Right Bol Loop 16.7.2.339 of order 16

0	1	2	3	4	5	6	7	8	9	10	11	12	13	14	15
1	2	3	0	5	4	7	6	9	8	11	10	13	15	12	14
2	3	0	1	7	6	5	4	11	10	9	8	15	14	13	12
3	0	1	2	6	7	4	5	10	11	8	9	14	12	15	13
4	6	7	5	2	1	3	0	12	13	14	15	8	9	10	11
5	4	6	7	3	0	2	1	13	12	15	14	9	11	8	10
6	7	5	4	1	2	0	3	14	15	12	13	10	8	11	9
7	5	4	6	0	3	1	2	15	14	13	12	11	10	9	8
8	10	11	9	12	14	13	15	2	3	1	0	4	6	5	7
9	8	10	11	13	15	12	14	3	2	0	1	5	4	7	6
10	11	9	8	14	12	15	13	1	0	2	3	6	7	4	5
11	9	8	10	15	13	14	12	0	1	3	2	7	5	6	4
12	13	15	14	11	10	9	8	7	6	5	4	0	3	1	2
13	15	14	12	10	11	8	9	6	7	4	5	1	0	2	3
14	12	13	15	9	8	11	10	5	4	7	6	3	2	0	1
15	14	12	13	8	9	10	11	4	5	6	7	2	1	3	0

Centre: 0 2

Centrum: 0 2

Nucleus: 0 2

Left Nucleus: 0 2

Middle Nucleus: 0 2

Right Nucleus: 0 2

Comm(L): This graph has as its 7 vertices the nontrivial cosets of the centre. Edges represent non-commuting cosets. Here we print (in reverse video) the complementary graph, in which edges represent commuting cosets.

1 Element of order 1: 0

7 Elements of order 2: 2 5 6 12 13 14 15

8 Elements of order 4: 1 3 4 7 8 9 10 11

Commutator Subloop: 0 2

Associator Subloop: 0 2

2 Conjugacy Classes of size 1:

7 Conjugacy Classes of size 2:

1 3
4 7
5 6
8 11
9 10
12 15
13 14

Automorphic Inverse Property: FAILS. (1^-1)(9^-1) neq (1*9)^-1

A_l Property: FAILS. The left inner mapping L_1,8 = (8,11)(9,10) is not an automorphism. L_1,8(4*8) neq L_1,8(4)*L_1,8(8)

A_r Property: HOLDS (i.e. every right inner mapping R_a,b is an automorphism)

Right (Left, Full) Mult Group Orders: 128 (1024, 2048)

/ revised October, 2001

0	1	2	3	4	5	6	7	8	9	10	11	12	13	14	15
1	2	3	0	5	4	7	6	9	8	11	10	13	15	12	14
2	3	0	1	7	6	5	4	11	10	9	8	15	14	13	12
3	0	1	2	6	7	4	5	10	11	8	9	14	12	15	13
4	6	7	5	2	1	3	0	12	13	14	15	8	9	10	11
5	4	6	7	3	0	2	1	13	12	15	14	9	11	8	10
6	7	5	4	1	2	0	3	14	15	12	13	10	8	11	9
7	5	4	6	0	3	1	2	15	14	13	12	11	10	9	8
8	10	11	9	12	14	13	15	2	3	1	0	4	6	5	7
9	8	10	11	13	15	12	14	3	2	0	1	5	4	7	6
10	11	9	8	14	12	15	13	1	0	2	3	6	7	4	5
11	9	8	10	15	13	14	12	0	1	3	2	7	5	6	4
12	13	15	14	11	10	9	8	7	6	5	4	0	3	1	2
13	15	14	12	10	11	8	9	6	7	4	5	1	0	2	3
14	12	13	15	9	8	11	10	5	4	7	6	3	2	0	1
15	14	12	13	8	9	10	11	4	5	6	7	2	1	3	0

0	1	2	3	4	5	6	7	8	9	10	11	12	13	14	15
1	2	3	0	5	4	7	6	9	8	11	10	13	15	12	14
2	3	0	1	7	6	5	4	11	10	9	8	15	14	13	12
3	0	1	2	6	7	4	5	10	11	8	9	14	12	15	13
4	6	7	5	2	1	3	0	12	13	14	15	8	9	10	11
5	4	6	7	3	0	2	1	13	12	15	14	9	11	8	10
6	7	5	4	1	2	0	3	14	15	12	13	10	8	11	9
7	5	4	6	0	3	1	2	15	14	13	12	11	10	9	8
8	10	11	9	12	14	13	15	2	3	1	0	4	6	5	7
9	8	10	11	13	15	12	14	3	2	0	1	5	4	7	6
10	11	9	8	14	12	15	13	1	0	2	3	6	7	4	5
11	9	8	10	15	13	14	12	0	1	3	2	7	5	6	4
12	13	15	14	11	10	9	8	7	6	5	4	0	3	1	2
13	15	14	12	10	11	8	9	6	7	4	5	1	0	2	3
14	12	13	15	9	8	11	10	5	4	7	6	3	2	0	1
15	14	12	13	8	9	10	11	4	5	6	7	2	1	3	0

0	1	2	3	4	5	6	7	8	9	10	11	12	13	14	15
1	2	3	0	5	4	7	6	9	8	11	10	13	15	12	14
2	3	0	1	7	6	5	4	11	10	9	8	15	14	13	12
3	0	1	2	6	7	4	5	10	11	8	9	14	12	15	13
4	6	7	5	2	1	3	0	12	13	14	15	8	9	10	11
5	4	6	7	3	0	2	1	13	12	15	14	9	11	8	10
6	7	5	4	1	2	0	3	14	15	12	13	10	8	11	9
7	5	4	6	0	3	1	2	15	14	13	12	11	10	9	8
8	10	11	9	12	14	13	15	2	3	1	0	4	6	5	7
9	8	10	11	13	15	12	14	3	2	0	1	5	4	7	6
10	11	9	8	14	12	15	13	1	0	2	3	6	7	4	5
11	9	8	10	15	13	14	12	0	1	3	2	7	5	6	4
12	13	15	14	11	10	9	8	7	6	5	4	0	3	1	2
13	15	14	12	10	11	8	9	6	7	4	5	1	0	2	3
14	12	13	15	9	8	11	10	5	4	7	6	3	2	0	1
15	14	12	13	8	9	10	11	4	5	6	7	2	1	3	0