Magma V2.19-8 Tue Aug 20 2013 20:39:07 on localhost [Seed = 3103712972] Type ? for help. Type -D to quit. Loading file "11_464__sl2_c1.magma" ==TRIANGULATION=BEGINS== % Triangulation 11_464 geometric_solution 13.96053431 oriented_manifold CS_known 0.0000000000000007 1 0 torus 0.000000000000 0.000000000000 15 1 2 3 4 0132 0132 0132 0132 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 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 0.337319987606 0.848273861027 0 5 3 6 0132 0132 1023 0132 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 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 0 0 0 0 0 0 0 0 0 0 0.337319987606 0.848273861027 3 0 4 7 1023 0132 2103 0132 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 0 0 0 0 0 0 0 0 -1 1 0 0 0 0 0 1 0 0 -1 1 0 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.049663149537 1.559773070205 8 2 1 0 0132 1023 1023 0132 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 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 -1 0 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.335925118841 0.360466328276 2 9 0 10 2103 0132 0132 0132 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 0 0 0 0 0 0 0 0 0 1 -1 0 0 0 0 -1 1 0 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.922711214919 0.916464009435 8 1 11 12 1023 0132 0132 0132 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 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 0 0 0.872286790953 0.824042894566 8 13 1 10 2103 0132 0132 1023 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 0 0 0 0 0 0 0 0 0 0 0 -1 0 0 1 -1 0 0 1 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.049663149537 1.559773070205 9 9 2 14 2031 0321 0132 0132 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 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -1 1 0 0 0 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.320460909797 0.542477828132 3 5 6 13 0132 1023 2103 3012 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 0 0 0 0 0 0 0 0 -1 1 0 0 0 1 -1 -1 0 0 1 -1 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.922711214919 0.916464009435 14 4 7 7 1230 0132 1302 0321 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 0 0 0 0 0 0 0 0 0 0 0 -1 0 0 1 0 1 0 -1 0 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.320460909797 0.542477828132 14 14 4 6 3120 1023 0132 1023 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 0 0 0 0 0 0 1 -1 0 0 0 0 -1 2 0 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.872286790953 0.824042894566 13 12 12 5 0321 0321 2103 0132 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 0 0 0 0 0 0 0 0 1 -1 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 0.898795165263 0.717510524731 11 13 5 11 2103 0321 0132 0321 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 0 0 0 0 0 0 0 0 1 0 -1 0 0 1 -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 0.898795165263 0.717510524731 11 6 8 12 0321 0132 1230 0321 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 0 0 0 0 0 0 0 0 0 1 -1 1 0 -1 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 0.183665575653 1.185063892160 10 9 7 10 1023 3012 0132 3120 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 0 0 0 0 0 0 -2 1 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.183665575653 1.185063892160 ==TRIANGULATION=ENDS== PY=EVAL=SECTION=BEGINS=HERE {'variable_dict' : (lambda d, negation = (lambda x:-x): { 'c_1001_14' : d['c_0011_4'], 'c_1001_11' : d['c_0011_11'], 'c_1001_10' : d['c_0101_14'], 'c_1001_13' : d['c_0110_10'], 'c_1001_12' : d['c_0101_3'], 'c_1001_5' : d['c_1001_5'], 'c_1001_4' : d['c_0011_4'], 'c_1001_7' : d['c_0101_7'], 'c_1001_6' : d['c_1001_5'], 'c_1001_1' : d['c_0101_3'], 'c_1001_0' : d['c_0101_7'], 'c_1001_3' : d['c_0101_1'], 'c_1001_2' : d['c_0011_4'], 'c_1001_9' : d['c_0101_14'], 'c_1001_8' : negation(d['c_0011_13']), 'c_1010_13' : d['c_1001_5'], 'c_1010_12' : d['c_1001_5'], 'c_1010_11' : d['c_1001_5'], 'c_1010_10' : d['c_0110_10'], 'c_1010_14' : negation(d['c_0011_10']), 's_0_10' : d['1'], 's_0_11' : d['1'], 's_0_12' : d['1'], 's_0_13' : d['1'], 's_0_14' : d['1'], 's_3_14' : d['1'], 's_2_8' : d['1'], 's_2_9' : d['1'], 'c_0101_11' : d['c_0101_11'], 'c_0101_10' : d['c_0101_10'], 'c_0101_14' : d['c_0101_14'], 's_2_0' : negation(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' : 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_2_14' : 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' : negation(d['1']), 's_0_0' : negation(d['1']), 's_0_1' : negation(d['1']), 'c_0011_14' : d['c_0011_10'], 'c_0011_11' : d['c_0011_11'], 'c_1100_8' : negation(d['c_0110_10']), 'c_0011_13' : d['c_0011_13'], 'c_0011_12' : d['c_0011_11'], 'c_1100_5' : d['c_0011_11'], 'c_1100_4' : d['c_1100_0'], 'c_1100_7' : negation(d['c_0101_10']), 'c_1100_6' : negation(d['c_1100_0']), 'c_1100_1' : negation(d['c_1100_0']), 'c_1100_0' : d['c_1100_0'], 'c_1100_3' : d['c_1100_0'], 'c_1100_2' : negation(d['c_0101_10']), 'c_1100_14' : negation(d['c_0101_10']), 's_3_11' : d['1'], 'c_1100_11' : d['c_0011_11'], 'c_1100_10' : d['c_1100_0'], 'c_1100_13' : d['c_0101_3'], 's_3_10' : d['1'], 's_3_13' : d['1'], 'c_1010_7' : d['c_0011_4'], 'c_1010_6' : d['c_0110_10'], 'c_1010_5' : d['c_0101_3'], 'c_1010_4' : d['c_0101_14'], 'c_1010_3' : d['c_0101_7'], 'c_1010_2' : d['c_0101_7'], 'c_1010_1' : d['c_1001_5'], 'c_1010_0' : d['c_0011_4'], 'c_1010_9' : d['c_0011_4'], 'c_1010_8' : d['c_0101_11'], 's_3_1' : d['1'], 's_3_0' : d['1'], 's_3_3' : negation(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' : d['c_0011_11'], 's_1_7' : d['1'], 's_1_6' : 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' : negation(d['1']), 'c_0011_9' : negation(d['c_0011_4']), 'c_0011_8' : d['c_0011_0'], 'c_0011_5' : d['c_0011_0'], 'c_0011_4' : d['c_0011_4'], 'c_0011_7' : negation(d['c_0011_10']), 'c_0011_6' : negation(d['c_0011_13']), 'c_0011_1' : negation(d['c_0011_0']), 'c_0011_0' : d['c_0011_0'], 'c_0011_3' : negation(d['c_0011_0']), 'c_0011_2' : negation(d['c_0011_0']), 'c_0110_11' : negation(d['c_0011_13']), 'c_0110_10' : d['c_0110_10'], 'c_0110_13' : negation(d['c_0011_11']), 'c_0110_12' : negation(d['c_0011_11']), 'c_0110_14' : d['c_0110_10'], 'c_0101_12' : d['c_0101_11'], 'c_0110_0' : d['c_0101_1'], 's_3_12' : d['1'], 's_0_8' : negation(d['1']), 'c_0101_7' : d['c_0101_7'], 'c_0101_6' : d['c_0101_0'], 'c_0101_5' : negation(d['c_0011_13']), 'c_0101_4' : d['c_0101_1'], 'c_0101_3' : d['c_0101_3'], 'c_0101_2' : d['c_0101_1'], 'c_0101_1' : d['c_0101_1'], 'c_0101_0' : d['c_0101_0'], 'c_0101_9' : d['c_0011_10'], 'c_0101_8' : d['c_0101_0'], 'c_0011_10' : d['c_0011_10'], 's_1_14' : d['1'], '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_10'], 'c_0110_8' : d['c_0101_3'], 'c_0110_1' : d['c_0101_0'], 'c_1100_9' : d['c_0101_7'], 'c_0110_3' : d['c_0101_0'], 'c_0110_2' : d['c_0101_7'], 'c_0110_5' : d['c_0101_11'], 'c_0110_4' : d['c_0101_10'], 'c_0110_7' : d['c_0101_14'], 'c_0110_6' : d['c_0110_10'], 'c_0101_13' : negation(d['c_0101_11'])})} PY=EVAL=SECTION=ENDS=HERE PRIMARY=DECOMPOSITION=BEGINS=HERE [ Ideal of Polynomial ring of rank 16 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_13, c_0011_4, c_0101_0, c_0101_1, c_0101_10, c_0101_11, c_0101_14, c_0101_3, c_0101_7, c_0110_10, c_1001_5, c_1100_0 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 11 Groebner basis: [ t + 708*c_1100_0^10 - 2297*c_1100_0^9 + 405*c_1100_0^8 + 2349*c_1100_0^7 + 3987*c_1100_0^6 - 4029*c_1100_0^5 - 3706*c_1100_0^4 - 3708*c_1100_0^3 + 1436*c_1100_0^2 + 4576*c_1100_0 + 3568, c_0011_0 - 1, c_0011_10 + 1/8*c_1100_0^10 - 1/4*c_1100_0^9 - 1/8*c_1100_0^8 + 1/8*c_1100_0^7 + 5/8*c_1100_0^6 - 1/8*c_1100_0^4 - 11/8*c_1100_0^3 + 5/8*c_1100_0 + 5/4, c_0011_11 - 1/8*c_1100_0^10 + 1/4*c_1100_0^9 + 1/8*c_1100_0^8 - 1/8*c_1100_0^7 - 5/8*c_1100_0^6 + 1/8*c_1100_0^4 + 11/8*c_1100_0^3 - 5/8*c_1100_0 - 5/4, c_0011_13 - 1/8*c_1100_0^10 - 1/4*c_1100_0^9 + 9/8*c_1100_0^8 + 3/8*c_1100_0^7 - 9/8*c_1100_0^6 - 3/2*c_1100_0^5 + 1/8*c_1100_0^4 + 7/8*c_1100_0^3 + 1/2*c_1100_0^2 + 3/8*c_1100_0 - 3/4, c_0011_4 - 9/8*c_1100_0^10 + 11/4*c_1100_0^9 + 9/8*c_1100_0^8 - 21/8*c_1100_0^7 - 49/8*c_1100_0^6 + 3/2*c_1100_0^5 + 33/8*c_1100_0^4 + 39/8*c_1100_0^3 + 3/2*c_1100_0^2 - 21/8*c_1100_0 - 11/4, c_0101_0 + 3/8*c_1100_0^10 - 5/4*c_1100_0^9 - 3/8*c_1100_0^8 + 15/8*c_1100_0^7 + 27/8*c_1100_0^6 - 3/2*c_1100_0^5 - 27/8*c_1100_0^4 - 29/8*c_1100_0^3 - 1/2*c_1100_0^2 + 15/8*c_1100_0 + 9/4, c_0101_1 - 3/8*c_1100_0^10 + 5/4*c_1100_0^9 + 3/8*c_1100_0^8 - 15/8*c_1100_0^7 - 27/8*c_1100_0^6 + 3/2*c_1100_0^5 + 27/8*c_1100_0^4 + 29/8*c_1100_0^3 + 1/2*c_1100_0^2 - 15/8*c_1100_0 - 9/4, c_0101_10 + 1/8*c_1100_0^10 - 1/4*c_1100_0^9 - 1/8*c_1100_0^8 + 1/8*c_1100_0^7 + 5/8*c_1100_0^6 - 1/8*c_1100_0^4 - 3/8*c_1100_0^3 - c_1100_0^2 + 5/8*c_1100_0 + 1/4, c_0101_11 + 9/8*c_1100_0^10 - 11/4*c_1100_0^9 - 9/8*c_1100_0^8 + 21/8*c_1100_0^7 + 49/8*c_1100_0^6 - 3/2*c_1100_0^5 - 33/8*c_1100_0^4 - 39/8*c_1100_0^3 - 3/2*c_1100_0^2 + 21/8*c_1100_0 + 11/4, c_0101_14 - 1/8*c_1100_0^10 + 1/4*c_1100_0^9 + 1/8*c_1100_0^8 - 1/8*c_1100_0^7 - 5/8*c_1100_0^6 + 9/8*c_1100_0^4 + 3/8*c_1100_0^3 - c_1100_0^2 - 5/8*c_1100_0 - 1/4, c_0101_3 - 1/8*c_1100_0^10 - 1/4*c_1100_0^9 + 9/8*c_1100_0^8 + 3/8*c_1100_0^7 - 9/8*c_1100_0^6 - 3/2*c_1100_0^5 + 1/8*c_1100_0^4 + 7/8*c_1100_0^3 + 1/2*c_1100_0^2 + 3/8*c_1100_0 - 3/4, c_0101_7 - 1/8*c_1100_0^10 - 1/4*c_1100_0^9 + 9/8*c_1100_0^8 + 3/8*c_1100_0^7 - 9/8*c_1100_0^6 - 3/2*c_1100_0^5 + 1/8*c_1100_0^4 + 7/8*c_1100_0^3 + 1/2*c_1100_0^2 + 3/8*c_1100_0 - 3/4, c_0110_10 - 1, c_1001_5 + 9/8*c_1100_0^10 - 11/4*c_1100_0^9 - 9/8*c_1100_0^8 + 21/8*c_1100_0^7 + 49/8*c_1100_0^6 - 3/2*c_1100_0^5 - 33/8*c_1100_0^4 - 39/8*c_1100_0^3 - 3/2*c_1100_0^2 + 21/8*c_1100_0 + 11/4, c_1100_0^11 - 4*c_1100_0^10 + 3*c_1100_0^9 + 3*c_1100_0^8 + 3*c_1100_0^7 - 10*c_1100_0^6 - c_1100_0^5 - c_1100_0^4 + 6*c_1100_0^3 + 5*c_1100_0^2 - 4 ], Ideal of Polynomial ring of rank 16 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_13, c_0011_4, c_0101_0, c_0101_1, c_0101_10, c_0101_11, c_0101_14, c_0101_3, c_0101_7, c_0110_10, c_1001_5, c_1100_0 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 40 Groebner basis: [ t + 4413179/40311*c_1001_5*c_1100_0^19 + 546377/8958*c_1001_5*c_1100_0^18 - 9629513/8958*c_1001_5*c_1100_0^17 - 1861205/4479*c_1001_5*c_1100_0^16 + 56804983/13437*c_1001_5*c_1100_0^15 + 69922099/80622*c_1001_5*c_1100_0^14 - 111655474/13437*c_1001_5*c_1100_0^13 - 9104191/26874*c_1001_5*c_1100_0^12 + 113589343/13437*c_1001_5*c_1100_0^11 + 36445/26874*c_1001_5*c_1100_0^10 - 422270033/80622*c_1001_5*c_1100_0^9 - 82007896/40311*c_1001_5*c_1100_0^8 + 381439579/80622*c_1001_5*c_1100_0^7 + 124435375/80622*c_1001_5*c_1100_0^6 - 112642433/26874*c_1001_5*c_1100_0^5 + 82344413/40311*c_1001_5*c_1100_0^4 + 26983535/26874*c_1001_5*c_1100_0^3 - 43328608/40311*c_1001_5*c_1100_0^2 + 1400687/13437*c_1001_5*c_1100_0 + 3120157/40311*c_1001_5 - 5279833/40311*c_1100_0^19 - 683029/8958*c_1100_0^18 + 11567209/8958*c_1100_0^17 + 2359111/4479*c_1100_0^16 - 137281867/26874*c_1100_0^15 - 45817702/40311*c_1100_0^14 + 136127474/13437*c_1100_0^13 + 14924933/26874*c_1100_0^12 - 280641637/26874*c_1100_0^11 - 3589517/26874*c_1100_0^10 + 263338577/40311*c_1100_0^9 + 105789008/40311*c_1100_0^8 - 234546517/40311*c_1100_0^7 - 84886069/40311*c_1100_0^6 + 139622197/26874*c_1100_0^5 - 188182649/80622*c_1100_0^4 - 17145242/13437*c_1100_0^3 + 102705289/80622*c_1100_0^2 - 1574176/13437*c_1100_0 - 7360165/80622, c_0011_0 - 1, c_0011_10 + 2*c_1001_5*c_1100_0^19 + 2*c_1001_5*c_1100_0^18 - 19*c_1001_5*c_1100_0^17 - 33/2*c_1001_5*c_1100_0^16 + 145/2*c_1001_5*c_1100_0^15 + 52*c_1001_5*c_1100_0^14 - 279/2*c_1001_5*c_1100_0^13 - 80*c_1001_5*c_1100_0^12 + 141*c_1001_5*c_1100_0^11 + 78*c_1001_5*c_1100_0^10 - 165/2*c_1001_5*c_1100_0^9 - 85*c_1001_5*c_1100_0^8 + 57*c_1001_5*c_1100_0^7 + 137/2*c_1001_5*c_1100_0^6 - 105/2*c_1001_5*c_1100_0^5 + c_1001_5*c_1100_0^4 + 57/2*c_1001_5*c_1100_0^3 - 21/2*c_1001_5*c_1100_0^2 - 6*c_1001_5*c_1100_0 + 3*c_1100_0^18 + 4*c_1100_0^17 - 27*c_1100_0^16 - 67/2*c_1100_0^15 + 193/2*c_1100_0^14 + 108*c_1100_0^13 - 343/2*c_1100_0^12 - 170*c_1100_0^11 + 157*c_1100_0^10 + 158*c_1100_0^9 - 159/2*c_1100_0^8 - 145*c_1100_0^7 + 45*c_1100_0^6 + 227/2*c_1100_0^5 - 95/2*c_1100_0^4 - 13*c_1100_0^3 + 89/2*c_1100_0^2 - 3/2*c_1100_0 - 8, c_0011_11 + 2*c_1001_5*c_1100_0^19 + 2*c_1001_5*c_1100_0^18 - 19*c_1001_5*c_1100_0^17 - 33/2*c_1001_5*c_1100_0^16 + 145/2*c_1001_5*c_1100_0^15 + 52*c_1001_5*c_1100_0^14 - 279/2*c_1001_5*c_1100_0^13 - 80*c_1001_5*c_1100_0^12 + 141*c_1001_5*c_1100_0^11 + 78*c_1001_5*c_1100_0^10 - 165/2*c_1001_5*c_1100_0^9 - 85*c_1001_5*c_1100_0^8 + 57*c_1001_5*c_1100_0^7 + 137/2*c_1001_5*c_1100_0^6 - 105/2*c_1001_5*c_1100_0^5 + c_1001_5*c_1100_0^4 + 57/2*c_1001_5*c_1100_0^3 - 21/2*c_1001_5*c_1100_0^2 - 6*c_1001_5*c_1100_0 + 2*c_1100_0^19 + 11/2*c_1100_0^18 - 31/2*c_1100_0^17 - 97/2*c_1100_0^16 + 89/2*c_1100_0^15 + 335/2*c_1100_0^14 - 56*c_1100_0^13 - 569/2*c_1100_0^12 + 25*c_1100_0^11 + 260*c_1100_0^10 + 17*c_1100_0^9 - 359/2*c_1100_0^8 - 111/2*c_1100_0^7 + 289/2*c_1100_0^6 + 59/2*c_1100_0^5 - 70*c_1100_0^4 + 53*c_1100_0^3 + 26*c_1100_0^2 - 15*c_1100_0 - 1, c_0011_13 - c_1001_5*c_1100_0^19 - 2*c_1001_5*c_1100_0^18 + 8*c_1001_5*c_1100_0^17 + 17*c_1001_5*c_1100_0^16 - 24*c_1001_5*c_1100_0^15 - 56*c_1001_5*c_1100_0^14 + 32*c_1001_5*c_1100_0^13 + 90*c_1001_5*c_1100_0^12 - 16*c_1001_5*c_1100_0^11 - 80*c_1001_5*c_1100_0^10 - 3*c_1001_5*c_1100_0^9 + 60*c_1001_5*c_1100_0^8 + 12*c_1001_5*c_1100_0^7 - 45*c_1001_5*c_1100_0^6 - 5*c_1001_5*c_1100_0^5 + 14*c_1001_5*c_1100_0^4 - 16*c_1001_5*c_1100_0^3 - 9*c_1001_5*c_1100_0^2 + 2*c_1001_5*c_1100_0 + 3/2*c_1100_0^19 + 11/2*c_1100_0^18 - 23/2*c_1100_0^17 - 101/2*c_1100_0^16 + 67/2*c_1100_0^15 + 367/2*c_1100_0^14 - 48*c_1100_0^13 - 663/2*c_1100_0^12 + 77/2*c_1100_0^11 + 320*c_1100_0^10 - c_1100_0^9 - 433/2*c_1100_0^8 - 127/2*c_1100_0^7 + 367/2*c_1100_0^6 + 73/2*c_1100_0^5 - 113*c_1100_0^4 + 139/2*c_1100_0^3 + 27*c_1100_0^2 - 28*c_1100_0 - 1/2, c_0011_4 - c_1001_5 + 5/2*c_1100_0^19 + 9/2*c_1100_0^18 - 43/2*c_1100_0^17 - 39*c_1100_0^16 + 73*c_1100_0^15 + 132*c_1100_0^14 - 124*c_1100_0^13 - 441/2*c_1100_0^12 + 113*c_1100_0^11 + 206*c_1100_0^10 - 115/2*c_1100_0^9 - 321/2*c_1100_0^8 + 14*c_1100_0^7 + 131*c_1100_0^6 - 23*c_1100_0^5 - 95/2*c_1100_0^4 + 119/2*c_1100_0^3 + 17/2*c_1100_0^2 - 31/2*c_1100_0 + 2, c_0101_0 - c_1001_5*c_1100_0^18 - c_1001_5*c_1100_0^17 + 9*c_1001_5*c_1100_0^16 + 8*c_1001_5*c_1100_0^15 - 32*c_1001_5*c_1100_0^14 - 24*c_1001_5*c_1100_0^13 + 56*c_1001_5*c_1100_0^12 + 34*c_1001_5*c_1100_0^11 - 50*c_1001_5*c_1100_0^10 - 30*c_1001_5*c_1100_0^9 + 27*c_1001_5*c_1100_0^8 + 33*c_1001_5*c_1100_0^7 - 21*c_1001_5*c_1100_0^6 - 24*c_1001_5*c_1100_0^5 + 19*c_1001_5*c_1100_0^4 - 5*c_1001_5*c_1100_0^3 - 11*c_1001_5*c_1100_0^2 + 2*c_1001_5*c_1100_0 + 5/2*c_1100_0^19 + 2*c_1100_0^18 - 47/2*c_1100_0^17 - 16*c_1100_0^16 + 175/2*c_1100_0^15 + 48*c_1100_0^14 - 321/2*c_1100_0^13 - 139/2*c_1100_0^12 + 149*c_1100_0^11 + 139/2*c_1100_0^10 - 163/2*c_1100_0^9 - 86*c_1100_0^8 + 133/2*c_1100_0^7 + 121/2*c_1100_0^6 - 56*c_1100_0^5 + 17*c_1100_0^4 + 21*c_1100_0^3 - 17/2*c_1100_0^2 - 7/2*c_1100_0 - 3/2, c_0101_1 - c_1001_5*c_1100_0^18 - c_1001_5*c_1100_0^17 + 9*c_1001_5*c_1100_0^16 + 8*c_1001_5*c_1100_0^15 - 32*c_1001_5*c_1100_0^14 - 24*c_1001_5*c_1100_0^13 + 56*c_1001_5*c_1100_0^12 + 34*c_1001_5*c_1100_0^11 - 50*c_1001_5*c_1100_0^10 - 30*c_1001_5*c_1100_0^9 + 27*c_1001_5*c_1100_0^8 + 33*c_1001_5*c_1100_0^7 - 21*c_1001_5*c_1100_0^6 - 24*c_1001_5*c_1100_0^5 + 19*c_1001_5*c_1100_0^4 - 5*c_1001_5*c_1100_0^3 - 11*c_1001_5*c_1100_0^2 + 2*c_1001_5*c_1100_0 + 9/2*c_1100_0^19 + 13/2*c_1100_0^18 - 81/2*c_1100_0^17 - 111/2*c_1100_0^16 + 291/2*c_1100_0^15 + 184*c_1100_0^14 - 527/2*c_1100_0^13 - 601/2*c_1100_0^12 + 254*c_1100_0^11 + 284*c_1100_0^10 - 140*c_1100_0^9 - 491/2*c_1100_0^8 + 71*c_1100_0^7 + 399/2*c_1100_0^6 - 151/2*c_1100_0^5 - 93/2*c_1100_0^4 + 88*c_1100_0^3 - 2*c_1100_0^2 - 43/2*c_1100_0 + 2, c_0101_10 - 5/2*c_1001_5*c_1100_0^19 + 51/2*c_1001_5*c_1100_0^17 - 3*c_1001_5*c_1100_0^16 - 104*c_1001_5*c_1100_0^15 + 49/2*c_1001_5*c_1100_0^14 + 425/2*c_1001_5*c_1100_0^13 - 70*c_1001_5*c_1100_0^12 - 229*c_1001_5*c_1100_0^11 + 143/2*c_1001_5*c_1100_0^10 + 319/2*c_1001_5*c_1100_0^9 + 7/2*c_1001_5*c_1100_0^8 - 303/2*c_1001_5*c_1100_0^7 - 7/2*c_1001_5*c_1100_0^6 + 249/2*c_1001_5*c_1100_0^5 - 139/2*c_1001_5*c_1100_0^4 - 20*c_1001_5*c_1100_0^3 + 37*c_1001_5*c_1100_0^2 - 7*c_1001_5*c_1100_0 - 9/2*c_1001_5 + 5/2*c_1100_0^19 + 9/2*c_1100_0^18 - 41/2*c_1100_0^17 - 38*c_1100_0^16 + 64*c_1100_0^15 + 124*c_1100_0^14 - 92*c_1100_0^13 - 393/2*c_1100_0^12 + 57*c_1100_0^11 + 172*c_1100_0^10 - 15/2*c_1100_0^9 - 261/2*c_1100_0^8 - 13*c_1100_0^7 + 98*c_1100_0^6 - 2*c_1100_0^5 - 47/2*c_1100_0^4 + 81/2*c_1100_0^3 + 27/2*c_1100_0^2 - 9/2*c_1100_0, c_0101_11 - c_1001_5, c_0101_14 - 1/2*c_1001_5*c_1100_0^19 + c_1001_5*c_1100_0^18 + 6*c_1001_5*c_1100_0^17 - 19/2*c_1001_5*c_1100_0^16 - 28*c_1001_5*c_1100_0^15 + 36*c_1001_5*c_1100_0^14 + 129/2*c_1001_5*c_1100_0^13 - 67*c_1001_5*c_1100_0^12 - 79*c_1001_5*c_1100_0^11 + 60*c_1001_5*c_1100_0^10 + 129/2*c_1001_5*c_1100_0^9 - 47/2*c_1001_5*c_1100_0^8 - 64*c_1001_5*c_1100_0^7 + 17*c_1001_5*c_1100_0^6 + 95/2*c_1001_5*c_1100_0^5 - 28*c_1001_5*c_1100_0^4 - 3/2*c_1001_5*c_1100_0^3 + 17*c_1001_5*c_1100_0^2 - 3*c_1001_5*c_1100_0 - 5/2*c_1001_5 - 1/2*c_1100_0^19 + 1/2*c_1100_0^18 + 13/2*c_1100_0^17 - 9/2*c_1100_0^16 - 65/2*c_1100_0^15 + 16*c_1100_0^14 + 159/2*c_1100_0^13 - 53/2*c_1100_0^12 - 100*c_1100_0^11 + 14*c_1100_0^10 + 72*c_1100_0^9 + 29/2*c_1100_0^8 - 58*c_1100_0^7 - 31/2*c_1100_0^6 + 91/2*c_1100_0^5 - 21/2*c_1100_0^4 - 4*c_1100_0^3 + 15*c_1100_0^2 + 7/2*c_1100_0, c_0101_3 - c_1001_5*c_1100_0^19 - 2*c_1001_5*c_1100_0^18 + 8*c_1001_5*c_1100_0^17 + 17*c_1001_5*c_1100_0^16 - 24*c_1001_5*c_1100_0^15 - 56*c_1001_5*c_1100_0^14 + 32*c_1001_5*c_1100_0^13 + 90*c_1001_5*c_1100_0^12 - 16*c_1001_5*c_1100_0^11 - 80*c_1001_5*c_1100_0^10 - 3*c_1001_5*c_1100_0^9 + 60*c_1001_5*c_1100_0^8 + 12*c_1001_5*c_1100_0^7 - 45*c_1001_5*c_1100_0^6 - 5*c_1001_5*c_1100_0^5 + 14*c_1001_5*c_1100_0^4 - 16*c_1001_5*c_1100_0^3 - 9*c_1001_5*c_1100_0^2 + 2*c_1001_5*c_1100_0 + 3/2*c_1100_0^19 + 11/2*c_1100_0^18 - 23/2*c_1100_0^17 - 101/2*c_1100_0^16 + 67/2*c_1100_0^15 + 367/2*c_1100_0^14 - 48*c_1100_0^13 - 663/2*c_1100_0^12 + 77/2*c_1100_0^11 + 320*c_1100_0^10 - c_1100_0^9 - 433/2*c_1100_0^8 - 127/2*c_1100_0^7 + 367/2*c_1100_0^6 + 73/2*c_1100_0^5 - 113*c_1100_0^4 + 139/2*c_1100_0^3 + 27*c_1100_0^2 - 28*c_1100_0 - 1/2, c_0101_7 + c_1001_5*c_1100_0^19 + 2*c_1001_5*c_1100_0^18 - 8*c_1001_5*c_1100_0^17 - 17*c_1001_5*c_1100_0^16 + 24*c_1001_5*c_1100_0^15 + 56*c_1001_5*c_1100_0^14 - 32*c_1001_5*c_1100_0^13 - 90*c_1001_5*c_1100_0^12 + 16*c_1001_5*c_1100_0^11 + 80*c_1001_5*c_1100_0^10 + 3*c_1001_5*c_1100_0^9 - 60*c_1001_5*c_1100_0^8 - 12*c_1001_5*c_1100_0^7 + 45*c_1001_5*c_1100_0^6 + 5*c_1001_5*c_1100_0^5 - 14*c_1001_5*c_1100_0^4 + 16*c_1001_5*c_1100_0^3 + 9*c_1001_5*c_1100_0^2 - 2*c_1001_5*c_1100_0 - 2*c_1100_0^18 - 2*c_1100_0^17 + 19*c_1100_0^16 + 33/2*c_1100_0^15 - 145/2*c_1100_0^14 - 52*c_1100_0^13 + 279/2*c_1100_0^12 + 80*c_1100_0^11 - 141*c_1100_0^10 - 78*c_1100_0^9 + 165/2*c_1100_0^8 + 85*c_1100_0^7 - 57*c_1100_0^6 - 137/2*c_1100_0^5 + 105/2*c_1100_0^4 - c_1100_0^3 - 57/2*c_1100_0^2 + 21/2*c_1100_0 + 6, c_0110_10 - 1, c_1001_5^2 - 5/2*c_1001_5*c_1100_0^19 - 9/2*c_1001_5*c_1100_0^18 + 43/2*c_1001_5*c_1100_0^17 + 39*c_1001_5*c_1100_0^16 - 73*c_1001_5*c_1100_0^15 - 132*c_1001_5*c_1100_0^14 + 124*c_1001_5*c_1100_0^13 + 441/2*c_1001_5*c_1100_0^12 - 113*c_1001_5*c_1100_0^11 - 206*c_1001_5*c_1100_0^10 + 115/2*c_1001_5*c_1100_0^9 + 321/2*c_1001_5*c_1100_0^8 - 14*c_1001_5*c_1100_0^7 - 131*c_1001_5*c_1100_0^6 + 23*c_1001_5*c_1100_0^5 + 95/2*c_1001_5*c_1100_0^4 - 119/2*c_1001_5*c_1100_0^3 - 17/2*c_1001_5*c_1100_0^2 + 31/2*c_1001_5*c_1100_0 - 2*c_1001_5 + 4*c_1100_0^19 + 15/2*c_1100_0^18 - 75/2*c_1100_0^17 - 68*c_1100_0^16 + 291/2*c_1100_0^15 + 243*c_1100_0^14 - 304*c_1100_0^13 - 432*c_1100_0^12 + 745/2*c_1100_0^11 + 425*c_1100_0^10 - 267*c_1100_0^9 - 671/2*c_1100_0^8 + 227/2*c_1100_0^7 + 311*c_1100_0^6 - 227/2*c_1100_0^5 - 295/2*c_1100_0^4 + 171*c_1100_0^3 - 14*c_1100_0^2 - 54*c_1100_0 + 17, c_1100_0^20 + 2*c_1100_0^19 - 9*c_1100_0^18 - 18*c_1100_0^17 + 33*c_1100_0^16 + 64*c_1100_0^15 - 64*c_1100_0^14 - 114*c_1100_0^13 + 72*c_1100_0^12 + 114*c_1100_0^11 - 47*c_1100_0^10 - 90*c_1100_0^9 + 15*c_1100_0^8 + 78*c_1100_0^7 - 16*c_1100_0^6 - 38*c_1100_0^5 + 35*c_1100_0^4 + 4*c_1100_0^3 - 13*c_1100_0^2 + 2*c_1100_0 + 1 ] ] PRIMARY=DECOMPOSITION=ENDS=HERE CPUTIME : 5.030 Total time: 5.240 seconds, Total memory usage: 64.12MB