Magma V2.19-8 Tue Aug 20 2013 23:47:48 on localhost [Seed = 2716322762] Type ? for help. Type -D to quit. Loading file "K10a62__sl2_c1.magma" ==TRIANGULATION=BEGINS== % Triangulation K10a62 geometric_solution 12.00603700 oriented_manifold CS_known -0.0000000000000005 1 0 torus 0.000000000000 0.000000000000 13 1 2 3 4 0132 0132 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 1 0 -1 0 0 0 0 2 0 0 -2 0 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.650551527296 0.976916032605 0 2 2 5 0132 0321 2103 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 -1 1 0 0 0 0 0 0 0 0 0 -2 1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1.010352711236 0.694767164277 1 0 6 1 2103 0132 0132 0321 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 -1 0 1 0 0 1 -1 -1 1 0 0 -1 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1.010352711236 0.694767164277 7 5 8 0 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 0 0 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 0.541446312093 0.736611945520 6 9 0 10 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 0 1 -1 -1 0 0 1 0 0 0 0 0 -2 2 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.541446312093 0.736611945520 7 3 1 6 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 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 0.955053929102 0.511445481159 4 9 5 2 0132 0321 0132 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 1 0 0 -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 0.955053929102 0.511445481159 3 11 5 10 0132 0132 2103 3120 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 0.856898442359 0.999477695678 10 9 12 3 1230 0213 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 0 1 0 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1.011212426036 1.153311847808 12 4 8 6 1230 0132 0213 0321 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 1 0 -1 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 0.856898442359 0.999477695678 7 8 4 11 3120 3012 0132 1302 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 0 0 0 0 0 1.011212426036 1.153311847808 12 7 10 12 2031 0132 2031 1230 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 -1 0 1 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.011212426036 1.153311847808 11 9 11 8 3012 3012 1302 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 0.428449221180 0.499738847839 ==TRIANGULATION=ENDS== PY=EVAL=SECTION=BEGINS=HERE {'variable_dict' : (lambda d, negation = (lambda x:-x): { 'c_1001_11' : negation(d['c_0011_10']), 'c_1001_10' : negation(d['c_0011_8']), 'c_1001_12' : d['c_0011_12'], 'c_1001_5' : d['c_1001_0'], 'c_1001_4' : d['c_1001_2'], 'c_1001_7' : negation(d['c_0011_11']), 'c_1001_6' : d['c_1001_3'], 'c_1001_1' : negation(d['c_0011_0']), 'c_1001_0' : d['c_1001_0'], 'c_1001_3' : d['c_1001_3'], 'c_1001_2' : d['c_1001_2'], 'c_1001_9' : negation(d['c_0011_8']), 'c_1001_8' : negation(d['c_0011_8']), 'c_1010_12' : negation(d['c_0011_8']), 'c_1010_11' : negation(d['c_0011_11']), 'c_1010_10' : negation(d['c_0101_8']), 's_3_11' : d['1'], 's_3_10' : d['1'], 's_0_12' : d['1'], 's_3_12' : 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'], 's_2_0' : d['1'], 's_2_1' : d['1'], 's_2_2' : negation(d['1']), 's_2_3' : d['1'], 's_2_4' : negation(d['1']), 's_2_5' : d['1'], 's_2_6' : d['1'], 's_2_7' : d['1'], 's_2_12' : 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' : negation(d['1']), 's_0_7' : d['1'], 's_0_4' : negation(d['1']), 's_0_5' : 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_0011_10' : d['c_0011_10'], 'c_0011_12' : d['c_0011_12'], 'c_1100_5' : negation(d['c_0011_0']), 'c_1100_4' : d['c_0101_11'], 'c_1100_7' : negation(d['c_0101_10']), 'c_1100_6' : negation(d['c_0011_0']), 'c_1100_1' : negation(d['c_0011_0']), 'c_1100_0' : d['c_0101_11'], 'c_1100_3' : d['c_0101_11'], 'c_1100_2' : negation(d['c_0011_0']), 's_0_10' : d['1'], 'c_1100_9' : d['c_1001_3'], 'c_1100_11' : d['c_0101_8'], 'c_1100_10' : d['c_0101_11'], 's_0_11' : d['1'], 'c_1010_7' : negation(d['c_0011_10']), 'c_1010_6' : d['c_1001_2'], 'c_1010_5' : d['c_1001_3'], 'c_1010_4' : negation(d['c_0011_8']), 'c_1010_3' : d['c_1001_0'], 'c_1010_2' : d['c_1001_0'], 'c_1010_1' : d['c_1001_0'], 'c_1010_0' : d['c_1001_2'], 'c_1010_9' : d['c_1001_2'], 'c_1010_8' : d['c_1001_3'], 'c_1100_8' : d['c_0101_11'], 's_3_1' : d['1'], 's_3_0' : negation(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' : negation(d['1']), 's_3_9' : d['1'], 's_3_8' : d['1'], 'c_1100_12' : d['c_0101_11'], 's_1_7' : d['1'], 's_1_6' : d['1'], 's_1_5' : d['1'], 's_1_4' : d['1'], 's_1_3' : d['1'], 's_1_2' : negation(d['1']), 's_1_1' : d['1'], 's_1_0' : negation(d['1']), 's_1_9' : d['1'], 's_1_8' : d['1'], 'c_0011_9' : negation(d['c_0011_12']), 'c_0011_8' : d['c_0011_8'], 'c_0011_5' : negation(d['c_0011_11']), 'c_0011_4' : d['c_0011_12'], 'c_0011_7' : negation(d['c_0011_11']), 'c_0011_6' : negation(d['c_0011_12']), 'c_0011_1' : negation(d['c_0011_0']), 'c_0011_0' : d['c_0011_0'], 'c_0011_3' : d['c_0011_11'], 'c_0011_2' : negation(d['c_0011_0']), 'c_0110_11' : d['c_0011_12'], 'c_0110_10' : d['c_0011_10'], 'c_0110_12' : d['c_0101_8'], 'c_0101_12' : negation(d['c_0011_11']), 'c_0101_7' : d['c_0101_0'], 'c_0101_6' : d['c_0101_10'], 'c_0101_5' : d['c_0101_0'], 'c_0101_4' : d['c_0101_1'], 'c_0101_3' : d['c_0011_10'], '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_8'], 'c_0101_8' : d['c_0101_8'], 's_1_12' : d['1'], 's_1_11' : d['1'], 's_1_10' : d['1'], 'c_0110_9' : d['c_0011_12'], 'c_0110_8' : d['c_0011_10'], 'c_0110_1' : d['c_0101_0'], 'c_0110_0' : d['c_0101_1'], 'c_0110_3' : d['c_0101_0'], 'c_0110_2' : d['c_0011_0'], 'c_0110_5' : d['c_0101_10'], 'c_0110_4' : d['c_0101_10'], 'c_0110_7' : d['c_0011_10'], 'c_0110_6' : d['c_0101_1']})} PY=EVAL=SECTION=ENDS=HERE PRIMARY=DECOMPOSITION=BEGINS=HERE [ Ideal of Polynomial ring of rank 14 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_12, c_0011_8, c_0101_0, c_0101_1, c_0101_10, c_0101_11, c_0101_8, c_1001_0, c_1001_2, c_1001_3 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 3 Groebner basis: [ t - 9/14*c_1001_3^2 + 5/7*c_1001_3 - 3/7, c_0011_0 - 1, c_0011_10 + c_1001_3^2 + c_1001_3 - 1, c_0011_11 + 1, c_0011_12 - 1, c_0011_8 + c_1001_3^2 + c_1001_3 - 1, c_0101_0 + c_1001_3, c_0101_1 + c_1001_3^2 + c_1001_3 - 1, c_0101_10 + c_1001_3, c_0101_11 + c_1001_3^2 + c_1001_3 + 1, c_0101_8 - 2*c_1001_3^2 - 2*c_1001_3, c_1001_0 - c_1001_3^2 - c_1001_3 + 1, c_1001_2 + c_1001_3, c_1001_3^3 - c_1001_3 + 1 ], Ideal of Polynomial ring of rank 14 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_12, c_0011_8, c_0101_0, c_0101_1, c_0101_10, c_0101_11, c_0101_8, c_1001_0, c_1001_2, c_1001_3 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 6 Groebner basis: [ t - 11232/19091*c_1001_3^5 + 33900/19091*c_1001_3^4 - 61862/19091*c_1001_3^3 + 45850/19091*c_1001_3^2 + 7307/19091*c_1001_3 - 120910/19091, c_0011_0 - 1, c_0011_10 + 118/1123*c_1001_3^5 - 37/1123*c_1001_3^4 + 108/1123*c_1001_3^3 + 157/1123*c_1001_3^2 + 119/1123*c_1001_3 + 394/1123, c_0011_11 + 67/1123*c_1001_3^5 - 297/1123*c_1001_3^4 + 442/1123*c_1001_3^3 - 834/1123*c_1001_3^2 + 591/1123*c_1001_3 - 1299/1123, c_0011_12 - 1, c_0011_8 + 45/1123*c_1001_3^5 - 233/1123*c_1001_3^4 + 498/1123*c_1001_3^3 - 711/1123*c_1001_3^2 + 1235/1123*c_1001_3 - 554/1123, c_0101_0 + 109/1123*c_1001_3^5 - 215/1123*c_1001_3^4 + 233/1123*c_1001_3^3 - 150/1123*c_1001_3^2 - 128/1123*c_1001_3 - 169/1123, c_0101_1 + 45/1123*c_1001_3^5 - 233/1123*c_1001_3^4 + 498/1123*c_1001_3^3 - 711/1123*c_1001_3^2 + 1235/1123*c_1001_3 - 554/1123, c_0101_10 + 109/1123*c_1001_3^5 - 215/1123*c_1001_3^4 + 233/1123*c_1001_3^3 - 150/1123*c_1001_3^2 - 128/1123*c_1001_3 - 169/1123, c_0101_11 + 11/1123*c_1001_3^5 - 32/1123*c_1001_3^4 - 28/1123*c_1001_3^3 + 500/1123*c_1001_3^2 - 322/1123*c_1001_3 + 1312/1123, c_0101_8 + 76/1123*c_1001_3^5 - 119/1123*c_1001_3^4 + 317/1123*c_1001_3^3 - 527/1123*c_1001_3^2 + 838/1123*c_1001_3 - 736/1123, c_1001_0 - 45/1123*c_1001_3^5 + 233/1123*c_1001_3^4 - 498/1123*c_1001_3^3 + 711/1123*c_1001_3^2 - 1235/1123*c_1001_3 + 554/1123, c_1001_2 + 109/1123*c_1001_3^5 - 215/1123*c_1001_3^4 + 233/1123*c_1001_3^3 - 150/1123*c_1001_3^2 - 128/1123*c_1001_3 - 169/1123, c_1001_3^6 - 3*c_1001_3^5 + 7*c_1001_3^4 - 10*c_1001_3^3 + 13*c_1001_3^2 - 8*c_1001_3 + 17 ], Ideal of Polynomial ring of rank 14 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_12, c_0011_8, c_0101_0, c_0101_1, c_0101_10, c_0101_11, c_0101_8, c_1001_0, c_1001_2, c_1001_3 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 6 Groebner basis: [ t + 111/17*c_1001_3^5 + 308/17*c_1001_3^4 + 310/17*c_1001_3^3 + 159/17*c_1001_3^2 - 1/17*c_1001_3 - 145/17, c_0011_0 - 1, c_0011_10 - c_1001_3^4 - 3*c_1001_3^3 - 3*c_1001_3^2 - 2*c_1001_3 - 1, c_0011_11 + 1, c_0011_12 + c_1001_3^4 + 2*c_1001_3^3 + 2*c_1001_3^2 + c_1001_3 + 1, c_0011_8 + c_1001_3^4 + c_1001_3^3 + c_1001_3, c_0101_0 + c_1001_3, c_0101_1 - c_1001_3^4 - 3*c_1001_3^3 - 3*c_1001_3^2 - 2*c_1001_3 - 1, c_0101_10 + c_1001_3^5 + 2*c_1001_3^4 - c_1001_3^2 - c_1001_3 - 1, c_0101_11 + c_1001_3^2 + c_1001_3 + 1, c_0101_8 - c_1001_3^3 - 2*c_1001_3^2 - c_1001_3 - 1, c_1001_0 + c_1001_3^4 + 3*c_1001_3^3 + 3*c_1001_3^2 + 2*c_1001_3 + 1, c_1001_2 + c_1001_3, c_1001_3^6 + 3*c_1001_3^5 + 4*c_1001_3^4 + 4*c_1001_3^3 + 3*c_1001_3^2 + c_1001_3 + 1 ], Ideal of Polynomial ring of rank 14 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_12, c_0011_8, c_0101_0, c_0101_1, c_0101_10, c_0101_11, c_0101_8, c_1001_0, c_1001_2, c_1001_3 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 8 Groebner basis: [ t - 53/752*c_1001_3^7 + 2107/12032*c_1001_3^6 - 2305/6016*c_1001_3^5 + 8809/12032*c_1001_3^4 - 9549/12032*c_1001_3^3 + 5757/6016*c_1001_3^2 - 2283/12032*c_1001_3 + 1699/12032, c_0011_0 - 1, c_0011_10 - 52/47*c_1001_3^7 + 168/47*c_1001_3^6 - 386/47*c_1001_3^5 + 802/47*c_1001_3^4 - 1101/47*c_1001_3^3 + 1290/47*c_1001_3^2 - 890/47*c_1001_3 + 323/47, c_0011_11 - 43/47*c_1001_3^7 + 157/47*c_1001_3^6 - 368/47*c_1001_3^5 + 759/47*c_1001_3^4 - 1112/47*c_1001_3^3 + 1271/47*c_1001_3^2 - 933/47*c_1001_3 + 315/47, c_0011_12 - 43/47*c_1001_3^7 + 157/47*c_1001_3^6 - 368/47*c_1001_3^5 + 759/47*c_1001_3^4 - 1112/47*c_1001_3^3 + 1271/47*c_1001_3^2 - 933/47*c_1001_3 + 362/47, c_0011_8 + 36/47*c_1001_3^7 - 138/47*c_1001_3^6 + 307/47*c_1001_3^5 - 642/47*c_1001_3^4 + 943/47*c_1001_3^3 - 1016/47*c_1001_3^2 + 815/47*c_1001_3 - 220/47, c_0101_0 - 9/47*c_1001_3^7 + 11/47*c_1001_3^6 - 18/47*c_1001_3^5 + 43/47*c_1001_3^4 + 11/47*c_1001_3^3 - 28/47*c_1001_3^2 + 90/47*c_1001_3 - 86/47, c_0101_1 - 14/47*c_1001_3^7 + 38/47*c_1001_3^6 - 75/47*c_1001_3^5 + 140/47*c_1001_3^4 - 150/47*c_1001_3^3 + 134/47*c_1001_3^2 - 1/47*c_1001_3 - 45/47, c_0101_10 - 1/47*c_1001_3^7 - 4/47*c_1001_3^6 - 2/47*c_1001_3^5 + 10/47*c_1001_3^4 - 4/47*c_1001_3^3 + 70/47*c_1001_3^2 - 84/47*c_1001_3 + 121/47, c_0101_11 + 14/47*c_1001_3^7 - 38/47*c_1001_3^6 + 75/47*c_1001_3^5 - 140/47*c_1001_3^4 + 150/47*c_1001_3^3 - 134/47*c_1001_3^2 + 1/47*c_1001_3 + 45/47, c_0101_8 - 15/47*c_1001_3^7 + 34/47*c_1001_3^6 - 77/47*c_1001_3^5 + 150/47*c_1001_3^4 - 154/47*c_1001_3^3 + 204/47*c_1001_3^2 - 38/47*c_1001_3 + 29/47, c_1001_0 + 14/47*c_1001_3^7 - 38/47*c_1001_3^6 + 75/47*c_1001_3^5 - 140/47*c_1001_3^4 + 150/47*c_1001_3^3 - 134/47*c_1001_3^2 + 1/47*c_1001_3 + 45/47, c_1001_2 - 9/47*c_1001_3^7 + 11/47*c_1001_3^6 - 18/47*c_1001_3^5 + 43/47*c_1001_3^4 + 11/47*c_1001_3^3 - 28/47*c_1001_3^2 + 90/47*c_1001_3 - 86/47, c_1001_3^8 - 5*c_1001_3^7 + 13*c_1001_3^6 - 28*c_1001_3^5 + 47*c_1001_3^4 - 59*c_1001_3^3 + 56*c_1001_3^2 - 31*c_1001_3 + 8 ], Ideal of Polynomial ring of rank 14 over Rational Field Order: Lexicographical Variables: t, c_0011_0, c_0011_10, c_0011_11, c_0011_12, c_0011_8, c_0101_0, c_0101_1, c_0101_10, c_0101_11, c_0101_8, c_1001_0, c_1001_2, c_1001_3 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 10 Groebner basis: [ t - 2339640693/546782*c_1001_3^9 + 9379909267/1093564*c_1001_3^8 - 20997437859/1093564*c_1001_3^7 + 15695404791/546782*c_1001_3^6 - 847168831/14389*c_1001_3^5 + 27472541013/546782*c_1001_3^4 - 65655914383/1093564*c_1001_3^3 + 15618506435/546782*c_1001_3^2 + 5124806017/1093564*c_1001_3 - 1002836210/273391, c_0011_0 - 1, c_0011_10 - 145402/43167*c_1001_3^9 + 140543/43167*c_1001_3^8 - 144617/14389*c_1001_3^7 + 141907/14389*c_1001_3^6 - 434762/14389*c_1001_3^5 + 32153/43167*c_1001_3^4 - 1221071/43167*c_1001_3^3 - 654470/43167*c_1001_3^2 + 255239/43167*c_1001_3 + 130991/43167, c_0011_11 + 142108/43167*c_1001_3^9 - 160682/43167*c_1001_3^8 + 148686/14389*c_1001_3^7 - 161130/14389*c_1001_3^6 + 446526/14389*c_1001_3^5 - 242177/43167*c_1001_3^4 + 1187387/43167*c_1001_3^3 + 419864/43167*c_1001_3^2 - 340007/43167*c_1001_3 - 122606/43167, c_0011_12 - 142108/43167*c_1001_3^9 + 160682/43167*c_1001_3^8 - 148686/14389*c_1001_3^7 + 161130/14389*c_1001_3^6 - 446526/14389*c_1001_3^5 + 242177/43167*c_1001_3^4 - 1187387/43167*c_1001_3^3 - 419864/43167*c_1001_3^2 + 340007/43167*c_1001_3 + 122606/43167, c_0011_8 - 145402/43167*c_1001_3^9 + 140543/43167*c_1001_3^8 - 144617/14389*c_1001_3^7 + 141907/14389*c_1001_3^6 - 434762/14389*c_1001_3^5 + 32153/43167*c_1001_3^4 - 1221071/43167*c_1001_3^3 - 654470/43167*c_1001_3^2 + 255239/43167*c_1001_3 + 130991/43167, c_0101_0 + 155594/43167*c_1001_3^9 - 152089/43167*c_1001_3^8 + 153248/14389*c_1001_3^7 - 150923/14389*c_1001_3^6 + 458269/14389*c_1001_3^5 - 26125/43167*c_1001_3^4 + 1243336/43167*c_1001_3^3 + 667312/43167*c_1001_3^2 - 349249/43167*c_1001_3 - 196459/43167, c_0101_1 - 89618/43167*c_1001_3^9 + 73621/43167*c_1001_3^8 - 79272/14389*c_1001_3^7 + 68209/14389*c_1001_3^6 - 238843/14389*c_1001_3^5 - 139643/43167*c_1001_3^4 - 598789/43167*c_1001_3^3 - 520075/43167*c_1001_3^2 + 211735/43167*c_1001_3 + 143548/43167, c_0101_10 + c_1001_3, c_0101_11 - 130040/43167*c_1001_3^9 + 126376/43167*c_1001_3^8 - 128228/14389*c_1001_3^7 + 124997/14389*c_1001_3^6 - 387740/14389*c_1001_3^5 + 35377/43167*c_1001_3^4 - 1074334/43167*c_1001_3^3 - 554794/43167*c_1001_3^2 + 210430/43167*c_1001_3 + 143755/43167, c_0101_8 + 91814/14389*c_1001_3^9 - 88973/14389*c_1001_3^8 + 272845/14389*c_1001_3^7 - 266904/14389*c_1001_3^6 + 822502/14389*c_1001_3^5 - 22510/14389*c_1001_3^4 + 765135/14389*c_1001_3^3 + 403088/14389*c_1001_3^2 - 155223/14389*c_1001_3 - 91582/14389, c_1001_0 + 89618/43167*c_1001_3^9 - 73621/43167*c_1001_3^8 + 79272/14389*c_1001_3^7 - 68209/14389*c_1001_3^6 + 238843/14389*c_1001_3^5 + 139643/43167*c_1001_3^4 + 598789/43167*c_1001_3^3 + 520075/43167*c_1001_3^2 - 211735/43167*c_1001_3 - 143548/43167, c_1001_2 + 155594/43167*c_1001_3^9 - 152089/43167*c_1001_3^8 + 153248/14389*c_1001_3^7 - 150923/14389*c_1001_3^6 + 458269/14389*c_1001_3^5 - 26125/43167*c_1001_3^4 + 1243336/43167*c_1001_3^3 + 667312/43167*c_1001_3^2 - 349249/43167*c_1001_3 - 196459/43167, c_1001_3^10 - 3/2*c_1001_3^9 + 7/2*c_1001_3^8 - 9/2*c_1001_3^7 + 21/2*c_1001_3^6 - 5*c_1001_3^5 + 17/2*c_1001_3^4 - 4*c_1001_3^2 + 1/2 ] ] PRIMARY=DECOMPOSITION=ENDS=HERE CPUTIME : 1.410 Total time: 1.620 seconds, Total memory usage: 32.09MB