pgenerator 0-6


num old-name boundary name manifold etc(reduce) data
emptyK-1T-1 $S^3$$\Sigma(0,1)$
K-2T-2 $P^3$$\Sigma(2,1)$
0#01T0 solid torus
1#12T1 $T^2\times I$ * 1 1 2 * 1 -2 -2
2#2K2-4T2 $S^3/Q_8$$\Sigma(Q_8)$ * 1 -2 3 -4 * 1 -3 4 -2 * 1 -4 2 -3
3#33 T3-1 $C_3\times S^1$ * 1 5 -3 * 1 6 -4 * 2 5 -4 * 1 -2 3 -4 3 -6 5 -6 -2
#3(4^3,6)K3-7 T3-2 $S^3/Q_{12}$$\Sigma(Q_{12})$ * 1 -2 3 -4 * 1 5 -6 -2 * 3 -6 5 -4 * 1 6 -4 2 5 -3
4#4-2(4^2,6)1 T4-1 $t I-bdl/K$-> #3_2+#1 * 1 5 7 -4 * 1 6 -8 -3 * 1 -2 3 -5 -2 * 2 6 -7 8 -4 * 3 7 -8 -5 6 -4
#4-1(4^4,8)K4-15 T4-2 $S^3/Q_{16}$$\Sigma(Q_{16})$ * 1 -2 3 -4 * 1 5 -6 -2 * 3 7 -8 -4 * 5 -7 8 -6 * 1 6 -7 -4 2 5 -8 -3
#4-2(4,5^4)K4-17 T4-3 $S^3/P_{24}$$\Sigma(B(2,3,4))$ * 3 -5 6 -4 * 1 -2 3 7 -4 * 1 5 7 -8 -3 * 1 6 -8 -5 -2 * 2 6 -7 8 -4
5#5-2(4^3)2 T5-1 > #3+#1_1 * 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
#5-2(4,5^2,6)1 T5-2 trefoil => #3_1+#1_1+#1 * 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
#5-3(4^2,5^2)1 T5-3 $t I-bdl/K$ => T4-1+#1 * 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
#5-1(4^5,10)K5-43 T5-4 $S^3/Q_{20}$ * 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
#5-2(4^2,5^2,6^2)K5-46 T5-5 $S^3/P_{48}$ -> T5-6 * 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
#5-4(4^3,6^3)K5-49 T5-6 $S^3/P_{48}$=> T5-5 * 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
#5-4(5^6)K5-50 T5-7 $S^3/P_{120}$$\Sigma(B(2,3,5))$ * 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#6-2(4^2,5^2)2 T6-01 > #3+#1^2_1 * 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
#6-2(4^2,6^3)1 T6-02 $t I-bdl/K$=> T5-3+#1 #3_1+#1^2_1+#1 * 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
#6-4(4^3,5^2)1 T6-03 $t I-bdl/K$ => T5-3+#1 * 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
#6-6(4^2,6)2 T6-04 > #3_1+2#1 * 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
#6-6(4^2,8)2 T6-05 -> T6-04 * 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
#6-6(4^2,6^2)2 T6-06 => #3_2+#3 * 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
#6-6(4,5^3,6)1 T6-07 trefoil=> T5-2+#1 * 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
#6-6(5^4)2 T6-08 < T6-12+#1 * 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
#6-10(4^3)2 T6-09 -> T6-04 * 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
#6-11(4^4,9)1 T6-10 trefoil> T5-2 * 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
#6-11(4^3,5)2 T6-11 > #3+#1_1 * 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
#6-11(4^2,6^2)2 T6-12 => T6-06 * 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
#6-11(4^2)4 T6-13 $C_4\times S^1$ -> #3+#3 * 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
#6-11(4)4 T6-14 $2C_3\times S^1$ -> #3+#3 * 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
#6-1(4^6,12)K6-136 T6-15 $S^3/Q_{24}$$\Sigma(Q_24)$ * 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
#6-2(4^3,5^2,7^2)K6-137 T6-16 $S^3/P_{120}$-> T5-7 * 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
#6-3(4^6,12)K6-141 T6-17 > #3_2+#1_1 * 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
#6-3(4^4,6^2,8)K6-142 T6-18 $S^3/Q_{16}\times Z_3$ > 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
#6-3(4^3,6^4)K6-143 T6-19 Seifert/$S^2$=> T6-26 * 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
#6-9(4^3,5^2,7^2)K6-151 T6-20 $S^3/P_{120}$ > T5-7 * 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
#6-11(4^6,12)K6-155 T6-21 $S^3/P_{120}$=> T6-16 * 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
#6-11(4^3,6^4)_2K6-160 T6-22 Seifert/$S^2$ -> T6-13_4 * 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
#6-11(4^3,6^4)_1K6-163 T6-23 $T^2\times S^1$ * 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
#6-11(4^2,5^2,6^3)_1K6-164 T6-24 Seifert/$S^2$ * 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
#6-11(4^2,5^2,6^3)_2K6-165 T6-25 Seifert/$S^2$=> #3+3#1_1 * 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
#6-11(4,5^4,6^2)K6-166 T6-26 Seifert/$S^2$=> T6-19 * 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
#6-11(5^6,6)_1K6-167 T6-27 $T^2-bdl/S^1$ * 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
#6-11(5^6,6)_2K6-168 T6-28 $T^2-bdl/S^1$ * 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
Last modified: 2023/12/30 00:48