Magma V2.19-8 Tue Aug 20 2013 18:15:19 on localhost [Seed = 408526904] Type ? for help. Type -D to quit. Loading file "11_320__sl2_c1.magma" ==TRIANGULATION=BEGINS== % Triangulation 11_320 geometric_solution 13.15024235 oriented_manifold CS_known -0.0000000000000007 1 0 torus 0.000000000000 0.000000000000 14 1 2 3 4 0132 0132 0132 0132 0 0 0 0 0 0 0 0 0 0 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 -1 0 0 -9 9 0 0 0 0 -1 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.732184751167 0.722516675119 0 5 7 6 0132 0132 0132 0132 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -1 0 1 0 0 0 0 1 -1 0 0 0 -10 10 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.273059524464 1.027646246481 6 0 9 8 0132 0132 0132 0132 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 0 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 9 0 -9 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.308035580824 0.682827429343 8 10 11 0 0132 0132 0132 0132 0 0 0 0 0 0 0 0 -1 0 0 1 0 0 0 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 -1 -9 0 0 9 0 1 0 -1 10 -10 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.871166144739 0.727400324035 10 12 0 13 0132 0132 0132 0132 0 0 0 0 0 0 0 0 0 0 -1 1 0 -1 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -1 1 0 0 0 -9 9 -1 -9 0 10 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1.073533539991 0.761144772929 6 1 9 13 1023 0132 1023 2031 0 0 0 0 0 0 0 0 0 0 0 0 0 1 0 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 0 -1 0 0 0 0 0 10 0 -10 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -0.072088566926 0.898723899419 2 5 1 12 0132 1023 0132 0132 0 0 0 0 0 0 0 0 0 0 0 0 -1 0 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -1 1 0 0 0 0 -9 0 0 9 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.236085097226 1.332944480113 10 9 11 1 3120 1023 3120 0132 0 0 0 0 0 0 0 0 -1 0 1 0 1 0 0 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -10 0 10 0 10 0 0 -10 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.062378775211 0.919168083841 3 10 2 13 0132 0213 0132 0213 0 0 0 0 0 0 0 0 1 0 0 -1 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 9 0 0 -9 -10 10 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.458782463689 0.648562148659 7 11 5 2 1023 3120 1023 0132 0 0 0 0 0 0 0 0 0 0 0 0 0 -1 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -9 0 9 0 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -0.125752411674 1.301661674946 4 3 8 7 0132 0132 0213 3120 0 0 0 0 0 0 0 0 0 0 -1 1 0 1 0 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -10 10 0 10 0 -10 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.547800480933 0.459217082913 12 9 7 3 3120 3120 3120 0132 0 0 0 0 0 0 0 0 1 0 -1 0 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 0 -1 10 0 -10 0 -9 9 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.638978603255 1.161979734862 13 4 6 11 0213 0132 0132 3120 0 0 0 0 0 0 0 0 1 0 0 -1 -1 0 0 1 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 -1 0 10 0 0 -10 -9 0 0 9 0 9 -9 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.636632338030 0.660782469651 12 5 4 8 0213 1302 0132 0213 0 0 0 0 0 0 0 0 1 0 -1 0 -1 0 0 1 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 9 0 -9 0 -10 1 0 9 0 10 -10 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.543862706670 0.533159050527 ==TRIANGULATION=ENDS== PY=EVAL=SECTION=BEGINS=HERE {'variable_dict' : (lambda d, negation = (lambda x:-x): { 'c_1001_11' : negation(d['c_0101_5']), 'c_1001_10' : d['c_1001_0'], 'c_1001_13' : d['c_0110_5'], 'c_1001_12' : d['c_0110_5'], 'c_1001_5' : d['c_0101_5'], 'c_1001_4' : negation(d['c_0011_11']), 'c_1001_7' : d['c_0101_5'], 'c_1001_6' : d['c_0101_5'], 'c_1001_1' : d['c_0011_13'], 'c_1001_0' : d['c_1001_0'], 'c_1001_3' : negation(d['c_0011_7']), 'c_1001_2' : negation(d['c_0011_11']), 'c_1001_9' : d['c_0101_5'], 'c_1001_8' : d['c_1001_0'], 'c_1010_13' : d['c_1010_13'], 'c_1010_12' : negation(d['c_0011_11']), 'c_1010_11' : negation(d['c_0011_7']), 'c_1010_10' : negation(d['c_0011_7']), 's_3_11' : d['1'], 's_0_11' : d['1'], 's_0_12' : d['1'], 's_3_12' : d['1'], 's_2_8' : d['1'], 'c_0101_12' : d['c_0011_13'], 'c_0101_11' : d['c_0101_11'], 'c_0101_10' : d['c_0011_10'], 's_2_0' : d['1'], 's_2_1' : d['1'], 's_2_2' : d['1'], 's_2_3' : d['1'], 's_2_4' : d['1'], 's_2_5' : d['1'], 's_2_6' : negation(d['1']), 's_2_7' : d['1'], 's_2_12' : d['1'], 's_2_13' : d['1'], 's_2_10' : d['1'], 's_2_11' : d['1'], 's_0_8' : d['1'], 's_0_9' : d['1'], 's_0_6' : d['1'], 's_0_7' : d['1'], 's_0_4' : d['1'], 's_0_5' : negation(d['1']), 's_0_2' : d['1'], 's_0_3' : d['1'], 's_0_0' : d['1'], 's_0_1' : d['1'], 'c_0011_11' : d['c_0011_11'], 'c_1100_8' : d['c_1010_13'], 'c_0011_13' : d['c_0011_13'], 'c_0011_12' : d['c_0011_10'], 'c_1100_5' : negation(d['c_1010_13']), 'c_1100_4' : negation(d['c_0101_7']), 'c_1100_7' : negation(d['c_0101_11']), 'c_1100_6' : negation(d['c_0101_11']), 'c_1100_1' : negation(d['c_0101_11']), 'c_1100_0' : negation(d['c_0101_7']), 'c_1100_3' : negation(d['c_0101_7']), 'c_1100_2' : d['c_1010_13'], 's_0_10' : d['1'], 'c_1100_11' : negation(d['c_0101_7']), 'c_1100_10' : negation(d['c_0101_7']), 'c_1100_13' : negation(d['c_0101_7']), 's_3_10' : d['1'], 's_3_13' : d['1'], 'c_1010_7' : d['c_0011_13'], 'c_1010_6' : d['c_0110_5'], 'c_1010_5' : d['c_0011_13'], 'c_1010_4' : d['c_0110_5'], 'c_1010_3' : d['c_1001_0'], 'c_1010_2' : d['c_1001_0'], 'c_1010_1' : d['c_0101_5'], 'c_1010_0' : negation(d['c_0011_11']), 'c_1010_9' : negation(d['c_0011_11']), 'c_1010_8' : negation(d['c_0101_7']), 's_3_1' : negation(d['1']), 's_3_0' : d['1'], 's_3_3' : d['1'], 's_3_2' : d['1'], 's_3_5' : d['1'], 's_3_4' : d['1'], 's_3_7' : d['1'], 's_3_6' : d['1'], 's_3_9' : d['1'], 's_3_8' : d['1'], 'c_1100_12' : negation(d['c_0101_11']), 's_1_7' : d['1'], 's_1_6' : negation(d['1']), 's_1_5' : negation(d['1']), 's_1_4' : d['1'], 's_1_3' : d['1'], 's_1_2' : d['1'], 's_1_1' : negation(d['1']), 's_1_0' : d['1'], 's_1_9' : d['1'], 's_1_8' : d['1'], 'c_0011_9' : d['c_0011_7'], 'c_0011_8' : d['c_0011_10'], 'c_0011_5' : d['c_0011_0'], 'c_0011_4' : negation(d['c_0011_10']), 'c_0011_7' : d['c_0011_7'], 'c_0011_6' : d['c_0011_0'], 'c_0011_1' : negation(d['c_0011_0']), 'c_0011_0' : d['c_0011_0'], 'c_0011_3' : negation(d['c_0011_10']), 'c_0011_2' : negation(d['c_0011_0']), 'c_0110_11' : d['c_0101_3'], 'c_0110_10' : d['c_0101_1'], 'c_0110_13' : negation(d['c_0101_3']), 'c_0110_12' : d['c_0101_3'], 's_0_13' : d['1'], 'c_0110_0' : d['c_0101_1'], 'c_0101_7' : d['c_0101_7'], 'c_0101_6' : d['c_0101_0'], 'c_0101_5' : d['c_0101_5'], 'c_0101_4' : d['c_0101_1'], 'c_0101_3' : d['c_0101_3'], 'c_0101_2' : d['c_0011_13'], 'c_0101_1' : d['c_0101_1'], 'c_0101_0' : d['c_0101_0'], 'c_0101_9' : d['c_0101_5'], 'c_0101_8' : d['c_0101_0'], 'c_0011_10' : d['c_0011_10'], 's_1_13' : d['1'], 's_1_12' : d['1'], 's_1_11' : d['1'], 's_1_10' : d['1'], 'c_0110_9' : d['c_0011_13'], 'c_0110_8' : d['c_0101_3'], 'c_0110_1' : d['c_0101_0'], 'c_1100_9' : d['c_1010_13'], 'c_0110_3' : d['c_0101_0'], 'c_0110_2' : d['c_0101_0'], 'c_0110_5' : d['c_0110_5'], 'c_0110_4' : d['c_0011_10'], 'c_0110_7' : d['c_0101_1'], 'c_0110_6' : d['c_0011_13'], 's_2_9' : d['1'], 'c_0101_13' : d['c_0011_10']})} PY=EVAL=SECTION=ENDS=HERE PRIMARY=DECOMPOSITION=BEGINS=HERE [ Ideal of Polynomial ring of rank 15 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_13, c_0011_7, c_0101_0, c_0101_1, c_0101_11, c_0101_3, c_0101_5, c_0101_7, c_0110_5, c_1001_0, c_1010_13 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 1 Groebner basis: [ t - 1/108, c_0011_0 - 1, c_0011_10 + 1, c_0011_11 - 3, c_0011_13 + 2, c_0011_7 - 1, c_0101_0 - 1, c_0101_1 + 1, c_0101_11 - 3, c_0101_3 + 3, c_0101_5 - 1, c_0101_7 - 2, c_0110_5 + 1, c_1001_0 - 1, c_1010_13 + 1 ], Ideal of Polynomial ring of rank 15 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_13, c_0011_7, c_0101_0, c_0101_1, c_0101_11, c_0101_3, c_0101_5, c_0101_7, c_0110_5, c_1001_0, c_1010_13 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 4 Groebner basis: [ t - 161*c_1010_13^3 + 29*c_1010_13^2 - 350/3*c_1010_13 + 7/3, c_0011_0 - 1, c_0011_10 - 3*c_1010_13^3 + 3*c_1010_13^2 - 3*c_1010_13 + 1, c_0011_11 - 3*c_1010_13^3 + 3*c_1010_13^2 - 2*c_1010_13 + 1, c_0011_13 - c_1010_13 + 1, c_0011_7 + 3*c_1010_13^2 - c_1010_13 + 2, c_0101_0 + 3*c_1010_13^3 - 3*c_1010_13^2 + 2*c_1010_13 - 1, c_0101_1 - c_1010_13, c_0101_11 + 3*c_1010_13^3 + 1, c_0101_3 + 3*c_1010_13^2 - c_1010_13 + 2, c_0101_5 + 3*c_1010_13^3 - 3*c_1010_13^2 + 3*c_1010_13 - 1, c_0101_7 + 1, c_0110_5 + 3*c_1010_13^3 + 1, c_1001_0 - c_1010_13 + 1, c_1010_13^4 - c_1010_13^3 + 4/3*c_1010_13^2 - 2/3*c_1010_13 + 1/3 ], Ideal of Polynomial ring of rank 15 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_13, c_0011_7, c_0101_0, c_0101_1, c_0101_11, c_0101_3, c_0101_5, c_0101_7, c_0110_5, c_1001_0, c_1010_13 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 8 Groebner basis: [ t - 13/1440*c_1010_13^7 + 29/4320*c_1010_13^6 - 71/480*c_1010_13^5 + 389/1440*c_1010_13^4 - 2869/4320*c_1010_13^3 + 2077/4320*c_1010_13^2 - 1393/1440*c_1010_13 + 167/288, c_0011_0 - 1, c_0011_10 - 7/96*c_1010_13^7 + 17/96*c_1010_13^6 - 21/32*c_1010_13^5 + 83/96*c_1010_13^4 - 63/32*c_1010_13^3 + 97/96*c_1010_13^2 - 65/32*c_1010_13 + 15/32, c_0011_11 - 1/48*c_1010_13^7 - 1/48*c_1010_13^6 - 3/16*c_1010_13^5 + 29/48*c_1010_13^4 - 25/16*c_1010_13^3 + 79/48*c_1010_13^2 - 39/16*c_1010_13 + 49/16, c_0011_13 - 1, c_0011_7 - 23/96*c_1010_13^7 + 49/96*c_1010_13^6 - 37/32*c_1010_13^5 + 115/96*c_1010_13^4 - 79/32*c_1010_13^3 + 161/96*c_1010_13^2 - 17/32*c_1010_13 + 47/32, c_0101_0 + 5/48*c_1010_13^7 - 19/48*c_1010_13^6 + 15/16*c_1010_13^5 - 73/48*c_1010_13^4 + 29/16*c_1010_13^3 - 131/48*c_1010_13^2 + 19/16*c_1010_13 - 13/16, c_0101_1 - c_1010_13, c_0101_11 - 7/96*c_1010_13^7 + 17/96*c_1010_13^6 - 21/32*c_1010_13^5 + 83/96*c_1010_13^4 - 63/32*c_1010_13^3 + 193/96*c_1010_13^2 - 65/32*c_1010_13 + 47/32, c_0101_3 + 7/96*c_1010_13^7 - 17/96*c_1010_13^6 + 21/32*c_1010_13^5 - 83/96*c_1010_13^4 + 63/32*c_1010_13^3 - 193/96*c_1010_13^2 + 65/32*c_1010_13 - 47/32, c_0101_5 + 7/96*c_1010_13^7 - 17/96*c_1010_13^6 + 21/32*c_1010_13^5 - 83/96*c_1010_13^4 + 63/32*c_1010_13^3 - 97/96*c_1010_13^2 + 65/32*c_1010_13 - 15/32, c_0101_7 + 1, c_0110_5 + 23/96*c_1010_13^7 - 49/96*c_1010_13^6 + 37/32*c_1010_13^5 - 115/96*c_1010_13^4 + 79/32*c_1010_13^3 - 161/96*c_1010_13^2 + 17/32*c_1010_13 - 47/32, c_1001_0 - 1, c_1010_13^8 - 2*c_1010_13^7 + 6*c_1010_13^6 - 8*c_1010_13^5 + 18*c_1010_13^4 - 16*c_1010_13^3 + 18*c_1010_13^2 - 18*c_1010_13 + 9 ], Ideal of Polynomial ring of rank 15 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_13, c_0011_7, c_0101_0, c_0101_1, c_0101_11, c_0101_3, c_0101_5, c_0101_7, c_0110_5, c_1001_0, c_1010_13 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 8 Groebner basis: [ t - 2842541/504*c_1010_13^7 + 3940771/168*c_1010_13^6 - 1427587/24*c_1010_13^5 + 9588679/84*c_1010_13^4 - 25721225/126*c_1010_13^3 + 855129/4*c_1010_13^2 - 13049489/63*c_1010_13 + 28336519/504, c_0011_0 - 1, c_0011_10 - 1/8*c_1010_13^7 + 13/24*c_1010_13^6 - 29/24*c_1010_13^5 + 7/3*c_1010_13^4 - 17/4*c_1010_13^3 + 11/3*c_1010_13^2 - 47/12*c_1010_13 - 1/24, c_0011_11 + 1/12*c_1010_13^7 - 5/12*c_1010_13^6 + 3/4*c_1010_13^5 - 5/3*c_1010_13^4 + 7/3*c_1010_13^3 - 3*c_1010_13^2 + 2*c_1010_13 - 3/4, c_0011_13 - 1/24*c_1010_13^7 + 5/24*c_1010_13^6 - 7/24*c_1010_13^5 + 3/4*c_1010_13^4 - 5/6*c_1010_13^3 + 7/12*c_1010_13^2 - 1/3*c_1010_13 - 1/24, c_0011_7 + 1/24*c_1010_13^7 - 1/8*c_1010_13^6 + 7/24*c_1010_13^5 - 1/6*c_1010_13^4 + 7/12*c_1010_13^3 + 1/6*c_1010_13^2 - 1/12*c_1010_13 + 23/24, c_0101_0 + 1/12*c_1010_13^7 - 5/12*c_1010_13^6 + 13/12*c_1010_13^5 - 2*c_1010_13^4 + 11/3*c_1010_13^3 - 11/3*c_1010_13^2 + 11/3*c_1010_13 - 5/12, c_0101_1 - 1/24*c_1010_13^7 + 5/24*c_1010_13^6 - 7/24*c_1010_13^5 + 3/4*c_1010_13^4 - 5/6*c_1010_13^3 + 7/12*c_1010_13^2 - 1/3*c_1010_13 - 25/24, c_0101_11 + 5/24*c_1010_13^7 - 5/8*c_1010_13^6 + 35/24*c_1010_13^5 - 17/6*c_1010_13^4 + 47/12*c_1010_13^3 - 25/6*c_1010_13^2 + 31/12*c_1010_13 - 5/24, c_0101_3 + 1/12*c_1010_13^6 - 1/6*c_1010_13^5 + 5/12*c_1010_13^4 - 5/4*c_1010_13^3 + 19/12*c_1010_13^2 - 25/12*c_1010_13 + 5/12, c_0101_5 - 1/12*c_1010_13^7 + 1/3*c_1010_13^6 - 3/4*c_1010_13^5 + 17/12*c_1010_13^4 - 11/4*c_1010_13^3 + 9/4*c_1010_13^2 - 9/4*c_1010_13 + 1/6, c_0101_7 - 5/24*c_1010_13^7 + 17/24*c_1010_13^6 - 43/24*c_1010_13^5 + 41/12*c_1010_13^4 - 35/6*c_1010_13^3 + 67/12*c_1010_13^2 - 5*c_1010_13 + 11/24, c_0110_5 + 1/12*c_1010_13^6 - 1/6*c_1010_13^5 + 3/4*c_1010_13^4 - 11/12*c_1010_13^3 + 19/12*c_1010_13^2 - 7/4*c_1010_13 + 3/4, c_1001_0 - 5/24*c_1010_13^7 + 17/24*c_1010_13^6 - 43/24*c_1010_13^5 + 41/12*c_1010_13^4 - 35/6*c_1010_13^3 + 67/12*c_1010_13^2 - 6*c_1010_13 + 11/24, c_1010_13^8 - 4*c_1010_13^7 + 10*c_1010_13^6 - 19*c_1010_13^5 + 34*c_1010_13^4 - 34*c_1010_13^3 + 34*c_1010_13^2 - 7*c_1010_13 + 1 ], Ideal of Polynomial ring of rank 15 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_13, c_0011_7, c_0101_0, c_0101_1, c_0101_11, c_0101_3, c_0101_5, c_0101_7, c_0110_5, c_1001_0, c_1010_13 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 10 Groebner basis: [ t + 6417731708386/6427704003*c_1010_13^9 - 380753159519701/38566224018*c_1010_13^8 + 499250117646577/12855408006*c_1010_13^7 - 778826040784265/12855408006*c_1010_13^6 + 306240604193545/2754730287*c_1010_13^5 - 3418630659726827/38566224018*c_1010_13^4 + 2214414598551217/38566224018*c_1010_13^3 + 52208529471892/2754730287*c_1010_13^2 - 86776398915412/6427704003*c_1010_13 - 330386525629159/38566224018, c_0011_0 - 1, c_0011_10 + 201605713/2142568001*c_1010_13^9 - 1919817548/2142568001*c_1010_13^8 + 7117460225/2142568001*c_1010_13^7 - 9411920179/2142568001*c_1010_13^6 + 2591565075/306081143*c_1010_13^5 - 9778706696/2142568001*c_1010_13^4 + 4495977951/2142568001*c_1010_13^3 + 1341750145/306081143*c_1010_13^2 - 3901283045/2142568001*c_1010_13 - 778566680/2142568001, c_0011_11 + 32418595/2142568001*c_1010_13^9 - 291526146/2142568001*c_1010_13^8 + 976043837/2142568001*c_1010_13^7 - 840343276/2142568001*c_1010_13^6 + 259561510/306081143*c_1010_13^5 + 336804716/2142568001*c_1010_13^4 + 326047432/2142568001*c_1010_13^3 + 473266066/306081143*c_1010_13^2 + 1145836302/2142568001*c_1010_13 + 1478183220/2142568001, c_0011_13 - 1, c_0011_7 + 45333804/2142568001*c_1010_13^9 - 414836188/2142568001*c_1010_13^8 + 1506873345/2142568001*c_1010_13^7 - 2156050084/2142568001*c_1010_13^6 + 799655091/306081143*c_1010_13^5 - 3443424370/2142568001*c_1010_13^4 + 5375636309/2142568001*c_1010_13^3 - 86566381/306081143*c_1010_13^2 + 1501562360/2142568001*c_1010_13 + 1224165669/2142568001, c_0101_0 + 40012785/2142568001*c_1010_13^9 - 437064836/2142568001*c_1010_13^8 + 1931011825/2142568001*c_1010_13^7 - 3667699669/2142568001*c_1010_13^6 + 761455549/306081143*c_1010_13^5 - 4878446555/2142568001*c_1010_13^4 + 382943172/2142568001*c_1010_13^3 + 451465063/306081143*c_1010_13^2 - 5631589959/2142568001*c_1010_13 - 890285987/2142568001, c_0101_1 - 162374130/2142568001*c_1010_13^9 + 1671393538/2142568001*c_1010_13^8 - 7034259857/2142568001*c_1010_13^7 + 13092603854/2142568001*c_1010_13^6 - 3541725881/306081143*c_1010_13^5 + 26102818874/2142568001*c_1010_13^4 - 22753783156/2142568001*c_1010_13^3 + 1004695509/306081143*c_1010_13^2 + 1527357808/2142568001*c_1010_13 - 826275262/2142568001, c_0101_11 - 183904605/2142568001*c_1010_13^9 + 1923127788/2142568001*c_1010_13^8 - 8161748395/2142568001*c_1010_13^7 + 14948152105/2142568001*c_1010_13^6 - 3659527272/306081143*c_1010_13^5 + 25764767821/2142568001*c_1010_13^4 - 16298052171/2142568001*c_1010_13^3 - 202005076/306081143*c_1010_13^2 + 6961810820/2142568001*c_1010_13 + 929517570/2142568001, c_0101_3 - 27032232/306081143*c_1010_13^9 + 271557020/306081143*c_1010_13^8 - 1105372845/306081143*c_1010_13^7 + 1919500360/306081143*c_1010_13^6 - 3697726814/306081143*c_1010_13^5 + 3475677948/306081143*c_1010_13^4 - 3041535044/306081143*c_1010_13^3 + 336026368/306081143*c_1010_13^2 - 24477357/306081143*c_1010_13 - 169276298/306081143, c_0101_5 + 214004766/2142568001*c_1010_13^9 - 2090195465/2142568001*c_1010_13^8 + 8106380173/2142568001*c_1010_13^7 - 12312611638/2142568001*c_1010_13^6 + 3332596481/306081143*c_1010_13^5 - 16996671029/2142568001*c_1010_13^4 + 12856003659/2142568001*c_1010_13^3 + 741651657/306081143*c_1010_13^2 - 2351517986/2142568001*c_1010_13 - 532110812/2142568001, c_0101_7 + 77752399/2142568001*c_1010_13^9 - 706362334/2142568001*c_1010_13^8 + 2482917182/2142568001*c_1010_13^7 - 2996393360/2142568001*c_1010_13^6 + 1059216601/306081143*c_1010_13^5 - 3106619654/2142568001*c_1010_13^4 + 5701683741/2142568001*c_1010_13^3 + 386699685/306081143*c_1010_13^2 + 2647398662/2142568001*c_1010_13 + 559780888/2142568001, c_0110_5 - 45333804/2142568001*c_1010_13^9 + 414836188/2142568001*c_1010_13^8 - 1506873345/2142568001*c_1010_13^7 + 2156050084/2142568001*c_1010_13^6 - 799655091/306081143*c_1010_13^5 + 3443424370/2142568001*c_1010_13^4 - 5375636309/2142568001*c_1010_13^3 + 86566381/306081143*c_1010_13^2 - 1501562360/2142568001*c_1010_13 - 1224165669/2142568001, c_1001_0 - 77752399/2142568001*c_1010_13^9 + 706362334/2142568001*c_1010_13^8 - 2482917182/2142568001*c_1010_13^7 + 2996393360/2142568001*c_1010_13^6 - 1059216601/306081143*c_1010_13^5 + 3106619654/2142568001*c_1010_13^4 - 5701683741/2142568001*c_1010_13^3 - 386699685/306081143*c_1010_13^2 - 2647398662/2142568001*c_1010_13 - 559780888/2142568001, c_1010_13^10 - 10*c_1010_13^9 + 40*c_1010_13^8 - 65*c_1010_13^7 + 118*c_1010_13^6 - 101*c_1010_13^5 + 67*c_1010_13^4 + 13*c_1010_13^3 - 16*c_1010_13^2 - 7*c_1010_13 + 1 ] ] PRIMARY=DECOMPOSITION=ENDS=HERE CPUTIME : 16.060 Total time: 16.269 seconds, Total memory usage: 353.00MB