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Loading file "m022__sl3_c0.magma" ==TRIANGULATION=BEGINS== % Triangulation m022 geometric_solution 2.98912028 oriented_manifold CS_known 0.0000000000000001 1 0 torus 0.000000000000 0.000000000000 4 1 2 2 1 0132 0132 1023 3201 0 0 0 0 0 -1 0 1 0 0 1 -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 1 0 -1 0 0 -1 1 -1 1 0 0 -1 2 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.203723267852 0.560667728005 0 0 3 3 0132 2310 2310 0132 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 0 0 0 0 0 0 0 1 -1 0 0 1 1 -2 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 2.154659644077 1.804008823480 3 0 0 3 0321 0132 1023 2103 0 0 0 0 0 1 -1 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 1 0 0 0 0 0 0 -2 0 2 0 -1 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.203723267852 0.560667728005 2 1 1 2 0321 3201 0132 2103 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 2 0 -2 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -0.251686680526 0.393228424280 ==TRIANGULATION=ENDS== PY=EVAL=SECTION=BEGINS=HERE {'variable_dict' : (lambda d, negation = (lambda x:-x): { 'c_1020_2' : d['c_0102_2'], 'c_1020_3' : d['c_0102_0'], 'c_1020_0' : d['c_0102_0'], 'c_1020_1' : d['c_0201_1'], 'c_0201_0' : d['c_0102_2'], 'c_0201_1' : d['c_0201_1'], 'c_0201_2' : d['c_0102_0'], 'c_0201_3' : d['c_0102_2'], 'c_2100_0' : d['c_0012_1'], 'c_2100_1' : d['c_0021_3'], 'c_2100_2' : d['c_0012_0'], 'c_2100_3' : d['c_0021_3'], 'c_2010_2' : d['c_0102_0'], 'c_2010_3' : d['c_0102_2'], 'c_2010_0' : d['c_0102_2'], 'c_2010_1' : d['c_0102_1'], 'c_0102_0' : d['c_0102_0'], 'c_0102_1' : d['c_0102_1'], 'c_0102_2' : d['c_0102_2'], 'c_0102_3' : d['c_0102_0'], 'c_1101_0' : d['c_1101_0'], 'c_1101_1' : d['c_1011_3'], 'c_1101_2' : negation(d['c_1101_0']), 'c_1101_3' : d['c_1101_3'], 'c_1200_2' : d['c_0012_1'], 'c_1200_3' : d['c_0012_3'], 'c_1200_0' : d['c_0012_0'], 'c_1200_1' : d['c_0012_3'], 'c_1110_2' : d['c_1110_2'], 'c_1110_3' : negation(d['c_1110_2']), 'c_1110_0' : negation(d['c_1011_1']), 'c_1110_1' : d['c_1101_3'], 'c_0120_0' : d['c_0102_1'], 'c_0120_1' : d['c_0102_0'], 'c_0120_2' : d['c_0021_3'], 'c_0120_3' : d['c_0012_0'], 'c_2001_0' : d['c_0102_0'], 'c_2001_1' : d['c_0102_0'], 'c_2001_2' : d['c_0102_2'], 'c_2001_3' : d['c_0102_1'], 'c_0012_2' : d['c_0012_1'], 'c_0012_3' : d['c_0012_3'], 'c_0012_0' : d['c_0012_0'], 'c_0012_1' : d['c_0012_1'], 'c_0111_0' : d['c_0111_0'], 'c_0111_1' : negation(d['c_0111_0']), 'c_0111_2' : d['c_0111_2'], 'c_0111_3' : negation(d['c_0111_2']), 'c_0210_2' : d['c_0012_3'], 'c_0210_3' : d['c_0012_1'], 'c_0210_0' : d['c_0201_1'], 'c_0210_1' : d['c_0102_2'], 'c_1002_2' : d['c_0102_0'], 'c_1002_3' : d['c_0201_1'], 'c_1002_0' : d['c_0102_2'], 'c_1002_1' : d['c_0102_2'], 'c_1011_2' : negation(d['c_1011_0']), 'c_1011_3' : d['c_1011_3'], 'c_1011_0' : d['c_1011_0'], 'c_1011_1' : d['c_1011_1'], 'c_0021_0' : d['c_0012_1'], 'c_0021_1' : d['c_0012_0'], 'c_0021_2' : d['c_0012_0'], 'c_0021_3' : d['c_0021_3']})} PY=EVAL=SECTION=ENDS=HERE PRIMARY_DECOMPOSITION_TIME: 484.620 PRIMARY=DECOMPOSITION=BEGINS=HERE [ Ideal of Polynomial ring of rank 17 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0012_3, c_0021_3, c_0102_0, c_0102_1, c_0102_2, c_0111_0, c_0111_2, c_0201_1, c_1011_0, c_1011_1, c_1011_3, c_1101_0, c_1101_3, c_1110_2 Inhomogeneous, Dimension 1, Radical, Prime Groebner basis: [ t*c_0201_1^7 + 2*t*c_0201_1^6*c_1101_3^2 + 4*t*c_0201_1^6*c_1101_3 - 4*t*c_0201_1^6 + 9*t*c_0201_1^5*c_1101_3^2 - t*c_0201_1^5 + t*c_0201_1^4*c_1101_3^2 + 9*t*c_0201_1^4*c_1101_3 - 4*t*c_0201_1^4 - 6*t*c_0201_1^3*c_1101_3^2 - 9*t*c_0201_1^3*c_1101_3 + 5*t*c_0201_1^3 - 6*t*c_0201_1^2*c_1101_3^2 - 4*t*c_0201_1^2*c_1101_3 + 3*t*c_0201_1^2 + c_1101_3, c_0012_0 - 1, c_0012_1 - c_0201_1*c_1101_3^2 + c_0201_1*c_1101_3 + c_0201_1 + c_1101_3^2 - c_1101_3 - 1, c_0012_3 - c_0201_1*c_1101_3^2 + c_0201_1*c_1101_3 + c_0201_1 - c_1101_3, c_0021_3 - c_0201_1, c_0102_0 - c_0201_1 - c_1101_3, c_0102_1 - c_0201_1*c_1101_3^2 + c_0201_1*c_1101_3 + c_0201_1 - c_1101_3, c_0102_2 - c_0201_1*c_1101_3^2 + 2*c_0201_1 - 1, c_0111_0 - 1, c_0111_2 + 1, c_1011_0 - c_1101_3^2 + 2, c_1011_1 + 1, c_1011_3 - c_1101_3, c_1101_0 - c_1101_3^2 + 2, c_1101_3^3 - c_1101_3^2 - 2*c_1101_3 + 1, c_1110_2 + 1 ], Ideal of Polynomial ring of rank 17 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0012_3, c_0021_3, c_0102_0, c_0102_1, c_0102_2, c_0111_0, c_0111_2, c_0201_1, c_1011_0, c_1011_1, c_1011_3, c_1101_0, c_1101_3, c_1110_2 Inhomogeneous, Dimension 1, Radical, Prime Groebner basis: [ t*c_0201_1^7 + 3*t*c_0201_1^6*c_1101_3 + 2*t*c_0201_1^6 + 3*t*c_0201_1^5*c_1101_3 - t*c_0201_1^5 - 3*t*c_0201_1^4*c_1101_3 - 3*t*c_0201_1^4 - 3*t*c_0201_1^3*c_1101_3 + t*c_0201_1^2 - 16*c_1101_3 + 8, c_0012_0 - 1, c_0012_1 + c_0201_1*c_1101_3 + 1/2*c_0201_1 - c_1101_3 - 1/2, c_0012_3 + c_0201_1*c_1101_3 + 1/2*c_0201_1 + c_1101_3 + 1/2, c_0021_3 - c_0201_1, c_0102_0 - c_0201_1*c_1101_3 + 1/2*c_0201_1 + c_1101_3 + 1/2, c_0102_1 + c_0201_1*c_1101_3 + 1/2*c_0201_1 + c_1101_3 + 1/2, c_0102_2 - c_0201_1*c_1101_3 - 1/2*c_0201_1 - c_1101_3 + 1/2, c_0111_0 - 1, c_0111_2 - c_1101_3 - 1, c_1011_0 + c_1101_3, c_1011_1 - c_1101_3 - 1, c_1011_3 - c_1101_3, c_1101_0 + c_1101_3, c_1101_3^2 + 1/2*c_1101_3 + 1/2, c_1110_2 + 1 ], Ideal of Polynomial ring of rank 17 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0012_3, c_0021_3, c_0102_0, c_0102_1, c_0102_2, c_0111_0, c_0111_2, c_0201_1, c_1011_0, c_1011_1, c_1011_3, c_1101_0, c_1101_3, c_1110_2 Inhomogeneous, Dimension 1, Radical, Prime Groebner basis: [ t*c_1101_0 - t*c_1101_3^2 - 6*t*c_1101_3*c_1110_2^7 + 14*t*c_1101_3*c_1110_2^6 + 14*t*c_1101_3*c_1110_2^5 - 31*t*c_1101_3*c_1110_2^4 - 11*t*c_1101_3*c_1110_2^3 + 9*t*c_1101_3*c_1110_2^2 - 2*t*c_1101_3*c_1110_2 - t*c_1101_3 + 5*t*c_1110_2^7 - 12*t*c_1110_2^6 - 12*t*c_1110_2^5 + 28*t*c_1110_2^4 + 10*t*c_1110_2^3 - 9*t*c_1110_2^2 + t*c_1110_2 + 2*t + 857*c_1101_0*c_1110_2^2 + 479*c_1101_0*c_1110_2 - 1917*c_1101_0 + 1738*c_1101_3^2 + 857*c_1101_3*c_1110_2^2 + 3128*c_1101_3*c_1110_2 + 1823*c_1101_3 + 857*c_1110_2^3 - 324*c_1110_2^2 - 1685*c_1110_2 - 3422, t*c_1101_3^2*c_1110_2^2 - 4*t*c_1101_3*c_1110_2^7 + 11*t*c_1101_3*c_1110_2^6 + 9*t*c_1101_3*c_1110_2^5 - 27*t*c_1101_3*c_1110_2^4 - 9*t*c_1101_3*c_1110_2^3 + 10*t*c_1101_3*c_1110_2^2 + 5*t*c_1110_2^7 - 13*t*c_1110_2^6 - 10*t*c_1110_2^5 + 30*t*c_1110_2^4 + 8*t*c_1110_2^3 - 11*t*c_1110_2^2 + 799*c_1101_0*c_1110_2^2 + 444*c_1101_0*c_1110_2 - 1793*c_1101_0 + 1614*c_1101_3^2 + 799*c_1101_3*c_1110_2^2 + 2893*c_1101_3*c_1110_2 + 1699*c_1101_3 + 799*c_1110_2^3 - 319*c_1110_2^2 - 1557*c_1110_2 - 3174, t*c_1110_2^8 - 3*t*c_1110_2^7 - t*c_1110_2^6 + 7*t*c_1110_2^5 - t*c_1110_2^4 - 3*t*c_1110_2^3 + t*c_1110_2^2 - 85*c_1101_0*c_1110_2^2 - 47*c_1101_0*c_1110_2 + 192*c_1101_0 - 179*c_1101_3^2 - 85*c_1101_3*c_1110_2^2 - 324*c_1101_3*c_1110_2 - 183*c_1101_3 - 85*c_1110_2^3 + 34*c_1110_2^2 + 189*c_1110_2 + 358, c_0012_0 - 1, c_0012_1 + 1, c_0012_3 - 2*c_1101_0*c_1110_2^2 - c_1101_0*c_1110_2 + 4*c_1101_0 - 4*c_1101_3^2 - 2*c_1101_3*c_1110_2^2 - 7*c_1101_3*c_1110_2 - 5*c_1101_3 - 2*c_1110_2^3 + c_1110_2^2 + 3*c_1110_2 + 8, c_0021_3 + 2*c_1101_0*c_1110_2^2 + c_1101_0*c_1110_2 - 4*c_1101_0 + 4*c_1101_3^2 + 2*c_1101_3*c_1110_2^2 + 7*c_1101_3*c_1110_2 + 5*c_1101_3 + 2*c_1110_2^3 - c_1110_2^2 - 3*c_1110_2 - 8, c_0102_0 + 4*c_1101_0*c_1110_2^2 + 2*c_1101_0*c_1110_2 - 9*c_1101_0 + 8*c_1101_3^2 + 4*c_1101_3*c_1110_2^2 + 14*c_1101_3*c_1110_2 + 9*c_1101_3 + 4*c_1110_2^3 - 2*c_1110_2^2 - 7*c_1110_2 - 17, c_0102_1 - 2*c_1101_0*c_1110_2^2 - c_1101_0*c_1110_2 + 4*c_1101_0 - 4*c_1101_3^2 - 2*c_1101_3*c_1110_2^2 - 7*c_1101_3*c_1110_2 - 5*c_1101_3 - 2*c_1110_2^3 + c_1110_2^2 + 3*c_1110_2 + 8, c_0102_2 - 4*c_1101_0*c_1110_2^2 - 2*c_1101_0*c_1110_2 + 9*c_1101_0 - 8*c_1101_3^2 - 4*c_1101_3*c_1110_2^2 - 14*c_1101_3*c_1110_2 - 9*c_1101_3 - 4*c_1110_2^3 + 2*c_1110_2^2 + 7*c_1110_2 + 17, c_0111_0 - 1, c_0111_2 + 1, c_0201_1 + 2*c_1101_0*c_1110_2^2 + c_1101_0*c_1110_2 - 4*c_1101_0 + 4*c_1101_3^2 + 2*c_1101_3*c_1110_2^2 + 7*c_1101_3*c_1110_2 + 5*c_1101_3 + 2*c_1110_2^3 - c_1110_2^2 - 3*c_1110_2 - 8, c_1011_0 - 3*c_1101_0*c_1110_2^2 - c_1101_0*c_1110_2 + 7*c_1101_0 - 6*c_1101_3^2 - 3*c_1101_3*c_1110_2^2 - 10*c_1101_3*c_1110_2 - 7*c_1101_3 - 3*c_1110_2^3 + 2*c_1110_2^2 + 5*c_1110_2 + 12, c_1011_1 - c_1110_2, c_1011_3 + 3*c_1101_0*c_1110_2^2 + 2*c_1101_0*c_1110_2 - 7*c_1101_0 + 6*c_1101_3^2 + 3*c_1101_3*c_1110_2^2 + 11*c_1101_3*c_1110_2 + 7*c_1101_3 + 3*c_1110_2^3 - c_1110_2^2 - 5*c_1110_2 - 13, c_1101_0^2 + c_1101_0*c_1110_2 + 3*c_1101_0 - c_1101_3^2 - c_1101_3*c_1110_2 - 2*c_1101_3 + 1, c_1101_0*c_1101_3 - c_1101_0*c_1110_2^2 + c_1101_0 - c_1101_3^2 - c_1101_3*c_1110_2^2 - 2*c_1101_3*c_1110_2 - c_1101_3 - c_1110_2^3 + c_1110_2^2 + 2*c_1110_2 + 1, c_1101_0*c_1110_2^3 + c_1101_0*c_1110_2^2 - 2*c_1101_0*c_1110_2 - c_1101_0 + 2*c_1101_3^2*c_1110_2 + c_1101_3^2 + c_1101_3*c_1110_2^3 + 4*c_1101_3*c_1110_2^2 + 4*c_1101_3*c_1110_2 + c_1101_3 + c_1110_2^4 - 2*c_1110_2^2 - 5*c_1110_2 - 2, c_1101_3^3 + 2*c_1101_3^2*c_1110_2 + c_1101_3^2 - c_1101_3*c_1110_2^2 - c_1101_3*c_1110_2 - 2*c_1101_3 - c_1110_2^3 + 2*c_1110_2^2 + c_1110_2 - 1 ], Ideal of Polynomial ring of rank 17 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0012_3, c_0021_3, c_0102_0, c_0102_1, c_0102_2, c_0111_0, c_0111_2, c_0201_1, c_1011_0, c_1011_1, c_1011_3, c_1101_0, c_1101_3, c_1110_2 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 2 Groebner basis: [ t + 1/32, c_0012_0 - 1, c_0012_1 - 1, c_0012_3 + c_1101_3 + 1, c_0021_3 - c_1101_3 - 2, c_0102_0 - 1, c_0102_1 - c_1101_3 - 2, c_0102_2 - 1, c_0111_0 - 1, c_0111_2 + 1, c_0201_1 + c_1101_3 + 1, c_1011_0 + c_1101_3 + 1, c_1011_1 - 1, c_1011_3 - c_1101_3 - 3, c_1101_0 + c_1101_3 + 2, c_1101_3^2 + 3*c_1101_3 + 4, c_1110_2 - 1 ], Ideal of Polynomial ring of rank 17 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0012_3, c_0021_3, c_0102_0, c_0102_1, c_0102_2, c_0111_0, c_0111_2, c_0201_1, c_1011_0, c_1011_1, c_1011_3, c_1101_0, c_1101_3, c_1110_2 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 4 Groebner basis: [ t - 402*c_1101_3^3 - 805*c_1101_3^2 - 188*c_1101_3 + 346, c_0012_0 - 1, c_0012_1 - 1, c_0012_3 - c_1101_3^2, c_0021_3 - c_1101_3^2, c_0102_0 + c_1101_3^2 + c_1101_3, c_0102_1 - c_1101_3^2, c_0102_2 + c_1101_3^2 + c_1101_3, c_0111_0 - 1, c_0111_2 + 1, c_0201_1 - c_1101_3^2, c_1011_0 + 2*c_1101_3^3 + 5*c_1101_3^2 + 2*c_1101_3 - 2, c_1011_1 - 1, c_1011_3 + c_1101_3, c_1101_0 - 2*c_1101_3^3 - 5*c_1101_3^2 - 2*c_1101_3 + 2, c_1101_3^4 + 3/2*c_1101_3^3 - 1/2*c_1101_3^2 - c_1101_3 + 1/2, c_1110_2 - 1 ], Ideal of Polynomial ring of rank 17 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0012_3, c_0021_3, c_0102_0, c_0102_1, c_0102_2, c_0111_0, c_0111_2, c_0201_1, c_1011_0, c_1011_1, c_1011_3, c_1101_0, c_1101_3, c_1110_2 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 12 Groebner basis: [ t + 193592383/234256*c_1101_3^11 + 189523991/117128*c_1101_3^10 + 78390771/14641*c_1101_3^9 + 2996248757/937024*c_1101_3^8 + 4562077451/468512*c_1101_3^7 + 7511076691/937024*c_1101_3^6 + 355858885/85184*c_1101_3^5 + 1681190909/937024*c_1101_3^4 + 821773565/468512*c_1101_3^3 + 2208503775/937024*c_1101_3^2 + 926585893/937024*c_1101_3 + 102679283/234256, c_0012_0 - 1, c_0012_1 - 255/16*c_1101_3^11 - 553/16*c_1101_3^10 - 879/8*c_1101_3^9 - 5381/64*c_1101_3^8 - 12911/64*c_1101_3^7 - 12617/64*c_1101_3^6 - 3601/32*c_1101_3^5 - 897/16*c_1101_3^4 - 2475/64*c_1101_3^3 - 3157/64*c_1101_3^2 - 23*c_1101_3 - 581/64, c_0012_3 - 29/4*c_1101_3^11 - 11*c_1101_3^10 - 171/4*c_1101_3^9 - 163/16*c_1101_3^8 - 339/4*c_1101_3^7 - 271/8*c_1101_3^6 - 233/8*c_1101_3^5 - 75/16*c_1101_3^4 - 265/16*c_1101_3^3 - 183/16*c_1101_3^2 - 73/16*c_1101_3 - 13/16, c_0021_3 - 33/16*c_1101_3^11 + 61/16*c_1101_3^10 - 21/8*c_1101_3^9 + 2373/64*c_1101_3^8 - 1269/64*c_1101_3^7 + 4673/64*c_1101_3^6 + 351/32*c_1101_3^5 + 235/8*c_1101_3^4 - 457/64*c_1101_3^3 + 1013/64*c_1101_3^2 + 99/16*c_1101_3 + 281/64, c_0102_0 - 207/16*c_1101_3^11 - 307/16*c_1101_3^10 - 611/8*c_1101_3^9 - 1029/64*c_1101_3^8 - 9901/64*c_1101_3^7 - 3401/64*c_1101_3^6 - 61*c_1101_3^5 - 47/32*c_1101_3^4 - 2261/64*c_1101_3^3 - 977/64*c_1101_3^2 - 293/32*c_1101_3 - 23/64, c_0102_1 - 29/4*c_1101_3^11 - 11*c_1101_3^10 - 171/4*c_1101_3^9 - 163/16*c_1101_3^8 - 339/4*c_1101_3^7 - 271/8*c_1101_3^6 - 233/8*c_1101_3^5 - 75/16*c_1101_3^4 - 265/16*c_1101_3^3 - 183/16*c_1101_3^2 - 73/16*c_1101_3 - 13/16, c_0102_2 - 19/16*c_1101_3^11 - 49/16*c_1101_3^10 - 73/8*c_1101_3^9 - 625/64*c_1101_3^8 - 1095/64*c_1101_3^7 - 1433/64*c_1101_3^6 - 385/32*c_1101_3^5 - 93/8*c_1101_3^4 - 127/64*c_1101_3^3 - 473/64*c_1101_3^2 - 33/16*c_1101_3 - 145/64, c_0111_0 - 1, c_0111_2 - 1/8*c_1101_3^11 - 1/8*c_1101_3^10 - 3/4*c_1101_3^9 + 5/32*c_1101_3^8 - 63/32*c_1101_3^7 + 21/32*c_1101_3^6 - 2*c_1101_3^5 + 25/16*c_1101_3^4 - 67/32*c_1101_3^3 + 57/32*c_1101_3^2 - 17/16*c_1101_3 - 1/32, c_0201_1 - 33/16*c_1101_3^11 + 61/16*c_1101_3^10 - 21/8*c_1101_3^9 + 2373/64*c_1101_3^8 - 1269/64*c_1101_3^7 + 4673/64*c_1101_3^6 + 351/32*c_1101_3^5 + 235/8*c_1101_3^4 - 457/64*c_1101_3^3 + 1013/64*c_1101_3^2 + 99/16*c_1101_3 + 281/64, c_1011_0 - 5/2*c_1101_3^11 - 25/4*c_1101_3^10 - 19*c_1101_3^9 - 155/8*c_1101_3^8 - 579/16*c_1101_3^7 - 353/8*c_1101_3^6 - 417/16*c_1101_3^5 - 347/16*c_1101_3^4 - 97/16*c_1101_3^3 - 13*c_1101_3^2 - 83/16*c_1101_3 - 57/16, c_1011_1 + 1/8*c_1101_3^11 + 1/8*c_1101_3^10 + 3/4*c_1101_3^9 - 5/32*c_1101_3^8 + 63/32*c_1101_3^7 - 21/32*c_1101_3^6 + 2*c_1101_3^5 - 25/16*c_1101_3^4 + 67/32*c_1101_3^3 - 57/32*c_1101_3^2 + 17/16*c_1101_3 + 1/32, c_1011_3 + c_1101_3, c_1101_0 + 5/2*c_1101_3^11 + 25/4*c_1101_3^10 + 19*c_1101_3^9 + 155/8*c_1101_3^8 + 579/16*c_1101_3^7 + 353/8*c_1101_3^6 + 417/16*c_1101_3^5 + 347/16*c_1101_3^4 + 97/16*c_1101_3^3 + 13*c_1101_3^2 + 83/16*c_1101_3 + 57/16, c_1101_3^12 + 2*c_1101_3^11 + 7*c_1101_3^10 + 19/4*c_1101_3^9 + 29/2*c_1101_3^8 + 21/2*c_1101_3^7 + 43/4*c_1101_3^6 + 7/2*c_1101_3^5 + 17/4*c_1101_3^4 + 5/2*c_1101_3^3 + 9/4*c_1101_3^2 + 3/4*c_1101_3 + 1/4, c_1110_2 - 1 ] ] PRIMARY=DECOMPOSITION=ENDS=HERE FREE=VARIABLES=IN=COMPONENTS=BEGINS=HERE [ [ "c_0201_1" ], [ "c_0201_1" ], [ "c_1110_2" ], [ ], [ ], [ ] ] FREE=VARIABLES=IN=COMPONENTS=ENDS=HERE CPUTIME: 484.620 Total time: 484.819 seconds, Total memory usage: 1083.72MB