 34}, {11, 32}, {12, 33}, {13, 34}, {19, 32}, {20,
33}, {21, 34}, {31, 32} }>;
(II) A more general form is to represent the graph as the orbit of {2, 3}
under the group generated by the following permutations:
a: (1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20, 21,
22, 23, 24, 25, 26, 27, 28, 29, 30, 31, 32, 33, 34) (III) Last is Groups&Graphs. Copy everything between (not including)
the lines of asterisks into a plain text file and save it as "graph.txt". Then
launch G&G (Groups&Graphs) and select Read Text from the File menu.
**************
&Graph **************
b: (2, 14, 34, 22)(3, 27, 33, 9)(4, 6, 32, 30)(5, 19, 31, 17)(7, 11, 29, 25)(8,
24, 28, 12)(10, 16, 26, 20)(13, 21, 23, 15)
C4[ 34, 2 ]
34
-1 22 34 2 14
-2 1 23 3 15
-3 2 24 4 16
-4 3 25 5 17
-5 4 26 6 18
-6 5 27 7 19
-7 6 28 8 20
-8 7 29 9 21
-9 22 8 30 10
-10 11 23 9 31
-11 12 24 10 32
-12 11 33 13 25
-13 12 34 14 26
-14 1 13 15 27
-15 2 14 16 28
-16 3 15 17 29
-17 4 16 18 30
-18 5 17 19 31
-19 6 18 20 32
-20 33 7 19 21
-21 22 34 8 20
-22 1 23 9 21
-23 22 2 24 10
-24 11 23 3 25
-25 12 24 4 26
-26 13 25 5 27
-27 14 26 6 28
-28 15 27 7 29
-29 16 28 8 30
-30 17 29 9 31
-31 18 30 10 32
-32 11 33 19 31
-33 12 34 20 32
-34 33 1 13 21
0