v | name | DSname | manifold | etc |
generator | reducible | Matveev | data |
empty | |
# 1 (empty) |
| K-1 | $\Sigma(1,0)$ | $S^3$ | |
T-1 | | | |
| K-2 | $\Sigma(2,1)$ | $P^3$ | |
T-2 | | | |
0 | |
# 1 ($S^1$) |
| K0-1 |
$\Sigma(0,1)$ |
$S^2\times S^1$ | | 2T0 | | | |
| K0-2 |
$\Sigma(3,1)$ | $L(3,1)$ | | 2T0 | |
| |
1 | |
#(1,1),(1,1)# 1
|
| ik(1-1) |
awabi | $S^3$ | | #1_2 |
$I$ >$\Sigma(1,0)$ | |
*1 * 1 2 2 1 -2
|
| K1-1
ik(1-2) |
$\Sigma(4,1)$ | $L(4,1)$ | $A,C$ | #1_2 | | |
*1 -2 * 1 2 2 1
|
| K1-2
ik(1-3) |
$\Sigma(5,2)$ | $L(5,2)$ | $B$ | #1_2 | | |
* 1 1 2 * 1 -2 -2
|
| G1-1 | | $P^3$ | | | > $\Sigma(2,1)$ | |
|
| G1-2 | | $L(3,1)$ | | | > $\Sigma(3,1)$ | |
|
| G1-3 | |
$P^2\times S^1$ | | | | |
|
2 | | | | | | | |
#(1,1),(1,2),(1,2),(2,2)# 1
|
| K2-1 ik(2-12) |
$\Sigma(5,1)$ | $L(5,1)$ | $A,E_1$ | #1^2_2 | | |
* 1 2 -3 * 2 4 -3 * 1 1 3 4 4 -2
|
| K2-2 ik(2-9) |
$\Sigma(7,2)$ | $L(7,2)$ | $B,D_1,E_2$ | #1^2_2 | | |
* 1 2 -3 * 2 4 4 -3 * 1 1 3 4 -2
|
| K2-3 ik(2-11) |
$\Sigma(8,3)$ | $L(8,3)$ | $C,D_2$ | #1^2_2 | | |
* 1 1 3 -2 * 1 2 4 -3 * 2 -4 -4 -3
|
| ik(2-1) |
| $S^3$ | | #1^2_2 |
$I$> awabi | |
* 1 * 4 * 1 2 -3 1 3 4 -3 2 4 -2
|
| ik(2-7) |
| $S^3$ | | not-g |
$I$> awabi | |
* 1 * 4 * 1 2 -3 -1 3 4 -3 2 4 -2
|
| ik(2-8) |
| $L(3,1)$ | | #1^2_2 | 2 > $\Sigma(3,1)$ | |
* 1 * 2 -3 * 1 2 4 -3 1 3 4 4 -2
|
| ik(2-3) |
| $L(2,1)$ | | #1^2_2 |
$H$ > $\Sigma(2,1)$ $I$ > G1-1 | |
* 1 * 2 4 -3 * 1 2 -3 1 3 4 4 -2
|
| ik(2-2) |
| $S^3$ | | #1^2_2 |
$I$> awabi | |
* 1 * 2 4 4 -3 * 1 2 -3 1 3 4 -2
|
| ik(2-6) |
| $S^2\times S^1$ | | #1^2_2 | 2 > $\Sigma(0,1)$ | |
* 2 -3 * 1 2 4 -3 * 1 1 3 4 4 -2
|
| ik(2-4) |
| $L(3,1)$ | | #1^2_2 | 2 > $\Sigma(3,1)$ | |
* 2 -3 * 1 1 2 4 -3 * 1 3 4 4 -2
|
| G2-1 | |
$S^2\times S^1$ | | | > $\Sigma(0,1)$ | |
|
| G2-2 | |
$P^3$ | | | > $\Sigma(2,1)$ | |
|
| G2-3 | |
$L(3,1)$ | | |
$H$ > $\Sigma(3,1)$
$I$ > awabi$\sharp\Sigma(3,1)$ | |
|
| |
#(1,2),(1,2),(1,2),(1,2)# 2
|
| K2-4 ik(2-10) |
$\Sigma(Q_8)$ | $S^3/Q_8$ |
$S^2(-1;(2,1),(2,1),(2,1))$ |
T2 | | |
* 1 -2 3 -4 * 1 -3 4 -2 * 1 -4 2 -3
|
| ik(2-5) |
| $S^2\times_\tau S^1$ | non-ori | |
2 > | |
* 2 -3 * 1 -2 4 -3 * 1 -3 4 -1 2 -4
|
3 | |
#(1,1),(1,2),(1,2),(2,3),(2,3),(3,3)# 1
|
| K3-1 (3-32) |
$\Sigma(6,1)$ | $L(6,1)$ | $A,F_1$ | #1^3_2 | | |
* 1 2 -3 * 4 6 -5 * 2 4 -5 -3 * 1 1 3 4 -6 -6 -5 -2
|
| K3-2 (3-33) |
$\Sigma(10,3)$ | $L(10,3)$ | $D_1$ | #1^3_2 | | |
* 1 2 -3 * 4 6 -5 * 1 1 3 4 -5 -2 * 2 4 -6 -6 -5 -3
|
| K3-3 (3-34) |
$\Sigma(9,2)$ | $L(9,2)$ | $B,F_2$ | #1^3_2 | | |
* 1 2 -3 * 2 4 -5 -3 * 4 6 6 -5 * 1 1 3 4 -6 -5 -2
|
| K3-4 (3-35) |
$\Sigma(11,3)$ | $L(11,3)$ | $D_2$ | #1^3_2 | | |
* 1 2 -3 * 4 6 6 -5 * 2 4 -6 -5 -3 * 1 1 3 4 -5 -2
|
| K3-5 (3-36) |
$\Sigma(12,5)$ | $L(12,5)$ | $C,F_3$ | #1^3_2 | | |
* 1 1 2 -3 * 2 4 -5 -3 * 4 6 6 -5 * 1 3 4 -6 -5 -2
|
| K3-6 (3-37) |
$\Sigma(13,5)$ | $L(13,5)$ | $E_2$ | #1^3_2 | | |
* 1 1 2 -3 * 4 6 6 -5 * 1 3 4 -5 -2 * 2 4 -6 -5 -3
|
| 3-12 |
| $S^3$ | | |
| |
* 1 * 6 * 1 2 4 -5 -2 * 1 3 -2 3 5 6 -5 4 -6 -4 -3
|
| is(1-1) (3-13) |
| $S^3$ | | |
I > ik(2-1) | |
* 1 * 6 * 1 2 -3 1 3 4 -5 -2 * 2 4 6 -4 5 6 -5 -3
|
| is(1-2) (3-14) |
| $S^3$ | | |
2 > awabi | |
* 1 * 2 -3 * 4 -5 * 1 2 4 6 -5 -3 1 3 4 -6 -6 -5 -2
|
| is(1-3) (3-30) |
| $S^3$ | | |
2 > awabi | |
* 2 -3 * 4 6 6 -5 * 1 2 4 -5 -3 * 1 1 3 4 -6 -5 -2
|
| is(1-4) (3-14) |
| $S^3$ | | |
2 > awabi | |
* 1 * 2 -3 * 4 -5 * 1 2 4 6 -5 -3 1 3 4 -6 -6 -5 -2
|
| is(1-5) (3-8) |
| $S^3$ | | |
2 > awabi | |
* 1 * 6 * 2 -3 * 1 2 4 -5 -3 1 3 4 6 -4 5 6 -5 -2
|
| is(1-6) (3-8) |
| $S^3$ | | |
2 > awabi | |
* 1 * 6 * 2 -3 * 1 2 4 -5 -3 1 3 4 6 -4 5 6 -5 -2
|
| is(1-7) (3-23) |
| $S^3$ | | |
$I$ > ik(2-2) | |
* 1 * 4 6 -5 * 2 4 -6 -6 -5 -3 * 1 2 -3 1 3 4 -5 -2
|
| is(1-8) (3-20) |
| $S^3$ | | |
2 > awabi | |
* 1 * 4 -5 * 2 4 6 6 -5 -3 * 1 2 -3 1 3 4 -6 -5 -2
|
| 3-9 |
| $S^3$ | | |
2 > awabi | |
* 1 * 6 * 2 -3 * 1 2 4 -5 4 6 -4 -3 -1 3 5 6 -5 -2
|
| 3-17 |
| $S^3$ | | |
2 > awabi | |
* 1 * 2 -3 * 1 2 4 -5 -2 * 1 3 4 6 -5 4 -6 -6 -5 -3
|
| 3-28 |
| $S^3$ | | |
2 > awabi | |
* 2 -3 * 4 -5 * 1 1 2 4 6 -5 -3 * 1 3 4 -6 -6 -5 -2
|
| is(2-1) (3-18) |
| $P^3$ | | |
2 > G1-1 | |
* 1 * 4 -5 * 2 4 6 -5 -3 * 1 2 -3 1 3 4 -6 -6 -5 -2
|
| is(2-2) (3-25) |
| $P^3$ | | |
$H$ > $P^3$
$I$ > ik(2-3) | |
* 1 * 4 6 6 -5 * 2 4 -6 -5 -3 * 1 2 -3 1 3 4 -5 -2
|
| is(3-1) (3-22) |
| $L(3,1)$ | | |
$H$ > $\Sigma(3,1)$
$I$ > ik(2-8) | |
* 1 * 4 6 -5 * 2 4 -5 -3 * 1 2 -3 1 3 4 -6 -6 -5 -2
|
| is(3-2) (3-24) |
| $L(3,1)$ | | |
$H$ > $\Sigma(3,1)$
$I$ > ik(2-8) | |
* 1 * 2 4 -5 -3 * 4 6 6 -5 * 1 2 -3 1 3 4 -6 -5 -2
|
| is(4-1) (3-31) |
| $L(4,1)$ | | |
2 > $\Sigma(4,1)$ | |
* 2 -3 * 4 6 6 -5 * 1 1 2 4 -5 -3 * 1 3 4 -6 -5 -2
|
| 3-15 |
| $L(4,1)$ | | |
2 > $\Sigma(4,1)$ | |
* 1 * 2 -3 * 4 6 -5 * 1 2 4 -5 -3 1 3 4 -6 -6 -5 -2
|
| 3-19 |
| $L(4,1)$ | | |
2 > $\Sigma(4,1)$ $H$ > $\Sigma(4,1)$ | |
* 1 * 2 -3 * 1 2 4 6 -5 -2 * 1 3 4 -5 4 -6 -6 -5 -3
|
| 3-26 |
| $L(4,1)$ | | |
2 > $\Sigma(4,1)$ | |
* 2 -3 * 4 -5 * 1 2 4 6 -5 -3 * 1 1 3 4 -6 -6 -5 -2
|
| is(5-1) (3-29) |
| $L(5,2)$ | | |
2 > $\Sigma(5,2)$ | |
* 2 -3 * 4 6 -5 * 1 1 2 4 -5 -3 * 1 3 4 -6 -6 -5 -2
|
| 3-16 |
| $L(5,2)$ | | |
2 > $\Sigma(5,2)$ $H$ > $\Sigma(5,2)$ | |
* 1 * 2 -3 * 4 6 6 -5 * 1 2 4 -5 -3 1 3 4 -6 -5 -2
|
| 3-21 |
| $L(5,2)$ | | |
2 > $\Sigma(5,2)$ $H$ > $\Sigma(5,2)$ | |
* 1 * 2 -3 * 1 2 4 6 6 -5 -2 * 1 3 4 -5 4 -6 -5 -3
|
| 3-27 |
| $L(5,2)$ | | |
2 > $\Sigma(5,2)$ | |
* 2 -3 * 4 -5 * 1 1 2 4 6 -5 -3 * 1 3 4 -6 -6 -5 -2
|
| is(0-1) (3-10) |
| $S^2\times S^1$ | | |
$H$ > $\Sigma$ $I$ >
G2-1 |
|
* 1 * 6 * 2 4 -5 -3 * 1 2 -3 1 3 4 6 -4 5 6 -5 -2
|
| 3-11 |
| $S^2\times_\tau S^1$ | non-ori | |
$H$ > $\Sigma(0,1)_\tau$ | |
* 1 * 6 * 2 4 -5 -3 * 1 2 -3 -1 3 4 6 -4 5 -6 -5 -2
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,3),(2,3)# 2
|
| K3-7 (3-62) |
$\Sigma(Q_{12})$ | $S^3/Q_{12}$ |
$S^2(-1;(2,1),(2,1),(3,1))$ |
T3-2 | | |
* 1 -2 3 -4 * 1 5 -6 -2 * 3 -6 5 -4 * 1 6 -4 2 5 -3
|
| (3-48) |
| $S^3$ | | |
2 > awabi | |
* 1 -2 * 3 -4 * 1 5 -3 * 1 6 -3 2 5 -6 -2 4 -6 5 -4
|
| is(1-15) (3-49) |
| $S^3$ | | |
2 > awabi | |
* 1 -2 * 3 -4 * 1 5 -3 * 1 6 -4 2 6 -3 2 5 -6 5 -4
|
| is(1-16) (3-53) |
| $S^3$ | | |
2 > awabi | |
* 1 -2 * 1 5 -3 * 1 6 -4 3 -4 * 2 5 -6 5 -4 2 6 -3
|
| is(1-17) (3-53) |
| $S^3$ | | |
2 > awabi | |
* 1 -2 * 1 5 -3 * 1 6 -4 3 -4 * 2 5 -6 5 -4 2 6 -3
|
| is(2-4) (3-52) |
| $P^3$ | | |
2 > G1-1 | |
* 1 -2 * 1 5 -3 * 1 6 -4 * 2 5 -6 5 -4 3 -4 2 6 -3
|
| (3-47) |
| $L(4,1)$ | | |
2 > $\Sigma(4,1)$ | |
* 1 -2 * 3 -4 * 5 -6 * 1 5 -3 1 6 -3 2 6 -4 2 5 -4
|
| is(4-2) (3-56) |
| $L(4,1)$ | | |
2 > $\Sigma(4,1)$ | |
* 1 -2 * 1 5 -3 4 -3 * 1 6 -5 6 -4 * 2 5 -4 2 6 -3
|
| (3-51) |
| $L(4,1)$ | | |
2 > $\Sigma(4,1)$ | |
* 1 -2 * 3 -4 * 1 5 -3 2 6 -4 * 1 6 -5 -2 4 -5 6 -3
|
| (3-50) |
| $L(5,2)$ | | |
2 > $\Sigma(5,2)$ | |
* 1 -2 * 3 -4 * 1 5 -6 5 -3 * 1 6 -4 2 6 -3 2 5 -4
|
| (3-57) |
| $L(5,1)$ | | |
3 > $\Sigma(5,1)$ | |
* 1 5 -3 * 1 6 -4 * 2 5 -4 * 1 -2 3 -4 3 -6 5 -6 -2
|
| (3-58) |
| $L(7,2)$ | | |
3 > $\Sigma(7,2)$ | |
* 1 5 -3 * 1 6 -4 * 1 -2 3 -6 -2 * 2 5 -6 5 -4 3 -4
|
| (3-60) |
| $L(8,3)$ | | |
3 > $\Sigma(8,3)$ | |
* 1 5 -3 * 1 -2 1 6 -4 * 2 5 -4 -3 -4 * 2 6 -5 6 -3
|
| (3-59) |
| $S^2\times_\tau S^1$ | | |
3 > ik(2-5) | |
* 1 5 -3 * 1 -2 3 -4 * 2 5 -6 5 -4 * 1 6 -4 3 -6 -2
|
| (3-54) |
| $P^2\times S^1$ | | |
2 > G1-3 | |
* 1 -2 * 3 -5 6 -4 * 1 5 -4 1 6 -3 * 2 5 -6 -2 4 -3
|
| (3-55) |
| $P^2\times S^1$ | | |
2 > G1-3 | |
* 1 -2 * 3 -5 6 -4 * 1 5 -4 2 6 -3 * 1 6 -5 -2 3 -4
|
| is(s-1) (3-61) |
| | | |
3 > $\Sigma(Q_8)$ | |
* 1 5 -3 * 1 -2 1 6 -4 * 2 5 -6 5 -4 * 2 6 -3 4 -3
|
| |
#(1,1),(1,2),(1,3),(2,3),(2,3),(2,3)# 3
|
| is(1-10) (3-39) |
| $S^3$ | | |
2 > awabi | |
* 1 * 4 -5 * 1 2 4 -6 -2 * 1 3 -4 6 -3 2 5 -6 5 -3
|
| is(1-13) (3-39) |
| $S^3$ | | |
2 > awabi | |
* 1 * 4 -5 * 1 2 4 -6 -2 * 1 3 -4 6 -3 2 5 -6 5 -3
|
| is(1-11) (3-40) |
| $S^3$ | | |
2 > awabi | |
* 1 * 4 -5 * 1 2 4 -6 -2 * 1 3 -5 6 -5 -2 3 -4 6 -3
|
| is(1-14) (3-40) |
| $S^3$ | | |
2 > awabi | |
* 1 * 4 -5 * 1 2 4 -6 -2 * 1 3 -5 6 -5 -2 3 -4 6 -3
|
| is(1-12) (3-46) |
| $S^3$ | | |
$I$ > ik(2-7) | |
* 1 * 1 2 4 -5 -2 * 1 3 -5 6 -3 * 2 6 -4 5 -6 4 -3
|
| 3-41 |
| $P^3$ | | |
2 > G1-1 | |
* 1 * 4 -5 * 2 4 -6 5 -3 * 1 2 5 -6 4 -3 -1 3 -6 -2
|
| is(2-3) (3-45) |
| $P^3$ | | |
$I$ > G2-2 | |
* 1 * 4 -5 4 -6 * 1 2 5 -6 -2 * 1 3 -4 -2 3 -5 6 -3
|
| is(2-5) (3-45) |
| $P^3$ | | |
$I$ > G2-2 | |
* 1 * 4 -5 4 -6 * 1 2 5 -6 -2 * 1 3 -4 -2 3 -5 6 -3
|
| (3-38) |
| $L(3,1)$ | | |
2 > G1-2 | |
* 1 * 4 -5 * 2 4 -3 * 1 2 5 -3 -1 3 -6 4 -6 5 -6 -2
|
| is(3-3) (3-44) |
| $L(3,1)$ | | |
3 > ik(2-4) | |
* 1 * 2 4 -3 * 1 3 -5 6 -4 6 -3 * 1 2 5 -4 5 -6 -2
|
| is(0-2) (3-42) |
| $S^2\times S^1$ | | |
3 > ik(2-6) | |
* 1 * 2 4 -3 * 1 2 5 -6 -2 * 1 3 -5 4 -5 6 -4 6 -3
|
| is(0-3) (3-42) |
| $S^2\times S^1$ | | |
3 > ik(2-6) | |
* 1 * 2 4 -3 * 1 2 5 -6 -2 * 1 3 -5 4 -5 6 -4 6 -3
|
| (3-43) |
| $S^2\times_\tau S^1$ | non-ori | |
3 > ik(2-5) | |
* 1 * 2 4 -3 * 1 2 5 -6 -2 * 1 3 -6 4 -5 6 -4 5 -3
|
| |
#(1,1),(1,2),(1,3),(2,2),(2,3),(3,3)# 4
|
| is(1-18) (3-0) |
| $S^3$ | | |
$I$ > ik(2-1) | |
* 1 * 4 * 6 * 1 2 4 -2 3 6 -3 1 3 -5 4 5 6 -5 -2
|
| (3-1) |
| $S^3$ | | |
$I$ > ik(2-7) | |
* 1 * 4 * 6 * 1 2 4 -2 3 6 -3 1 3 -5 4 5 -6 -5 -2
|
| (3-4) |
| $S^3$ | | |
$I$ > ik(2-2) | |
* 1 * 4 * 1 3 -5 4 5 6 -3 * 1 2 4 -2 3 6 6 -5 -2
|
| is(1-19) (3-5) |
| $S^3$ | | |
$I$ > ik(2-1) | |
* 1 * 4 * 1 3 -5 4 5 6 -3 * 1 2 5 -6 -6 -3 2 4 -2
|
| (3-6) |
| $P^3$ | | |
$H$ > $\Sigma(2,1)$ | |
* 1 * 4 * 1 2 4 -2 3 6 -5 -2 * 1 3 -5 4 5 6 6 -3
|
| is(2-6) (3-7) |
| $P^3$ | | |
$H$ > $\Sigma(2,1)$ | |
* 1 * 4 * 1 2 4 -2 3 6 -5 -2 * 1 3 -6 -6 -5 4 5 -3
|
| (3-2) |
| $L(3,1)$ | | |
$I$ > G2-3 | |
* 1 * 4 * 1 2 4 -2 3 -5 -2 * 1 3 6 -5 4 5 6 6 -3
|
| (3-3) |
| $L(3,1)$ | | |
$I$ > G2-3 | |
* 1 * 4 * 1 2 4 -2 3 -5 -2 * 1 3 6 6 -5 4 5 6 -3
|
4 | |
#(1,1),(1,2),(1,2),(2,3),(2,3),(3,4),(3,4),(4,4)# 1
|
| K4-01 |
$\Sigma(7,1)$ | $L(7,1)$ | $A$ | #1^4_2 | | M4-01 |
* 1 2 -3 * 6 8 -7 * 2 4 -5 -3 * 4 6 -7 -5 * 1 1 3 4 7 8 8 -6 -5 -2
|
| K4-02 |
$\Sigma(13,3)$ | $L(13,3)$ | $D_1$ | #1^4_2 | | M4-03 |
* 1 2 -3 * 6 8 -7 * 2 4 -5 -3 * 4 6 -8 -8 -7 -5 * 1 1 3 4 7 -6 -5 -2
|
| K4-03 |
$\Sigma(15,4)$ | $L(15,4)$ | $F_1$ | #1^4_2 | | M4-05 |
* 1 2 -3 * 6 8 -7 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 8 -6 -5
|
| K4-04 |
$\Sigma(11,2)$ | $L(11,2)$ | $B$ | #1^4_2 | | M4-02 |
* 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 8 -7 * 1 1 3 4 7 8 -6 -5 -2
|
| K4-05 |
$\Sigma(14,3)$ | $L(14,3)$ | $D_2$ | #1^4_2 | | M4-04 |
* 1 2 -3 * 2 4 -5 -3 * 6 8 8 -7 * 4 6 -8 -7 -5 * 1 1 3 4 7 -6 -5 -2
|
| K4-06 |
$\Sigma(17,5)$ | $L(17,5)$ | $E_1$ | #1^4_2 | | M4-07 |
* 1 2 -3 * 4 6 -7 -5 * 6 8 8 -7 * 1 1 3 4 -5 -2 * 2 4 7 8 -6 -5 -3
|
| K4-07 |
$\Sigma(18,5)$ | $L(18,5)$ | $F_2$ | #1^4_2 | | M4-08 |
* 1 2 -3 * 6 8 8 -7 * 4 6 -8 -7 -5 * 1 1 3 4 -5 -2 * 2 4 7 -6 -5 -3
|
| K4-08 |
$\Sigma(16,7)$ | $L(16,7)$ | $C$ | #1^4_2 | | M4-06 |
* 1 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 8 -7 * 1 3 4 7 8 -6 -5 -2
|
| K4-09 |
$\Sigma(19,7)$ | $L(19,7)$ | $E_2$ | #1^4_2 | | M4-09 |
* 1 1 2 -3 * 2 4 -5 -3 * 6 8 8 -7 * 4 6 -8 -7 -5 * 1 3 4 7 -6 -5 -2
|
| K4-10 |
$\Sigma(21,8)$ | $L(21,8)$ | $F_3$ | #1^4_2 | | M4-10 |
* 1 1 2 -3 * 6 8 8 -7 * 1 3 4 -5 -2 * 4 6 -8 -7 -5 * 2 4 7 -6 -5 -3
|
| |
#(1,1),(1,2),(1,3),(2,3),(2,4),(2,4),(3,4),(3,4)#2 (# 3 )
|
| K4-11 |
| $L(12,5)$ |
not C-irr | #3_2+#1_1 |
4 => K4-11_1
>
K3-5 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 -6 5 -6 * 4 8 -7 8 -5 * 1 1 3 8 -6 -2
|
| K4-11_1 |
| $L(12,5)$ | | |
3 >
$\Sigma(12,5)$ | |
|
| K4-12 |
| $S^3/Q_{12}$ |
| #3_2+#1_1 |
4=> K4-12-1
> K3-7 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 -8 7 -6 * 4 8 -5 6 -5 * 1 1 3 8 -6 -2
|
| K4-13 |
| $S^3/Q_8\times Z_3$ |
$S^2(0;(2,1),(2,1),(2,1))$ | #3_2+#1_1 | | M4-14 |
* 2 5 -7 -3 * 1 1 2 4 -3 * 1 3 8 -6 -2 * 4 7 -6 5 -6 * 4 8 -7 8 -5
|
| K4-14 |
| $S^3/D_{24}$ | $S^2(-1;(2,1),(2,1),(3,2))$ | #3_2+#1_1 | | M4-12A |
* 2 5 -7 -3 * 1 1 2 4 -3 * 1 3 8 -6 -2 * 4 7 -8 7 -6 * 4 8 -5 6 -5
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,4),(2,4),(3,4),(3,4)#3 (# 4)
|
| K4-15 |
$\Sigma(Q_{16})$ | $S^3/Q_{16}$ | $S^2(-1;(2,1),(2,1),(4,1))$ |
T4-2 | | M4-11 |
* 1 -2 3 -4 * 1 5 -6 -2 * 3 7 -8 -4 * 5 -7 8 -6 * 1 6 -7 -4 2 5 -8 -3
|
| |
#(1,2),(1,2),(1,3),(1,4),(2,3),(2,4),(3,4),(3,4)#4 (# 5)
|
| K4-16 |
| $S^3/D_{24}$ | $S^2(-1;(2,1),(2,1),(3,1))$ |
T4-1_1 |
4=> K4-14 | M4-12B |
* 1 5 7 -4 * 1 6 -8 -3 * 1 -2 3 -5 -2 * 2 6 -7 8 -4 * 3 7 -8 -5 6 -4
|
| K4-17 |
$\Sigma(B(2,3,4))$ | $S^3/P_{24}$ | $S^2(-1;(2,1),(3,1),(3,1))$ |
T4-3 |
| M4-13 |
* 3 -5 6 -4 * 1 -2 3 7 -4 * 1 5 7 -8 -3 * 1 6 -8 -5 -2 * 2 6 -7 8 -4
|
| K4-12-1 |
| $S^3/Q_{12}$ |
| |
> K3-7 | |
|
5 | |
#(1,1),(1,2),(1,2),(2,3),(2,3),(3,4),(3,4),(4,5),(4,5),(5,5)# 1
|
| K5-01 |
$\Sigma(8,1)$ | $L(8,1)$ | $A$ | #1^5_2 |
| M5-01 |
* 1 2 -3 * 8 10 -9 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 1 1 3 4 7 8 -10 -10 -9 -6 -5 -2
|
| K5-02 |
$\Sigma(16,3)$ | $L(16,3)$ | $D_1$ | #1^5_2 |
| M5-03 |
* 1 2 -3 * 8 10 -9 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -10 -10 -9 -7 * 1 1 3 4 7 8 -9 -6 -5 -2
|
| K5-03 |
$\Sigma(17,4)$ | $L(17,4)$ | | #1^5_2 |
| M5-05 |
* 1 2 -3 * 8 10 -9 * 2 4 -5 -3 * 6 8 -9 -7 * 1 1 3 4 6 -7 -5 -2 * 4 7 8 -10 -10 -9 -6 -5
|
| K5-04 |
$\Sigma(19,4)$ | $L(19,4)$ | | #1^5_2 |
| M5-06 |
* 1 2 -3 * 8 10 -9 * 2 4 -5 -3 * 4 6 8 -9 -7 -5 * 6 9 10 10 -8 -7 * 1 1 3 4 7 -6 -5 -2
|
| K5-05 |
$\Sigma(24,7)$ | $L(24,7)$ | $F_1$ | #1^5_2 |
| M5-11 |
* 1 2 -3 * 8 10 -9 * 4 6 -7 -5 * 1 1 3 4 -5 -2 * 6 8 -10 -10 -9 -7 * 2 4 7 8 -9 -6 -5 -3
|
| K5-06 |
$\Sigma(25,7)$ | $L(25,7)$ | | #1^5_2 |
| M5-12 |
* 1 2 -3 * 8 10 -9 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 -9 -6 -5 * 6 8 -10 -10 -9 -7
|
| K5-07 |
$\Sigma(13,2)$ | $L(13,2)$ | $B$ | #1^5_2 |
| M5-02 |
* 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 8 10 10 -9 * 1 1 3 4 7 8 -10 -9 -6 -5 -2
|
| K5-08 |
$\Sigma(17,3)$ | $L(17,3)$ | $D_2$ | #1^5_2 |
| M5-04 |
* 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 8 10 10 -9 * 6 8 -10 -9 -7 * 1 1 3 4 7 8 -9 -6 -5 -2
|
| K5-09 |
$\Sigma(23,7)$ | $L(23,7)$ | $E_1$ | #1^5_2 |
| M5-10 |
* 1 2 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 8 10 10 -9 * 1 1 3 4 -5 -2 * 2 4 7 8 -10 -9 -6 -5 -3
|
| K5-10 |
$\Sigma(22,5)$ | $L(22,5)$ | | #1^5_2 |
| M5-08 |
* 1 2 -3 * 2 4 -5 -3 * 6 8 -9 -7 * 8 10 10 -9 * 4 6 9 10 -8 -7 -5 * 1 1 3 4 7 -6 -5 -2
|
| K5-11 |
$\Sigma(23,5)$ | $L(23,5)$ | | #1^5_2 |
| M5-09 |
* 1 2 -3 * 2 4 -5 -3 * 8 10 10 -9 * 6 8 -10 -9 -7 * 4 6 9 -8 -7 -5 * 1 1 3 4 7 -6 -5 -2
|
| K5-12 |
$\Sigma(27,8)$ | $L(27,8)$ | $F_2$ | #1^5_2 |
| M5-18 |
* 1 2 -3 * 4 6 -7 -5 * 8 10 10 -9 * 6 8 -10 -9 -7 * 1 1 3 4 -5 -2 * 2 4 7 8 -9 -6 -5 -3
|
| K5-13 |
$\Sigma(31,12)$ | $L(31,12)$ | | #1^5_2 |
| M5-19 |
* 1 2 -3 * 6 8 -9 -7 * 8 10 10 -9 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 -10 -9 -6 -5
|
| K5-14 |
$\Sigma(29,12)$ | $L(29,12)$ | | #1^5_2 |
| M5-17 |
* 1 2 -3 * 8 10 10 -9 * 6 8 -10 -9 -7 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 -9 -6 -5
|
| K5-15 |
$\Sigma(20,9)$ | $L(20,9)$ | $C$ | #1^5_2 |
| M5-07 |
* 1 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 8 10 10 -9 * 1 3 4 7 8 -10 -9 -6 -5 -2
|
| K5-16 |
$\Sigma(25,9)$ | $L(25,9)$ | $E_2$ | #1^5_2 |
| M5-20 |
* 1 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 8 10 10 -9 * 6 8 -10 -9 -7 * 1 3 4 7 8 -9 -6 -5 -2
|
| K5-17 |
$\Sigma(29,8)$ | $L(29,8)$ | | #1^5_2 |
| M5-16 |
* 1 1 2 -3 * 2 4 -5 -3 * 6 8 -9 -7 * 8 10 10 -9 * 1 3 4 6 -7 -5 -2 * 4 7 8 -10 -9 -6 -5
|
| K5-18 |
$\Sigma(30,11)$ | $L(30,11)$ | $F_3$ | #1^5_2 |
| M5-15 |
* 1 1 2 -3 * 4 6 -7 -5 * 8 10 10 -9 * 1 3 4 -5 -2 * 6 8 -10 -9 -7 * 2 4 7 8 -9 -6 -5 -3
|
| K5-19 |
$\Sigma(26,7)$ | $L(26,7)$ | | #1^5_2 |
| M5-14 |
* 1 1 2 -3 * 2 4 -5 -3 * 8 10 10 -9 * 6 8 -10 -9 -7 * 4 6 9 -8 -7 -5 * 1 3 4 7 -6 -5 -2
|
| K5-20 |
$\Sigma(34,13)$ | $L(34,13)$ | | #1^5_2 |
| M5-13 |
* 1 1 2 -3 * 8 10 10 -9 * 1 3 4 -5 -2 * 6 8 -10 -9 -7 * 2 4 6 -7 -5 -3 * 4 7 8 -9 -6 -5
|
| |
#(1,1),(1,2),(1,2),(2,3),(2,4),(3,4),(3,5),(3,5),(4,5),(4,5)
#2 (# 4)
|
| K5-21 |
| $L(16,7)$ |
not C-irr |
#3_2+#1^2_1 |
4=>
K5-30
> K4-08 | |
* 1 2 -3 * 4 7 -9 -5 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 6 10 -9 10 -7 * 1 1 3 4 8 -10 -5 -2
|
| K5-22 |
| $S^3/Q_{16}$ | | #3_2+#1^2_1 |
> K4-15 | |
* 1 2 -3 * 4 7 -9 -5 * 2 4 6 -5 -3 * 6 9 -10 9 -8 * 6 10 -7 8 -7 * 1 1 3 4 8 -10 -5 -2
|
| K5-23 |
| $S^3/D_{48}$ | $S^2(0;(2,1),(2,1),(3,1))$ | #3_2+#1^2_1 |
4=>
K5-34 | M5-26A |
* 1 2 -3 * 4 7 -9 -5 * 6 9 -8 7 -8 * 6 10 -9 10 -7 * 2 4 8 -10 -5 -3 * 1 1 3 4 6 -5 -2
|
| K5-24 |
| $S^3/Q_{16}\times Z_3$ | $S^2(-1;(2,1),(2,1),(4,3))$ | #3_2+#1^2_1 |
4=> K5-41 | M5-23A |
* 1 2 -3 * 4 7 -9 -5 * 6 9 -10 9 -8 * 6 10 -7 8 -7 * 2 4 8 -10 -5 -3 * 1 1 3 4 6 -5 -2
|
| K5-25 |
| $S^3/Q_8\times Z_5$ | $S^2(1;(2,1),(2,1),(2,1))$ | #3_2+#1^2_1 |
4=>
K5-33 | M5-27B |
* 1 1 2 -3 * 4 7 -9 -5 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 6 10 -9 10 -7 * 1 3 4 8 -10 -5 -2
|
| K5-26 |
| $S^3/D_{40}$ | $S^2(-1;(2,1),(2,1),(5,2))$ | #3_2+#1^2_1 | | M5-22A |
* 1 1 2 -3 * 4 7 -9 -5 * 2 4 6 -5 -3 * 6 9 -10 9 -8 * 6 10 -7 8 -7 * 1 3 4 8 -10 -5 -2
|
| K5-27 |
| $S^3/Q_{12}\times Z_5$ | $S^2(0;(2,1),(2,1),(3,2))$ | #3_2+#1^2_1 |
4=>
K5-37 | M5-25A |
* 1 1 2 -3 * 4 7 -9 -5 * 6 9 -8 7 -8 * 6 10 -9 10 -7 * 1 3 4 6 -5 -2 * 2 4 8 -10 -5 -3
|
| K5-28 |
| $S^3/Q_{20}\times Z_3$ | $S^2(-1;(2,1),(2,1),(5,3))$ | #3_2+#1^2_1 |
4=>
K5-42 | M5-24A |
* 1 1 2 -3 * 4 7 -9 -5 * 6 9 -10 9 -8 * 6 10 -7 8 -7 * 1 3 4 6 -5 -2 * 2 4 8 -10 -5 -3
|
| |
#(1,1),(1,2),(1,3),(2,3),(2,4),(2,4),(3,4),(3,5),(4,5),(5,5)
#3 (# 5)
|
| K5-29
| | $L(11,2)$ | | #3_1+2#1_1 |
> K4-04 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 8 -9 -5 * 7 9 10 -8 * 4 7 -6 5 -6 * 1 1 3 8 10 10 -9 -6 -2
|
| K5-30 | |
$L(16,7)$ | | #3_1+2#1_1 |
>
K4-08 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 8 -9 -5 * 4 7 -6 5 -6 * 7 9 10 10 -8 * 1 1 3 8 10 -9 -6 -2
|
| K5-31
| | $L(17,5)$ | | #3_1+2#1_1 |
> K4-06 | |
* 1 2 4 -3 * 2 5 -7 -3 * 7 9 10 -8 * 4 7 -6 5 -6 * 4 8 10 10 -9 -5 * 1 1 3 8 -9 -6 -2
|
| K5-32 |
| $L(19,7)$ | | #3_1+2#1_1 |
> K4-09 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 -6 5 -6 * 4 8 10 -9 -5 * 7 9 10 10 -8 * 1 1 3 8 -9 -6 -2
|
| K5-33 |
| $S^3/Q_8\times Z_5$ | $S^2(1;(2,1),(2,1),(2,1))$ | #3_1+2#1_1 |
4=>
K5-25 | M5-27A |
* 2 5 -7 -3 * 4 8 -9 -5 * 1 1 2 4 -3 * 4 7 -6 5 -6 * 7 9 10 10 -8 * 1 3 8 10 -9 -6 -2
|
| K5-34 |
| $S^3/D_{48}$ | $S^2(0;(2,1),(2,1),(3,1))$ | #3_1+2#1_1 |
4=> K5-23 | M5-26B |
* 1 2 4 -3 * 4 8 -9 -5 * 4 7 -6 5 -6 * 7 9 10 10 -8 * 1 1 3 7 -5 -2 * 2 6 9 -10 -8 -3
|
| K5-35 |
| $S^3/P_{24}$ | | #3_1+2#1_1 |
> K4-17 | |
* 1 2 4 -3 * 7 9 10 -8 * 2 5 9 -8 -3 * 4 7 -5 6 -5 * 1 1 3 7 -6 -2 * 4 8 10 10 -9 -6
|
| K5-36 |
| $S^3/P_{72}$ | $S^2(-1;(2,1),(3,2),(3,1))$ | #3_1+2#1_1 | | M5-28A |
* 1 2 4 -3 * 2 5 9 -8 -3 * 4 7 -5 6 -5 * 4 8 10 -9 -6 * 7 9 10 10 -8 * 1 1 3 7 -6 -2
|
| K5-37 |
| $S^3/Q_{12}\times Z_5$ | $S^2(0;(2,1),(2,1),(3,2))$ | #3_1+2#1_1 |
4=>
K5-27 | M5-25B |
* 2 5 -7 -3 * 1 1 2 4 -3 * 4 7 -6 5 -6 * 4 8 10 -9 -5 * 7 9 10 10 -8 * 1 3 8 -9 -6 -2
|
| K5-38 |
| $S^3/P_{24}\times Z_5$ | $S^2(-1;(2,1),(3,2),(3,2))$ | #3_1+2#1_1 | | M5-29 |
* 1 1 2 4 -3 * 1 3 7 -5 -2 * 2 6 9 -8 -3 * 4 7 -6 5 -6 * 4 8 10 -9 -5 * 7 9 10 10 -8
|
| K6-093-2 |
| $S^3/D_{24}$ | |
|
>
K4-14 | |
|
| |
#(1,1),(1,2),(1,3),(2,3),(2,4),(2,5),(3,4),(3,5),(4,5),(4,5)
#4 (# 8)
|
| K5-39 |
| $S^3/Q_{16}$ | |
T4-1+#1_1 |
> K4-15 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 4 8 -10 -5 * 5 9 -10 -7 8 -6 * 1 1 3 8 -9 10 -6 -2
|
| K5-40 |
| $S^3/D_{40}$ | $S^2(-1;(2,1),(3,2),(5,2))$ | T4-1+#1_1 |
=> K5-26 | M5-22B |
* 2 5 -7 -3 * 4 7 9 -6 * 4 8 -10 -5 * 1 1 2 4 -3 * 5 9 -10 -7 8 -6 * 1 3 8 -9 10 -6 -2
|
| K5-41 |
| $S^3/Q_{16}\times Z_3$ | $S^2(-1;(2,1),(2,1),(4,3))$ | T4-1+#1_1 |
4=> K5-24 | M5-23B |
* 1 2 4 -3 * 4 7 9 -6 * 4 8 -10 -5 * 1 1 3 7 -5 -2 * 2 6 -10 9 -8 -3 * 5 9 -10 -7 8 -6
|
| K5-42 |
| $S^3/Q_{20}\times Z_3$ | $S^2(-1;(2,1),(2,1),(5,3))$ | T4-1+#1_1 |
4=>
K5-28 | M5-24B |
* 4 7 9 -6 * 4 8 -10 -5 * 1 1 2 4 -3 * 1 3 7 -5 -2 * 2 6 -10 9 -8 -3 * 5 9 -10 -7 8 -6
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,4),(2,4),(3,5),(3,5),(4,5),(4,5)
#5 (# 11)
|
| K5-43 |
$\Sigma(Q_{20})$ | $S^3/Q_{20}$ | $S^2(-1;(2,1),(2,1),(5,1))$ |
T5-4 | | M5-21 |
* 1 -2 3 -4 * 1 5 -6 -2 * 3 7 -8 -4 * 5 9 -10 -6 * 7 -10 9 -8 * 1 6 9 -7 -4 2 5 10 -8 -3
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,4),(2,5),(3,4),(3,5),(4,5),(4,5)
#6 (# 12)
|
| K5-44 |
| $L(10,3)$ | |
T5-1_2> | >$\Sigma(10,3)$ | |
* 1 -2 3 -4 * 1 5 -7 -3 * 2 6 -8 -4 * 1 6 -9 -5 -2 * 3 8 -10 -7 -4 * 5 10 -9 -7 8 -9 10 -6
|
| K5-45 |
| $L(11,3)$ | |
T5-1_2> | >$\Sigma(11,3)$ | |
* 1 -2 3 -4 * 1 5 -7 -3 * 2 6 -8 -4 * 1 6 -9 -5 -2 * 7 9 -10 9 -8 * 3 8 -10 -5 6 -10 -7 -4
|
| K5-46 |
| $S^3/P_{48}$ | $S^2(-1;(2,1),(3,1),(4,1))$ |
T5-5=> |
4=>
K5-49 | M5-30B |
* 1 -2 3 -4 * 5 -7 8 -6 * 1 5 9 -6 -2 * 3 7 10 -8 -4 * 1 6 -10 9 -8 -3 * 2 5 10 -9 -7 -4
|
| K5-47 |
| $S^3/P_{72}$ | $S^2(-1;(2,1),(3,2),(3,1))$ |
T5-2_1 |
=> K5-36 |
M5-28B |
* 1 -2 3 -4 * 1 5 9 -6 -2 * 1 6 -10 -7 -3 * 2 5 10 -8 -4 * 7 9 -10 9 -8 * 3 8 -6 5 -7 -4
|
| |
#(1,2),(1,2),(1,3),(1,4),(2,3),(2,5),(3,4),(3,5),(4,5),(4,5)
#7 (# 13)
|
| K5-48 |
| $S^3/D_{40}$ | $S^2(-1;(2,1),(3,2),(5,2))$ |
T5-3_1 |
=> K5-26 | M5-22C |
* 1 5 7 -4 * 1 6 -8 -3 * 1 -2 3 -5 -2 * 3 7 9 -10 -4 * 5 8 -10 9 -6 * 2 6 -10 -7 8 -9 -4
|
| |
#(1,2),(1,3),(1,4),(1,5),(2,3),(2,4),(2,5),(3,4),(3,5),(4,5)
#8 (# 14)
|
| K5-49 |
| $S^3/P_{48}$ | $S^2(-1;(2,1),(3,1),(4,1))$ |
T5-6=> |
4=> K5-46 | M5-30A |
* 1 5 8 -3 * 1 6 10 -4 * 1 7 -9 -2 * 2 -5 6 -8 9 -4 * 2 8 10 -7 6 -3 * 3 10 -9 -5 7 -4
|
| K5-50 |
$\Sigma(B(2,3,5))$ | $S^3/P_{120}$ | $S^2(-1;(2,1),(3,1),(5,1))$ |
T5-7 | $(B(2,3,5))$ proper | M5-31 |
* 1 5 8 10 -4 * 1 6 10 -9 -2 * 1 7 -9 8 -3 * 2 -5 7 -10 -3 * 2 8 -6 7 -4 * 3 -6 5 9 -4
|
6 | |
#(1,1),(1,2),(1,2),(2,3),(2,3),(3,4),(3,4),(4,5),(4,5),(5,6),(5,6),(6,6)
# 1
|
| K6-001 |
$\Sigma(9,1)$ | $L(9,1)$ | $A$ | #1^6_2 | | M6-01 |
* 1 2 -3 * 10 12 -11 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 8 10 -11 -9 * 1 1 3 4 7 8 11 12 12 -10 -9 -6 -5 -2
|
| K6-002 |
$\Sigma(19,3)$ | $L(19,3)$ | $D_1$ | #1^6_2 | | M6-03 |
* 1 2 -3 * 10 12 -11 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 8 10 -12 -12 -11 -9 * 1 1 3 4 7 8 11 -10 -9 -6 -5 -2
|
| K6-003 |
$\Sigma(21,4)$ | $L(21,4)$ | | #1^6_2 | | M6-05 |
* 1 2 -3 * 10 12 -11 * 2 4 -5 -3 * 4 6 -7 -5 * 8 10 -11 -9 * 6 8 11 12 12 -10 -9 -7 * 1 1 3 4 7 8 -9 -6 -5 -2
|
| K6-004 |
$\Sigma(23,4)$ | $L(23,4)$ | | #1^6_2 | | M6-06 |
* 1 2 -3 * 10 12 -11 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 10 -11 -9 -7 * 8 11 12 12 -10 -9 * 1 1 3 4 7 8 -9 -6 -5 -2
|
| K6-005 |
$\Sigma(33,10)$ | $L(33,10)$ | $F_1$ | #1^6_2 | | M6-17 |
* 1 2 -3 * 10 12 -11 * 4 6 -7 -5 * 6 8 -9 -7 * 1 1 3 4 -5 -2 * 8 10 -12 -12 -11 -9 * 2 4 7 8 11 -10 -9 -6 -5 -3
|
| K6-006 |
$\Sigma(31,7)$ | $L(31,7)$ | | #1^6_2 | | M6-13 |
* 1 2 -3 * 10 12 -11 * 2 4 -5 -3 * 6 8 -9 -7 * 8 10 -12 -12 -11 -9 * 1 1 3 4 6 -7 -5 -2 * 4 7 8 11 -10 -9 -6 -5
|
| K6-007 |
$\Sigma(24,5)$ | $L(24,5)$ | | #1^6_2 | | M6-07 |
* 1 2 -3 * 10 12 -11 * 2 4 -5 -3 * 8 10 -11 -9 * 4 6 8 -9 -7 -5 * 1 1 3 4 7 -6 -5 -2 * 6 9 10 -12 -12 -11 -8 -7
|
| K6-008 |
$\Sigma(32,7)$ | $L(32,7)$ | | #1^6_2 | | M6-15 |
* 1 2 -3 * 10 12 -11 * 2 4 -5 -3 * 4 6 8 -9 -7 -5 * 6 9 10 -11 -8 -7 * 8 10 -12 -12 -11 -9 * 1 1 3 4 7 -6 -5 -2
|
| K6-009 |
$\Sigma(37,10)$ | $L(37,10)$ | | #1^6_2 | | M6-22 |
* 1 2 -3 * 10 12 -11 * 4 6 -7 -5 * 1 1 3 4 -5 -2 * 6 8 10 -11 -9 -7 * 8 11 12 12 -10 -9 * 2 4 7 8 -9 -6 -5 -3
|
| K6-010 |
$\Sigma(40,11)$ | $L(40,11)$ | | #1^6_2 | | M6-25 |
* 1 2 -3 * 10 12 -11 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 -9 -6 -5 * 6 8 10 -11 -9 -7 * 8 11 12 12 -10 -9
|
| K6-011 |
$\Sigma(15,2)$ | $L(15,2)$ | $B$ | #1^6_2 | | M6-02 |
* 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 8 10 -11 -9 * 10 12 12 -11 * 1 1 3 4 7 8 11 12 -10 -9 -6 -5 -2
|
| K6-012 |
$\Sigma(20,3)$ | $L(20,3)$ | $D_2$ | #1^6_2 | | M6-04 |
* 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 10 12 12 -11 * 8 10 -12 -11 -9 * 1 1 3 4 7 8 11 -10 -9 -6 -5 -2
|
| K6-013 |
$\Sigma(29,9)$ | $L(29,9)$ | $E_1$ | #1^6_2 | | M6-11 |
* 1 2 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 8 10 -11 -9 * 10 12 12 -11 * 1 1 3 4 -5 -2 * 2 4 7 8 11 12 -10 -9 -6 -5 -3
|
| K6-014 |
$\Sigma(27,5)$ | $L(27,5)$ | | #1^6_2 | | M6-09 |
* 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 8 10 -11 -9 * 10 12 12 -11 * 6 8 11 12 -10 -9 -7 * 1 1 3 4 7 8 -9 -6 -5 -2
|
| K6-015 |
$\Sigma(30,7)$ | $L(30,7)$ | | #1^6_2 | | M6-12 |
* 1 2 -3 * 2 4 -5 -3 * 6 8 -9 -7 * 8 10 -11 -9 * 10 12 12 -11 * 1 1 3 4 6 -7 -5 -2 * 4 7 8 11 12 -10 -9 -6 -5
|
| K6-016 |
$\Sigma(28,5)$ | $L(28,5)$ | | #1^6_2 | | M6-10 |
* 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 10 12 12 -11 * 8 10 -12 -11 -9 * 6 8 11 -10 -9 -7 * 1 1 3 4 7 8 -9 -6 -5 -2
|
| K6-017 |
$\Sigma(36,11)$ | $L(36,11)$ | $F_2$ | #1^6_2 | | M6-20 |
* 1 2 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 10 12 12 -11 * 8 10 -12 -11 -9 * 1 1 3 4 -5 -2 * 2 4 7 8 11 -10 -9 -6 -5 -3
|
| K6-018 |
$\Sigma(35,8)$ | $L(35,8)$ | | #1^6_2 | | M6-19 |
* 1 2 -3 * 2 4 -5 -3 * 6 8 -9 -7 * 10 12 12 -11 * 8 10 -12 -11 -9 * 1 1 3 4 6 -7 -5 -2 * 4 7 8 11 -10 -9 -6 -5
|
| K6-019 |
$\Sigma(34,9)$ | $L(34,9)$ | | #1^6_2 | | M6-18 |
* 1 2 -3 * 6 8 -9 -7 * 8 10 -11 -9 * 10 12 12 -11 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 11 12 -10 -9 -6 -5
|
| K6-020 |
$\Sigma(33,7)$ | $L(33,7)$ | | #1^6_2 | | M6-16 |
* 1 2 -3 * 2 4 -5 -3 * 8 10 -11 -9 * 10 12 12 -11 * 4 6 8 -9 -7 -5 * 6 9 10 -12 -11 -8 -7 * 1 1 3 4 7 -6 -5 -2
|
| K6-021 |
$\Sigma(41,12)$ | $L(41,12)$ | | #1^6_2 | | M6-27 |
* 1 2 -3 * 4 6 -7 -5 * 8 10 -11 -9 * 10 12 12 -11 * 1 1 3 4 -5 -2 * 6 8 11 12 -10 -9 -7 * 2 4 7 8 -9 -6 -5 -3
|
| K6-022 |
$\Sigma(37,8)$ | $L(37,8)$ | | #1^6_2 | | M6-21 |
* 1 2 -3 * 2 4 -5 -3 * 10 12 12 -11 * 8 10 -12 -11 -9 * 4 6 8 -9 -7 -5 * 6 9 10 -11 -8 -7 * 1 1 3 4 7 -6 -5 -2
|
| K6-023 |
$\Sigma(44,13)$ | $L(44,13)$ | | #1^6_2 | | M6-30 |
* 1 2 -3 * 4 6 -7 -5 * 10 12 12 -11 * 8 10 -12 -11 -9 * 1 1 3 4 -5 -2 * 6 8 11 -10 -9 -7 * 2 4 7 8 -9 -6 -5 -3
|
| K6-024 |
$\Sigma(41,11)$ | $L(41,11)$ | | #1^6_2 | | M6-26 |
* 1 2 -3 * 6 8 -9 -7 * 10 12 12 -11 * 8 10 -12 -11 -9 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 11 -10 -9 -6 -5
|
| K6-025 |
$\Sigma(43,12)$ | $L(43,12)$ | | #1^6_2 | | M6-29 |
* 1 2 -3 * 8 10 -11 -9 * 10 12 12 -11 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 -9 -6 -5 * 6 8 11 12 -10 -9 -7
|
| K6-026 |
$\Sigma(47,13)$ | $L(47,13)$ | | #1^6_2 | | M6-33 |
* 1 2 -3 * 10 12 12 -11 * 8 10 -12 -11 -9 * 1 1 3 4 -5 -2 * 2 4 6 -7 -5 -3 * 4 7 8 -9 -6 -5 * 6 8 11 -10 -9 -7
|
| K6-027 |
$\Sigma(24,11)$ | $L(24,11)$ | $C$ | #1^6_2 | | M6-08 |
* 1 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 8 10 -11 -9 * 10 12 12 -11 * 1 3 4 7 8 11 12 -10 -9 -6 -5 -2
|
| K6-028 |
$\Sigma(31,11)$ | $L(31,11)$ | $E_2$ | #1^6_2 | | M6-14 |
* 1 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 10 12 12 -11 * 8 10 -12 -11 -9 * 1 3 4 7 8 11 -10 -9 -6 -5 -2
|
| K6-029 |
$\Sigma(39,16)$ | $L(39,16)$ | | #1^6_2 | | M6-24 |
* 1 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 8 10 -11 -9 * 10 12 12 -11 * 6 8 11 12 -10 -9 -7 * 1 3 4 7 8 -9 -6 -5 -2
|
| K6-030 |
$\Sigma(39,14)$ | $L(39,14)$ | $F_3$ | #1^6_2 | | M6-23 |
* 1 1 2 -3 * 4 6 -7 -5 * 6 8 -9 -7 * 10 12 12 -11 * 1 3 4 -5 -2 * 8 10 -12 -11 -9 * 2 4 7 8 11 -10 -9 -6 -5 -3
|
| K6-031 |
$\Sigma(41,16)$ | $L(41,16)$ | | #1^6_2 | | M6-28 |
* 1 1 2 -3 * 2 4 -5 -3 * 4 6 -7 -5 * 10 12 12 -11 * 8 10 -12 -11 -9 * 6 8 11 -10 -9 -7 * 1 3 4 7 8 -9 -6 -5 -2
|
| K6-032 |
$\Sigma(46,17)$ | $L(46,17)$ | | #1^6_2 | | M6-32 |
* 1 1 2 -3 * 2 4 -5 -3 * 6 8 -9 -7 * 10 12 12 -11 * 8 10 -12 -11 -9 * 1 3 4 6 -7 -5 -2 * 4 7 8 11 -10 -9 -6 -5
|
| K6-033 |
$\Sigma(45,19)$ | $L(45,19)$ | | #1^6_2 | | M6-31 |
* 1 1 2 -3 * 2 4 -5 -3 * 8 10 -11 -9 * 10 12 12 -11 * 4 6 8 -9 -7 -5 * 1 3 4 7 -6 -5 -2 * 6 9 10 -12 -11 -8 -7
|
| K6-034 |
$\Sigma(49,18)$ | $L(49,18)$ | | #1^6_2 | | M6-34 |
* 1 1 2 -3 * 4 6 -7 -5 * 10 12 12 -11 * 1 3 4 -5 -2 * 8 10 -12 -11 -9 * 6 8 11 -10 -9 -7 * 2 4 7 8 -9 -6 -5 -3
|
| K6-035 |
$\Sigma(50,19)$ | $L(50,19)$ | | #1^6_2 | | M6-35 |
* 1 1 2 -3 * 2 4 -5 -3 * 10 12 12 -11 * 8 10 -12 -11 -9 * 4 6 8 -9 -7 -5 * 6 9 10 -11 -8 -7 * 1 3 4 7 -6 -5 -2
|
| K6-036 |
$\Sigma(55,21)$ | $L(55,21)$ | | #1^6_2 | | M6-36 |
* 1 1 2 -3 * 10 12 12 -11 * 1 3 4 -5 -2 * 8 10 -12 -11 -9 * 2 4 6 -7 -5 -3 * 4 7 8 -9 -6 -5 * 6 8 11 -10 -9 -7
|
| |
#(1,1),(1,2),(1,2),(2,3),(2,3),(3,4),(3,5),(4,5),(4,6),(4,6),(5,6),(5,6)
#2 (# 4)
|
| K6-037 |
| $L(20,9)$ | | #3_2+#1^3_1 |
> K5-15 | |
* 1 2 -3 * 2 4 -5 -3 * 6 9 -11 -7 * 4 6 8 -7 -5 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 1 1 3 4 7 12 -10 -6 -5 -2
|
| K6-038 |
| $S^3/Q_{20}$ | | #3_2+#1^3_1 |
> K5-43 | |
* 1 2 -3 * 2 4 -5 -3 * 6 9 -11 -7 * 4 6 8 -7 -5 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 1 1 3 4 7 12 -10 -6 -5 -2
|
| K6-039 |
| $S^3/Q_{16}\times Z_5$ | $S^2(0;(2,1),(2,1),(4,1))$ | #3_2+#1^3_1 | | M6-51A |
* 1 2 -3 * 2 4 -5 -3 * 6 9 -11 -7 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 4 6 10 -12 -7 -5 * 1 1 3 4 7 -8 -6 -5 -2
|
| K6-040 |
| $S^3/D_{80}$ | $S^2(-1;(2,1),(2,1),(5,4))$ | #3_2+#1^3_1 | | M6-41A |
* 1 2 -3 * 2 4 -5 -3 * 6 9 -11 -7 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 4 6 10 -12 -7 -5 * 1 1 3 4 7 -8 -6 -5 -2
|
| K6-041 |
| $S^3/Q_{12}\times Z_7$ | $S^2(1;(2,1),(2,1),(3,1))$ | #3_2+#1^3_1 | | M6-47A |
* 1 2 -3 * 6 9 -11 -7 * 4 6 8 -7 -5 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 1 1 3 4 -5 -2 * 2 4 7 12 -10 -6 -5 -3
|
| K6-042 |
| $S^3/Q_{32}\times Z_3$ | $S^2(-1;(2,1),(2,1),(8,3))$ | #3_2+#1^3_1 | | M6-39A |
* 1 2 -3 * 6 9 -11 -7 * 4 6 8 -7 -5 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 1 1 3 4 -5 -2 * 2 4 7 12 -10 -6 -5 -3
|
| K6-043 |
| $S^3/Q_{16}\times Z_7$ | $S^2(0;(2,1),(2,1),(4,3))$ | #3_2+#1^3_1 | | M6-48A |
* 1 2 -3 * 6 9 -11 -7 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 1 1 3 4 -5 -2 * 4 6 10 -12 -7 -5 * 2 4 7 -8 -6 -5 -3
|
| K6-044 |
| $S^3/D_{112}$ | $S^2(-1;(2,1),(2,1),(7,4))$ | #3_2+#1^3_1 | | M6-44A |
* 1 2 -3 * 6 9 -11 -7 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 1 1 3 4 -5 -2 * 4 6 10 -12 -7 -5 * 2 4 7 -8 -6 -5 -3
|
| K6-045 |
| $S^3/Q_8\times Z_7$ | $S^2(2;(2,1),(2,1),(2,1))$ | #3_2+#1^3_1 | | M6-45A |
* 1 1 2 -3 * 2 4 -5 -3 * 6 9 -11 -7 * 4 6 8 -7 -5 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 1 3 4 7 12 -10 -6 -5 -2
|
| K6-046 |
| $S^3/D_{56}$ | $S^2(-1;(2,1),(2,1),(7,2))$ | #3_2+#1^3_1 | | M6-38A |
* 1 1 2 -3 * 2 4 -5 -3 * 6 9 -11 -7 * 4 6 8 -7 -5 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 1 3 4 7 12 -10 -6 -5 -2
|
| K6-047 |
| $S^3/Q_{20}\times Z_7$ | $S^2(0;(2,1),(2,1),(5,2))$ | #3_2+#1^3_1 | | M6-50A |
* 1 1 2 -3 * 2 4 -5 -3 * 6 9 -11 -7 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 4 6 10 -12 -7 -5 * 1 3 4 7 -8 -6 -5 -2
|
| K6-048 |
| $S^3/Q_{28}\times Z_5$ | $S^2(-1;(2,1),(2,1),(7,5))$ | #3_2+#1^3_1 | | M6-42A |
* 1 1 2 -3 * 2 4 -5 -3 * 6 9 -11 -7 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 4 6 10 -12 -7 -5 * 1 3 4 7 -8 -6 -5 -2
|
| K6-049 |
| $S^3/D_{96}$ | $S^2(1;(2,1),(2,1),(3,2))$ | #3_2+#1^3_1 | | M6-46A |
* 1 1 2 -3 * 6 9 -11 -7 * 1 3 4 -5 -2 * 4 6 8 -7 -5 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 2 4 7 12 -10 -6 -5 -3
|
| K6-050 |
| $S^3/Q_{28}\times Z_3$ | $S^2(-1;(2,1),(2,1),(7,3))$ | #3_2+#1^3_1 | | M6-40A |
* 1 1 2 -3 * 6 9 -11 -7 * 1 3 4 -5 -2 * 4 6 8 -7 -5 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 2 4 7 12 -10 -6 -5 -3
|
| K6-051 |
| $S^3/D_{160}$ | $S^2(0(2,1),(2,1),(5,3))$ | #3_2+#1^3_1 | | M6-49A |
* 1 1 2 -3 * 6 9 -11 -7 * 1 3 4 -5 -2 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 4 6 10 -12 -7 -5 * 2 4 7 -8 -6 -5 -3
|
| K6-052 |
| $S^3/Q_{32}\times Z_5$ | $S^2(-1;(2,1),(2,1),(8,5))$ | #3_2+#1^3_1 | | M6-43A |
* 1 1 2 -3 * 6 9 -11 -7 * 1 3 4 -5 -2 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 4 6 10 -12 -7 -5 * 2 4 7 -8 -6 -5 -3
|
| |
#(1,1),(1,2),(1,2),(2,3),(2,4),(3,4),(3,5),(3,5),(4,5),(4,6),(5,6),(6,6)
#3 (# 9)
|
| K6-053 |
| $L(13,2)$ | | #3_1+#1^2_1+#1_1 |
> K5-07 | |
* 1 2 -3 * 4 7 -9 -5 * 6 10 -11 -7 * 9 11 12 -10 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 1 1 3 4 8 11 -12 -12 -10 -5 -2
|
| K6-054 |
| $L(23,7)$ | | #3_1+#1^2_1+#1_1 |
> K5-09 | |
* 1 2 -3 * 4 7 -9 -5 * 6 10 -11 -7 * 9 11 12 -10 * 6 9 -8 7 -8 * 1 1 3 4 6 -5 -2 * 2 4 8 11 -12 -12 -10 -5 -3
|
| K6-055 |
| $L(20,9)$ | | #3_1+#1^2_1+#1_1 |
> K5-15 | |
* 1 2 -3 * 4 7 -9 -5 * 6 10 -11 -7 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 9 11 12 12 -10 * 1 1 3 4 8 11 -12 -10 -5 -2
|
| K6-056 |
| $L(23,7)$ | | #3_1+#1^2_1+#1_1 |
> K5-09 | |
* 1 2 -3 * 4 7 -9 -5 * 9 11 12 -10 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 6 10 12 12 -11 -7 * 1 1 3 4 8 11 -10 -5 -2
|
| K6-057 |
| $S^3/Q_{12}\times Z_7$ | $S^2(1;(2,1),(2,1),(3,1))$ | #3_1+#1^2_1+#1_1 |
=> K6-041 | M6-47B |
* 1 2 -3 * 4 7 -9 -5 * 6 10 -11 -7 * 6 9 -8 7 -8 * 9 11 12 12 -10 * 1 1 3 4 6 -5 -2 * 2 4 8 11 -12 -10 -5 -3
|
| K6-058 |
| $L(22,5)$ | | #3_1+#1^2_1+#1_1 |
> K5-10 | |
* 1 2 -3 * 6 10 -11 -7 * 9 11 12 -10 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 4 8 11 -12 -12 -10 -5 * 1 1 3 4 7 -9 -5 -2
|
| K6-059 |
| $S^3/P_{24}\times Z_7$ | $S^2(0;(2,1),(3,1),(3,1))$ | #3_1+#1^2_1+#1_1 | | M6-57A |
* 1 2 -3 * 4 7 -9 -5 * 9 11 12 -10 * 6 9 -8 7 -8 * 6 10 12 12 -11 -7 * 1 1 3 4 6 -5 -2 * 2 4 8 11 -10 -5 -3
|
| K6-060 |
| $L(31,12)$ | | #3_1+#1^2_1+#1_1 |
> K5-13 | |
* 1 2 -3 * 6 10 -11 -7 * 9 11 12 -10 * 6 9 -8 7 -8 * 2 4 7 -9 -5 -3 * 1 1 3 4 6 -5 -2 * 4 8 11 -12 -12 -10 -5
|
| K6-061 |
| $L(34,13)$ | | #3_1+#1^2_1+#1_1 |
> K5-16 | |
* 1 2 -3 * 4 7 -9 -5 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 6 10 12 -11 -7 * 9 11 12 12 -10 * 1 1 3 4 8 11 -10 -5 -2
|
| K6-062 |
| $S^3/Q_{16}\times Z_5$ | $S^2(0;(2,1),(2,1),(4,1))$ | #3_1+#1^2_1+#1_1 |
=> K6-039 | M6-51B |
* 1 2 -3 * 6 10 -11 -7 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 9 11 12 12 -10 * 4 8 11 -12 -10 -5 * 1 1 3 4 7 -9 -5 -2
|
| K6-063 |
| $S^3/P_{48}$ | | #3_1+#1^2_1+#1_1 |
> K5-46 | |
* 1 2 -3 * 9 11 12 -10 * 2 4 6 -5 -3 * 4 7 11 -10 -5 * 6 9 -7 8 -7 * 6 10 12 12 -11 -8 * 1 1 3 4 8 -9 -5 -2
|
| K6-064 |
| $S^3/P_{216}$ | $S^2(0;(2,1),(3,2),(3,1))$ | #3_1+#1^2_1+#1_1 | | M6-56A |
* 1 2 -3 * 4 7 -9 -5 * 6 9 -8 7 -8 * 6 10 12 -11 -7 * 9 11 12 12 -10 * 1 1 3 4 6 -5 -2 * 2 4 8 11 -10 -5 -3
|
| K6-065 |
| $S^3/Q_{16}\times Z_7$ | $S^2(0;(2,1),(2,1),(4,3))$ | #3_1+#1^2_1+#1_1 |
=> K6-043 | M6-48B |
* 1 2 -3 * 6 10 -11 -7 * 6 9 -8 7 -8 * 9 11 12 12 -10 * 2 4 7 -9 -5 -3 * 4 8 11 -12 -10 -5 * 1 1 3 4 6 -5 -2
|
| K6-066 |
| $S^3/P_{48}\times Z_7$ | $S^2(-1;(2,1),(3,1),(4,3))$ | #3_1+#1^2_1+#1_1 | | M6-53A |
* 1 2 -3 * 9 11 12 -10 * 4 7 11 -10 -5 * 6 9 -7 8 -7 * 2 4 8 -9 -5 -3 * 6 10 12 12 -11 -8 * 1 1 3 4 6 -5 -2
|
| K6-067 |
| $S^3/P_{48}\times Z_5$ | $S^2(-1;(2,1),(3,2),(4,1))$ | #3_1+#1^2_1+#1_1 | | M6-55A |
* 1 2 -3 * 2 4 6 -5 -3 * 4 7 11 -10 -5 * 6 9 -7 8 -7 * 6 10 12 -11 -8 * 9 11 12 12 -10 * 1 1 3 4 8 -9 -5 -2
|
| K6-068 |
| $S^3/P_{48}\times Z_{11}$ | $S^2(-1;(2,1),(3,2),(4,3))$ | #3_1+#1^2_1+#1_1 | | M6-60 |
* 1 2 -3 * 4 7 11 -10 -5 * 6 9 -7 8 -7 * 6 10 12 -11 -8 * 9 11 12 12 -10 * 2 4 8 -9 -5 -3 * 1 1 3 4 6 -5 -2
|
| K6-069 |
| $L(20,9)$ | | #3_1+#1^2_1+#1_1 | >K5-15 | |
* 1 1 2 -3 * 4 7 -9 -5 * 6 10 -11 -7 * 9 11 12 -10 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 1 3 4 8 11 -12 -12 -10 -5 -2
|
| K6-070 |
| $L(25,9)$ | | #3_1+#1^2_1+#1_1 |
> K5-16 | |
* 1 1 2 -3 * 4 7 -9 -5 * 6 10 -11 -7 * 9 11 12 -10 * 6 9 -8 7 -8 * 1 3 4 6 -5 -2 * 2 4 8 11 -12 -12 -10 -5 -3
|
| K6-071 |
| $S^3/Q_8\times Z_7$ | $S^2(2;(2,1),(2,1),(2,1))$ | #3_1+#1^2_1+#1_1 |
=> K6-045 | M6-45B |
* 1 1 2 -3 * 4 7 -9 -5 * 6 10 -11 -7 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 9 11 12 12 -10 * 1 3 4 8 11 -12 -10 -5 -2
|
| K6-072 |
| $S^3/D_{96}$ | $S^2(1;(2,1),(2,1),(3,2))$ | #3_1+#1^2_1+#1_1 |
=> K6-049 | M6-46B |
* 1 1 2 -3 * 4 7 -9 -5 * 6 10 -11 -7 * 6 9 -8 7 -8 * 9 11 12 12 -10 * 1 3 4 6 -5 -2 * 2 4 8 11 -12 -10 -5 -3
|
| K6-073 |
| $S^3/Q_{12}\times Z_7$ | | #3_1+#1^2_1+#1_1 |
=> K6-041 | M6-47D? |
* 1 1 2 -3 * 4 7 -9 -5 * 9 11 12 -10 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 6 10 12 12 -11 -7 * 1 3 4 8 11 -10 -5 -2
|
| K6-074 |
| $L(29,8)$ | | #3_1+#1^2_1+#1_1 |
> K5-17 | |
* 1 1 2 -3 * 6 10 -11 -7 * 9 11 12 -10 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 1 3 4 7 -9 -5 -2 * 4 8 11 -12 -12 -10 -5
|
| K6-075 |
| $S^3/P_{216}$ | $S^2(0;(2,1),(3,2),(3,1))$ | #3_1+#1^2_1+#1_1 |
=> K6-064 | M6-56B |
* 1 1 2 -3 * 4 7 -9 -5 * 9 11 12 -10 * 6 9 -8 7 -8 * 1 3 4 6 -5 -2 * 6 10 12 12 -11 -7 * 2 4 8 11 -10 -5 -3
|
| K6-076 |
| $L(26,7)$ | | #3_1+#1^2_1+#1_1 |
> K5-19 | |
* 1 1 2 -3 * 6 10 -11 -7 * 9 11 12 -10 * 6 9 -8 7 -8 * 1 3 4 6 -5 -2 * 2 4 7 -9 -5 -3 * 4 8 11 -12 -12 -10 -5
|
| K6-077 |
| $S^3/D_{96}$ | $S^2(1;(2,1),(2,1),(3,2))$ | #3_1+#1^2_1+#1_1 |
=> K6-049 | M6-46C |
* 1 1 2 -3 * 4 7 -9 -5 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 6 10 12 -11 -7 * 9 11 12 12 -10 * 1 3 4 8 11 -10 -5 -2
|
| K6-078 |
| $S^3/P_{24}\times Z_{11}$ | $S^2(0;(2,1),(3,2),(3,2))$ | #3_1+#1^2_1+#1_1 | | M6-58A |
* 1 1 2 -3 * 4 7 -9 -5 * 6 9 -8 7 -8 * 6 10 12 -11 -7 * 9 11 12 12 -10 * 1 3 4 6 -5 -2 * 2 4 8 11 -10 -5 -3
|
| K6-079 |
| $S^3/Q_{20}\times Z_7$ | $S^2(0;(2,1),(2,1),(5,2))$ | #3_1+#1^2_1+#1_1 |
=> K6-047 | M6-50B |
* 1 1 2 -3 * 6 10 -11 -7 * 2 4 6 -5 -3 * 6 9 -8 7 -8 * 9 11 12 12 -10 * 4 8 11 -12 -10 -5 * 1 3 4 7 -9 -5 -2
|
| K6-080 |
| $S^3/P_{120}\times Z_7$ | $S^2(-1;(2,1),(3,1),(5,2))$ | #3_1+#1^2_1+#1_1 | | M6-52A |
* 1 1 2 -3 * 9 11 12 -10 * 2 4 6 -5 -3 * 4 7 11 -10 -5 * 6 9 -7 8 -7 * 6 10 12 12 -11 -8 * 1 3 4 8 -9 -5 -2
|
| K6-081 |
| $S^3/D_{160}$ | $S^2(0;(2,1),(2,1),(5,2))$ | #3_1+#1^2_1+#1_1 |
=> K6-051 | M6-49B |
* 1 1 2 -3 * 6 10 -11 -7 * 6 9 -8 7 -8 * 9 11 12 12 -10 * 1 3 4 6 -5 -2 * 2 4 7 -9 -5 -3 * 4 8 11 -12 -10 -5
|
| K6-082 |
| $S^3/P_{120}\times Z_{13}$ | $S^2(-1;(2,1),(3,1),(5,3))$ | #3_1+#1^2_1+#1_1 | | M6-54A |
* 1 1 2 -3 * 9 11 12 -10 * 4 7 11 -10 -5 * 6 9 -7 8 -7 * 1 3 4 6 -5 -2 * 2 4 8 -9 -5 -3 * 6 10 12 12 -11 -8
|
| K6-083 | |
$S^3/P_{120}\times Z_{17}$ | $S^2(-1;(2,1),(3,2),(5,2))$ | #3_1+#1^2_1+#1_1 | | M6-61 |
* 1 1 2 -3 * 2 4 6 -5 -3 * 4 7 11 -10 -5 * 6 9 -7 8 -7 * 6 10 12 -11 -8 * 9 11 12 12 -10 * 1 3 4 8 -9 -5 -2
|
| K6-084 | |
$S^3/P_{120}\times Z_{23}$ | $S^2(-1;(2,1),(3,2),(5,3))$ | #3_1+#1^2_1+#1_1 | | M6-59 |
* 1 1 2 -3 * 4 7 11 -10 -5 * 6 9 -7 8 -7 * 6 10 12 -11 -8 * 9 11 12 12 -10 * 1 3 4 6 -5 -2 * 2 4 8 -9 -5 -3
|
| |
#(1,1),(1,2),(1,2),(2,3),(2,4),(3,4),(3,5),(3,6),(4,5),(4,6),(5,6),(5,6)
#4 (# 13)
|
| K6-085 |
| $S^3/Q_{20}$ | |
T4-1+#1^2_1 |
> K5-43 | |
* 1 2 -3 * 4 7 -9 -5 * 6 9 11 -8 * 6 10 -12 -7 * 2 4 6 -5 -3 * 7 11 -12 -9 10 -8 * 1 1 3 4 8 -12 11 -10 -5 -2
|
| K6-086 |
| $S^3/Q_{32}\times Z_3$ | $S^2(-1;(2,1),(2,1),(8,3))$ | T4-1+#1^2_1 |
=> K6-042 | M6-39B |
* 1 2 -3 * 4 7 -9 -5 * 6 9 11 -8 * 6 10 -12 -7 * 7 11 -12 -9 10 -8 * 1 1 3 4 6 -5 -2 * 2 4 8 -12 11 -10 -5 -3
|
| K6-087 |
| $S^3/D_{80}$ | $S^2(-1;(2,1),(2,1),(5,4))$ | T4-1+#1^2_1 |
=> K6-040 | M6-41B |
* 1 2 -3 * 6 9 11 -8 * 6 10 -12 -7 * 2 4 6 -5 -3 * 4 7 11 -12 -9 -5 * 7 -9 10 -11 12 -8 * 1 1 3 4 8 -10 -5 -2
|
| K6-088 |
| $S^3/D_{112}$ | $S^2(-1;(2,1),(2,1),(7,4))$ | T4-1+#1^2_1 |
=> K6-044 | M6-44B |
* 1 2 -3 * 6 9 11 -8 * 6 10 -12 -7 * 2 4 7 -9 -5 -3 * 4 8 -12 11 -10 -5 * 7 11 -12 -9 10 -8 * 1 1 3 4 6 -5 -2
|
| K6-089 |
| $S^3/D_{56}$ | $S^2(-1;(2,1),(2,1),(7,2))$ | T4-1+#1^2_1 |
=> K6-046 | M6-38B |
* 1 1 2 -3 * 4 7 -9 -5 * 6 9 11 -8 * 6 10 -12 -7 * 2 4 6 -5 -3 * 7 11 -12 -9 10 -8 * 1 3 4 8 -12 11 -10 -5 -2
|
| K6-090 |
| $S^3/Q_{28}\times Z_3$ | $S^2(-1;(2,1),(2,1),(7,3))$ | T4-1+#1^2_1 |
=> K6-050 | M6-40B |
* 1 1 2 -3 * 4 7 -9 -5 * 6 9 11 -8 * 6 10 -12 -7 * 1 3 4 6 -5 -2 * 7 11 -12 -9 10 -8 * 2 4 8 -12 11 -10 -5 -3
|
| K6-091 |
| $S^3/Q_{28}\times Z_5$ | $S^2(-1;(2,1),(2,1),(7,5))$ | T4-1+#1^2_1 |
=> K6-048 | M6-42B |
* 1 1 2 -3 * 6 9 11 -8 * 6 10 -12 -7 * 2 4 6 -5 -3 * 4 7 11 -12 -9 -5 * 7 -9 10 -11 12 -8 * 1 3 4 8 -10 -5 -2
|
| K6-092 |
| $S^3/Q_{32}\times Z_5$ | $S^2(-1;(2,1),(2,1),(8,5))$ | T4-1+#1^2_1 |
=> K6-052 | M6-43B |
* 1 1 2 -3 * 6 9 11 -8 * 6 10 -12 -7 * 1 3 4 6 -5 -2 * 2 4 7 -9 -5 -3 * 4 8 -12 11 -10 -5 * 7 11 -12 -9 10 -8
|
| |
#(1,1),(1,2),(1,3),(2,3),(2,4),(2,5),(3,4),(3,5),(4,6),(4,6),(5,6),(5,6)
#5 (# 24)
|
| K6-093 |
| $S^3/D_{24}$ | |
T5-1_1+#1_1> |
4=> K6-093-1
> K4-16 | |
* 1 2 4 -3 * 2 5 -7 -3 * 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 1 1 3 8 11 -12 -6 -2 * 4 7 9 -10 -5 4 8 -6
|
| K6-094 |
| $L(13,5)$ |
>$\Sigma(13,5)$ |
T5-1_1+#1_1> |
> $\Sigma(13,5)$ | |
* 2 5 -7 -3 * 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 1 1 2 4 -3 * 1 3 8 11 -12 -6 -2 * 4 7 9 -10 -5 4 8 -6
|
| K6-095 |
| $L(5,1)$ | | T5-1_1+#1_1> |
> $\Sigma(5,1)$ | |
* 2 5 -7 -3 * 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 4 7 9 -10 -5 * 1 2 4 8 -6 4 -3 * 1 1 3 8 11 -12 -6 -2
|
| K6-096 |
| $P^3$ | | T5-1_1+#1_1> |
> $\Sigma(2,1)$ | |
* 2 5 -7 -3 * 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 4 7 9 -10 -5 * 1 2 6 12 -11 -8 -3 * 1 1 3 -4 6 -8 -4 -2
|
| K6-097 |
| $S^3/D_{48}$ | | T5-1_1+#1_1> |
> K5-23 | |
* 1 2 4 -3 * 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 1 1 3 7 -5 -2 * 2 6 12 -11 -8 -3 * 4 7 9 -10 -5 4 8 -6
|
| K6-098 | |
$S^3/P_{48}$ | | T5-2+#1_1=> |
> K5-46 | |
* 1 2 4 -3 * 2 5 -7 -3 * 9 -11 12 -10 * 4 7 9 -12 -6 * 4 8 11 -10 -5 * 5 9 -10 -7 8 -6 * 1 1 3 8 12 -11 -6 -2
|
| K6-099 |
| $L(17,5)$ | | T5-1_1+#1_1> |
> K4-06 | |
* 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 1 1 2 4 -3 * 1 3 7 -5 -2 * 2 6 12 -11 -8 -3 * 4 7 9 -10 -5 4 8 -6
|
| K6-100 |
| $L(15,4)$ | | T5-1_1+#1_1> |
> K4-03 | |
* 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 1 2 5 -7 -3 * 4 7 9 -10 -5 * 2 4 8 -6 4 -3 * 1 1 3 8 11 -12 -6 -2
|
| K6-101 |
| $L(13,3)$ |
>K4-02 | T5-1_1+#1_1> |
> K5-07 | |
* 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 1 2 5 -7 -3 * 4 7 9 -10 -5 * 2 6 12 -11 -8 -3 * 1 1 3 -4 6 -8 -4 -2
|
| K6-102 |
| $L(18,5)$ | | T5-1_1+#1_1> |
> K4-07 | |
* 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 4 7 9 -10 -5 * 1 1 2 5 -7 -3 * 2 4 8 -6 4 -3 * 1 3 8 11 -12 -6 -2
|
| K6-103 |
| $L(17,5)$ | | T5-1_1+#1_1> |
> K4-06 | |
* 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 4 7 9 -10 -5 * 1 1 2 5 -7 -3 * 2 6 12 -11 -8 -3 * 1 3 -4 6 -8 -4 -2
|
| K6-104 |
| $S^3/P_{120}\times Z_7$ | $S^2(-1;(2,1),(3,1),(5,2))$ |
T5-2+#1_1=> |
=> K6-080 | M6-52B |
* 2 5 -7 -3 * 9 -11 12 -10 * 1 1 2 4 -3 * 4 7 9 -12 -6 * 4 8 11 -10 -5 * 5 9 -10 -7 8 -6 * 1 3 8 12 -11 -6 -2
|
| K6-105 |
| $S^3/P_{48}\times Z_7$ | $S^2(-1;(2,1),(3,1),(4,3))$ | T5-2+#1_1=> |
=> K6-066 | M6-53B |
* 1 2 4 -3 * 9 -11 12 -10 * 4 7 9 -12 -6 * 4 8 11 -10 -5 * 1 1 3 7 -5 -2 * 2 6 11 -12 -8 -3 * 5 9 -10 -7 8 -6
|
| K6-106 |
| $S^3/P_{120}\times Z_{13}$ | $S^2(-1;(2,1),(3,1),(5,3))$ | T5-2+#1_1=> |
=> K6-082 | M6-54B |
* 9 -11 12 -10 * 1 1 2 4 -3 * 1 3 7 -5 -2 * 4 7 9 -12 -6 * 4 8 11 -10 -5 * 2 6 11 -12 -8 -3 * 5 9 -10 -7 8 -6
|
| |
#(1,1),(1,2),(1,3),(2,3),(2,4),(2,5),(3,4),(3,6),(4,5),(4,6),(5,5),(6,6)
#6 (# 26)
|
| K6-107 |
| $L(8,1)$ | | #3+3#1_1 |
> K5-01 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 4 8 -10 -5 * 5 9 11 -6 * 7 10 12 -8 * 1 1 3 8 12 12 -10 9 -11 -11 -6 -2
|
| K6-108 |
| $L(13,2)$ | | #3+3#1_1 |
> K5-07 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 4 8 -10 -5 * 5 9 11 -6 * 7 10 12 12 -8 * 1 1 3 8 12 -10 9 -11 -11 -6 -2
|
| K6-109 |
| $L(17,3)$ | | #3+3#1_1 |
> K5-08 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 5 9 11 -6 * 7 10 12 -8 * 4 8 12 12 -10 -5 * 1 1 3 8 -10 9 -11 -11 -6 -2
|
| K6-110 |
| $L(20,9)$ | | #3+3#1_1 |
> K5-15 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 4 8 -10 -5 * 5 9 11 11 -6 * 7 10 12 12 -8 * 1 1 3 8 12 -10 9 -11 -6 -2
|
| K6-111 |
| $L(17,3)$ | | #3+3#1_1 |
> K5-08 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 5 9 11 -6 * 4 8 12 -10 -5 * 7 10 12 12 -8 * 1 1 3 8 -10 9 -11 -11 -6 -2
|
| K6-112 |
| $L(25,9)$ | | #3+3#1_1 |
> K5-16 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 7 10 12 -8 * 5 9 11 11 -6 * 4 8 12 12 -10 -5 * 1 1 3 8 -10 9 -11 -6 -2
|
| K6-113 |
| $L(30,11)$ | | #3+3#1_1 |
> K5-18 | |
* 1 2 4 -3 * 2 5 -7 -3 * 5 9 11 -6 * 7 10 12 -8 * 4 7 9 -11 -11 -6 * 4 8 12 12 -10 -5 * 1 1 3 8 -10 9 -6 -2
|
| K6-114 |
| $L(25,9)$ | | #3+3#1_1 |
> K5-16 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 4 8 12 -10 -5 * 5 9 11 11 -6 * 7 10 12 12 -8 * 1 1 3 8 -10 9 -11 -6 -2
|
| K6-115 |
| $S^3/Q_8\times Z_7$ | $S^2(2;(2,1),(2,1),(2,1))$ | #3+3#1_1 |
=> K6-045 | M6-45C |
* 2 5 -7 -3 * 4 7 9 -6 * 4 8 -10 -5 * 1 1 2 4 -3 * 5 9 11 11 -6 * 7 10 12 12 -8 * 1 3 8 12 -10 9 -11 -6 -2
|
| K6-116 |
| $L(27,8)$ | | #3+3#_1 | > K5-12 | |
* 1 2 4 -3 * 2 5 -7 -3 * 5 9 11 -6 * 4 8 12 -10 -5 * 7 10 12 12 -8 * 4 7 9 -11 -11 -6 * 1 1 3 8 -10 9 -6 -2
|
| K6-117 |
| $S^3/Q_{12}\times Z_7$ | $S^2(1;(2,1),(2,1),(3,1))$ | #3+3#1_1 |
=> K6-041 | M6-47C |
* 1 2 4 -3 * 4 7 9 -6 * 4 8 -10 -5 * 5 9 11 11 -6 * 7 10 12 12 -8 * 1 1 3 7 -5 -2 * 2 6 11 -9 10 -12 -8 -3
|
| K6-118 |
| $S^3/P_{24}\times Z_7$ | $S^2(0;(2,1),(2,1),(3,1))$ | #3+3#1_1 |
=> K6-059 | M6-57B |
* 1 2 4 -3 * 4 7 9 -6 * 7 10 12 -8 * 5 9 11 11 -6 * 1 1 3 7 -5 -2 * 4 8 12 12 -10 -5 * 2 6 11 -9 10 -8 -3
|
| K6-119 |
| $T^2\times I/(0,1,-1,-1)$ | $S^2(-1;(3,1),(3,1),(3,1))$ | #3+3#1_1 | | M6-65B |
* 1 2 4 -3 * 5 9 11 -6 * 7 10 12 -8 * 1 1 3 7 -5 -2 * 2 6 -9 10 -8 -3 * 4 7 9 -11 -11 -6 * 4 8 12 12 -10 -5
|
| K6-120 |
| $L(30,11)$ | | #3+3#_1 |
> K5-18 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 11 -6 * 4 8 12 -10 -5 * 5 9 -11 -11 -6 * 7 10 12 12 -8 * 1 1 3 8 -10 9 -6 -2
|
| K6-121 |
| $S^3/D_{96}$ | $S^2(1;(2,1),(2,1),(3,2))$ | #3+3#1_1 |
=> K6-049 | M6-46D |
* 2 5 -7 -3 * 4 7 9 -6 * 1 1 2 4 -3 * 4 8 12 -10 -5 * 5 9 11 11 -6 * 7 10 12 12 -8 * 1 3 8 -10 9 -11 -6 -2
|
| K6-122 |
| $S^3/P_{216}$ | $S^2(0;(2,1),(3,2),(3,1))$ | #3+3#1_1 |
=> K6-064 | M6-56C |
* 1 2 4 -3 * 4 7 9 -6 * 4 8 12 -10 -5 * 5 9 11 11 -6 * 7 10 12 12 -8 * 1 1 3 7 -5 -2 * 2 6 11 -9 10 -8 -3
|
| K6-123 |
| | $S^2(-1;(3,2),(3,1),(3,1))$ | #3+3#1_1 | | M6-63 |
* 1 2 4 -3 * 5 9 11 -6 * 4 8 12 -10 -5 * 7 10 12 12 -8 * 1 1 3 7 -5 -2 * 2 6 -9 10 -8 -3 * 4 7 9 -11 -11 -6
|
| K6-124 |
| $S^3/P_{24}\times Z_{11}$ | | #3+3#_1 |
=> K6-078 | M6-58B? |
* 2 5 -7 -3 * 1 1 2 4 -3 * 4 7 9 11 -6 * 4 8 12 -10 -5 * 5 9 -11 -11 -6 * 7 10 12 12 -8 * 1 3 8 -10 9 -6 -2
|
| K6-125 |
| | $S^2(-1;(3,2),(3,2),(3,1))$ | #3+3#1_1 | | M6-62 |
* 1 2 4 -3 * 4 7 9 11 -6 * 4 8 12 -10 -5 * 5 9 -11 -11 -6 * 7 10 12 12 -8 * 1 1 3 7 -5 -2 * 2 6 -9 10 -8 -3
|
| K6-126 |
| | $S^2(-1;(3,2),(3,2),(3,2))$ | #3+3#1_1 | | M6-64 |
* 1 1 2 4 -3 * 1 3 7 -5 -2 * 4 7 9 11 -6 * 4 8 12 -10 -5 * 5 9 -11 -11 -6 * 7 10 12 12 -8 * 2 6 -9 10 -8 -3
|
| |
#(1,1),(1,2),(1,3),(2,3),(2,4),(2,5),(3,4),(3,6),(4,5),(4,6),(5,6),(5,6)
#7 (# 27)
|
| K6-127 |
| $S^3/Q_{20}$ | |
T5-3+#_1=> |
> K5-43 | |
* 1 2 4 -3 * 2 5 -7 -3 * 4 7 9 -6 * 4 8 -10 -5 * 5 9 11 -12 -6 * 7 10 -12 11 -8 * 1 1 3 8 -12 -9 10 -11 -6 -2
|
| K6-128 |
| $S^3/D_{56}$ | $S^2(-1;(2,1),(2,1),(7,2))$ | T5-3+#_1=> |
=> K6-046 | M6-38C |
* 2 5 -7 -3 * 4 7 9 -6 * 4 8 -10 -5 * 1 1 2 4 -3 * 5 9 11 -12 -6 * 7 10 -12 11 -8 * 1 3 8 -12 -9 10 -11 -6 -2
|
| K6-129 |
| $S^3/Q_{32}\times Z_3$ | $S^2(-1;(2,1),(2,1),(8,3))$ | T5-3+#1_1=> |
=> K6-042 | M6-39C |
* 1 2 4 -3 * 4 7 9 -6 * 4 8 -10 -5 * 5 9 11 -12 -6 * 7 10 -12 11 -8 * 1 1 3 7 -5 -2 * 2 6 11 -10 9 12 -8 -3
|
| K6-130 |
| $S^3/Q_{28}\times Z_3$ | $S^2(-1;(2,1),(2,1),(7,3))$ | T5-3+#1_1=> |
=> K6-050 | M6-40C |
* 4 7 9 -6 * 4 8 -10 -5 * 1 1 2 4 -3 * 1 3 7 -5 -2 * 5 9 11 -12 -6 * 7 10 -12 11 -8 * 2 6 11 -10 9 12 -8 -3
|
| |
#(1,1),(1,2),(1,3),(2,4),(2,4),(2,5),(3,4),(3,5),(3,6),(4,6),(5,6),(5,6)
# 17
|
| K6-093-1 |
| $S^3/D_{24}$ | |
|
>
K6-093-2 | |
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,3),(2,4),(3,5),(4,5),(4,6),(4,6),(5,6),(5,6)
#8 (# 37)
|
| K6-131 |
| $2K\times_\tau I/(1,0,0,1)$ | $S^2(-2;(2,1),(2,1),(2,1),(2,1))$ | #3_2+#3_2 | | M6-68B |
* 5 7 -8 -6 * 1 -2 1 5 -3 * 2 5 -4 3 -4 * 8 11 -9 10 -9 * 8 12 -11 12 -10 * 1 6 9 -12 -7 -4 * 2 6 10 -11 -7 -3
|
| K6-132 |
| $2K\times_\tau I/(0,1,1,0)$ | $P^2(-1;(2,1),(2,1))$ | #3_2+#3_2 | | M6-72C |
* 5 7 -8 -6 * 1 -2 1 5 -3 * 2 5 -4 3 -4 * 8 11 -9 10 -9 * 8 12 -11 12 -10 * 1 6 10 -11 -7 -4 * 2 6 9 -12 -7 -3
|
| K6-133 |
| $2K\times_\tau I/(-1,1,-1,0)$ | $P^2(0;(2,1),(2,1))$ | #3_2+#3_2 | | M6-74A |
* 1 -2 1 5 -3 * 1 6 8 -7 -4 * 2 5 -4 3 -4 * 5 7 11 -9 -6 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 2 6 10 -12 -7 -3
|
| K6-134 |
| $T\times I/(-1,0,-1,-1)$ | $K^2(1)$ | #3_2+#3_2 | | M6-71B |
* 1 -2 1 5 -3 * 1 6 8 -7 -4 * 2 5 -4 3 -4 * 5 7 11 -9 -6 * 8 11 -12 11 -10 * 8 12 -9 10 -9 * 2 6 10 -12 -7 -3
|
| K6-135 | |
$2K\times_\tau I/(-1,0,-1,1)$ | $S^2(-1;(2,1),(2,1),(2,1),(2,1))$ | #3_2+#3_2 | | M6-73 |
* 1 -2 1 5 -3 * 2 5 -4 3 -4 * 2 6 8 -7 -3 * 5 7 11 -9 -6 * 8 11 -10 9 -10 * 8 12 -11 12 -9 * 1 6 10 -12 -7 -4
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,4),(2,4),(3,5),(3,5),(4,6),(4,6),(5,6),(5,6)
#9 (# 38)
|
| K6-136 | $\Sigma(Q_{24})$ | $S^3/Q_{24}$ | $S^2(-1;(2,1),(2,1),(6,1))$ |
T6-15 | | M6-37 |
* 1 -2 3 -4 * 1 5 -6 -2 * 3 7 -8 -4 * 5 9 -10 -6 * 7 11 -12 -8 * 9 -11 12 -10 * 1 6 9 -12 -7 -4 2 5 10 -11 -8 -3
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,4),(2,4),(3,5),(3,6),(4,5),(4,6),(5,6),(5,6)
#10 (# 39)
|
| K6-137 |
| $S^3/P_{120}$ | |
T6-16=> |
> K5-50 | |
* 1 -2 3 -4 * 1 5 -6 -2 * 7 -9 10 -8 * 3 7 11 -8 -4 * 5 10 -12 -9 -6 * 1 6 10 -11 12 -8 -3 * 2 5 9 11 -12 -7 -4
|
| K6-138 |
| L(13,3) |
->K4-2 |
T6-01_1=> |
> K5-07 | |
* 1 -2 3 -4 * 1 5 -6 -2 * 1 6 9 -7 -3 * 2 5 10 -8 -4 * 3 8 -11 -7 -4 * 5 9 12 -10 -6 * 7 12 -11 -9 10 -11 12 -8
|
| K6-139 |
| $L(14,3)$ | |
T6-01_1=> |
> K4-05 | |
* 1 -2 3 -4 * 1 5 -6 -2 * 1 6 9 -7 -3 * 2 5 10 -8 -4 * 3 8 -11 -7 -4 * 9 11 -12 11 -10 * 5 9 12 -8 7 12 -10 -6
|
| K6-140 |
K6-140a |
$S^3/P_{48}\times Z_5$ | $S^2(-1;(2,1),(3,2),(4,1))$ |
T6-02_1=> |
=> K6-067 | M6-55B |
* 1 -2 3 -4 * 1 5 -6 -2 * 3 7 11 -8 -4 * 9 11 -12 11 -10 * 1 6 9 12 -8 -3 * 2 5 10 -12 -7 -4 * 5 9 -7 8 -10 -6
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,4),(2,5),(3,4),(3,5),(4,6),(4,6),(5,6),(5,6)
#11 (# 40)
|
| K6-141 |
| $S^3/Q_8\times Z_3$ | |
T6-17> |
> K4-13 | |
* 1 -2 3 -4 * 1 5 -7 -3 * 2 6 -8 -4 * 5 9 -11 -6 * 7 10 -12 -8 * 9 -12 11 -10 * 1 6 12 -11 -8 -3 4 7 9 -10 -5 -2
|
| K6-142 |
| $S^3/Q_{16}\times Z_3$ | |
T6-18> |
> K5-41 | |
* 1 -2 3 -4 * 1 5 -7 -3 * 2 6 -8 -4 * 9 -11 12 -10 * 1 6 11 -10 -5 -2 * 3 8 12 -9 -7 -4 * 5 9 -10 -7 8 11 -12 -6
|
| K6-143 |
| $T\times I/(0,1,-1,0)$ | $S^2(-1;(2,1),(4,1),(4,1))$ |
T6-19 | | M6-69B |
* 1 -2 3 -4 * 5 -7 8 -6 * 9 -11 12 -10 * 1 5 9 -10 -7 -3 * 1 6 11 -10 -5 -2 * 2 6 12 -11 -8 -4 * 3 8 12 -9 -7 -4
|
| |
#(1,2),(1,2),(1,3),(1,3),(2,4),(2,5),(3,4),(3,6),(4,5),(4,6),(5,6),(5,6)
#12 (# 41)
|
| K6-144 |
| $S^3/D_{56}$ | $S^2(-1;(2,1),(2,1),(7,2))$ |
T6-03_1=> |
=> K6-046 | M6-38D |
* 1 -2 3 -4 * 5 10 -11 -6 * 7 9 11 -8 * 1 5 9 -6 -2 * 3 8 -10 -7 -4 * 9 12 -11 12 -10 * 1 6 12 -8 -4 2 5 -7 -3
|
| |
#(1,2),(1,2),(1,3),(1,4),(2,3),(2,5),(3,4),(3,6),(4,5),(4,6),(5,6),(5,6)
#13 (# 43)
|
| K6-145 |
K6-145a | $S^3/P_{72}$ | |
T6-04_2> |
> K5-36 | |
* 1 5 7 -4 * 2 6 -9 -4 * 7 9 11 -8 * 1 6 12 -8 -3 * 9 12 -11 12 -10 * 3 -5 6 11 -10 -4 * 1 -2 3 7 10 -8 -5 -2
|
| K6-146 |
| $S^3/P_{24}\times Z_5$ | |
T6-05_2> |
> K5-38 | |
* 1 5 7 -4 * 7 9 11 -8 * 1 -2 3 -5 -2 * 1 6 12 -8 -3 * 2 6 11 -10 -4 * 9 12 -11 12 -10 * 3 7 10 -8 -5 6 -9 -4
|
| K6-147 |
| $S^3/P_{24}\times Z_5$ | |
T6-04_2> |
> ;K5-38 | |
* 1 5 7 -4 * 7 9 11 -8 * 1 -2 3 -5 -2 * 2 6 11 -10 -4 * 1 6 -9 10 -8 -3 * 3 7 10 -12 -9 -4 * 5 8 -12 11 -12 -6
|
| K6-148 |
| $2K\times_\tau I/(0,1,1,0)$ | $P^2(-1;(2,1),(2,1))$ |
T6-06_1=> |
=> K6-132 | M6-72D |
* 3 8 -10 -4 * 5 7 9 -6 * 1 -2 1 5 -3 * 9 11 -12 11 -10 * 1 6 11 -8 7 -4 * 2 5 8 -12 -9 -4 * 2 6 12 -10 -7 -3
|
| K6-149 |
| $S^3/P_{120}\times Z_7$ | $S^2(-1;(2,1),(3,1),(5,2))$ |
T6-07_1=> |
=> K6-080 | M6-52C |
* 1 5 7 -4 * 1 -2 3 -5 -2 * 1 6 11 -8 -3 * 5 8 -10 9 -6 * 7 10 -11 12 -8 * 2 6 12 -11 -9 -4 * 3 7 9 12 -10 -4
|
| K6-150 |
| $2K\times_\tau I/(-1,1,-1,0)$ | $P^2(0;(2,1),(2,1))$ |
T6-08_2< |
=> K6-133 | M6-74B |
* 1 -2 1 5 -3 * 2 5 8 -10 -4 * 2 6 -9 -7 -3 * 3 8 -11 -9 -4 * 5 7 10 -11 -6 * 9 12 -11 12 -10 * 1 6 12 -8 7 -4
|
| |
#(1,2),(1,2),(1,3),(1,4),(2,5),(2,6),(3,4),(3,5),(3,6),(4,5),(4,6),(5,6)
#14 (# 46)
|
| K6-151 |
| $S^3/P_{120}$ | |
T6-20> |
> K5-50 | |
* 3 8 -10 -4 * 5 -8 9 -6 * 7 11 -12 -8 * 1 -2 3 7 -4 * 1 5 12 -6 -2 * 1 6 -11 10 12 -9 -3 * 2 5 -10 -7 9 -11 -4
|
| |
#(1,2),(1,2),(1,3),(1,4),(2,5),(2,6),(3,5),(3,5),(3,6),(4,5),(4,6),(4,6)
#15 (# 47)
|
| K6-152 |
| $S^3/P_{24}$ | |
T6-09_2> |
> K4-17 | |
* 1 5 -7 -3 * 1 6 -11 -4 * 2 5 -10 -4 * 3 9 -12 -4 * 8 -10 11 -9 * 1 -2 3 8 -7 9 -6 -2 * 5 -8 7 -10 12 -11 12 -6
|
| K6-153 |
| $S^3/P_{72}$ | |
T6-09_2> |
> K5-36 | |
* 1 5 -7 -3 * 1 6 -11 -4 * 2 5 -10 -4 * 7 -10 12 -9 * 3 8 -10 11 -12 -4 * 5 -8 7 -8 9 -6 * 1 -2 3 9 -11 12 -6 -2
|
| K6-154 |
| $S^3/P_{24}\times Z_5$ | |
T6-09_2> |
> K5-38 | |
* 1 5 -7 -3 * 1 6 -11 -4 * 7 -10 12 -9 * 1 -2 3 9 -6 -2 * 2 5 -10 11 -12 -4 * 3 8 -7 8 -10 -4 * 5 -8 9 -11 12 -6
|
| |
#(1,2),(1,3),(1,4),(1,5),(2,3),(2,4),(2,6),(3,5),(3,6),(4,5),(4,6),(5,6)
#16 (# 48)
|
| K6-155 |
| $S^3/D_{24}$ | |
T6-21> |
> K4-16 | |
* 1 5 8 -4 * 1 7 -9 -2 * 2 -5 6 -3 * 3 11 -12 -4 * 6 10 12 -7 * 8 -10 11 -9 * 1 6 11 -7 5 9 -12 -8 -2 4 -10 -3
|
| K6-156 |
| $S^3/P_{72}$ | |
T6-10_1> |
4=>
K6-145 | |
* 1 5 8 -4 * 1 7 -9 -2 * 2 8 -10 -3 * 3 11 -12 -4 * 5 9 -12 -10 -6 * 1 6 11 -7 6 -3 * 2 -5 7 -12 -8 9 -11 10 -4
|
| K6-157 |
| $L(11,3)$ | |
T6-11_2> |
> $\Sigma(11,3)$ | @ |
* 1 5 8 -4 * 1 7 -9 -2 * 8 -10 11 -9 * 2 -5 7 -12 -4 * 2 8 12 -11 -3 * 5 9 -12 -10 -6 * 1 6 11 -7 6 -3 4 -10 -3
|
| K6-158 |
| $L(13,5)$ | |
T6-11_2> |
> $\Sigma(13,5)$ | |
* 1 5 8 -4 * 1 7 -9 -2 * 8 -10 11 -9 * 2 -5 7 -12 -4 * 2 8 12 -11 -3 * 1 6 -3 4 -10 -3 * 5 9 -12 -10 -6 7 -11 -6
|
| K6-159 |
| $2K\times_\tau I/(0,1,1,0)$ | $P^2(-1;(2,1),(2,1))$ |
T6-12_2=> |
=>
K6-148 | M6-72B |
* 1 5 8 -4 * 2 9 -11 -3 * 6 10 12 -7 * 1 6 -3 4 -10 -3 * 1 7 -11 10 -8 -2 * 2 -5 6 11 -12 -4 * 5 9 -12 -8 9 -7
|
| K6-160 |
| $2K\times_\tau I/(1,0,0,1)$ | $S^2(-2;(2,1),(2,1),(2,1),(2,1))$ |
T6-22 |
=> K6-131 proper | M6-68A |
* 1 5 8 -4 * 2 9 -11 -3 * 6 10 12 -7 * 1 6 11 -12 -8 -2 * 1 7 -9 8 -10 -3 * 2 -5 7 -11 10 -4 * 3 -6 5 9 -12 -4
|
| K6-161 |
| $2K\times_\tau I/(1,0,0,1)$ | $S^2(-2;(2,1),(2,1),(2,1),(2,1))$ |
T6-13_4 | | |
* 1 7 -12 -4 * 2 9 -11 -3 * 5 8 -10 -6 * 1 5 -2 1 6 -3 * 2 8 -4 3 10 -4 * 5 9 -7 6 11 -7 * 8 12 -11 10 12 -9
|
| K6-162 |
| $2K\times_\tau I/(0,1,1,0)$ | $P^2(-1;(2,1),(2,1))$ |
T6-14_4 |
=> K6-132 | M6-72A |
* 1 7 -12 -4 * 2 9 -11 -3 * 5 8 -10 -6 * 1 5 -2 1 6 -3 * 2 8 -4 3 10 -4 * 5 9 -12 -8 9 -7 * 6 11 -12 -10 11 -7
|
| K6-163 |
| $T\times I/(1,0,0,1)$ | $T^2(0)$ |
T6-23 | proper | M6-66 |
* 1 7 -12 -4 * 2 9 -11 -3 * 5 8 -10 -6 * 1 5 9 -12 -10 -3 * 1 6 11 -12 -8 -2 * 2 -5 7 -11 10 -4 * 3 -6 7 -9 8 -4
|
| K6-164 |
| $T\times I/(1,-1,1,0)$ | $S^2(-1;(2,1),(3,1),(6,1))$ |
T6-24 | | M6-67 |
* 1 5 8 -4 * 6 10 12 -7 * 1 6 11 -9 -2 * 2 -5 7 -11 -3 * 1 7 -9 8 -10 -3 * 2 8 12 -11 10 -4 * 3 -6 5 9 -12 -4
|
| K6-165 |
| $T\times I/(0,1,-1,-1)$ | $S^2(-1;(3,1),(3,1),(3,1))$ |
T6-25=> |
=> K6-119 | M6-65A? |
* 1 7 -12 -4 * 2 9 -11 -3 * 1 5 8 -10 -3 * 2 -5 6 10 -4 * 1 6 11 -12 -8 -2 * 3 -6 7 -9 8 -4 * 5 9 -12 -10 11 -7
|
| K6-166 |
| $T\times I/(0,1,-1,0)$ | $S^2(-1;(2,1),(4,1),(4,1))$ |
T6-26 |
=> K6-143 | M6-69A |
* 1 7 -12 -4 * 1 5 8 -10 -3 * 1 6 11 -9 -2 * 2 8 12 -11 -3 * 5 9 -12 -10 -6 * 2 -5 7 -9 8 -4 * 3 -6 7 -11 10 -4
|
| K6-167 |
| $T\times I/(1,0,1,1)$ | $T^2(1)$ |
T6-27 | $\Sigma(B(2,3,6))$ proper | M6-70 |
* 1 5 8 -10 -3 * 1 6 11 -9 -2 * 1 7 -9 8 -4 * 2 8 12 -11 -3 * 3 -6 7 -12 -4 * 5 9 -12 -10 -6 * 2 -5 7 -11 10 -4
|
| K6-168 |
| $T\times I/(-1,0,-1,-1)$ | $K^2(1)$ |
T6-28 |
=> K6-134 proper | M6-71A |
* 1 5 8 -10 -3 * 1 6 11 -9 -2 * 1 7 -11 10 -4 * 2 -5 7 -12 -4 * 2 8 12 -11 -3 * 5 9 -12 -10 -6 * 3 -6 7 -9 8 -4
|