* *************************** * SET UP THE INITIAL DATA * *************************** * Problem: * ******** * A relaxation of an nonlinear integer programming problem for finding * optimal nuclear reactor core reload patterns (small size version). * Source: * A.J. Quist, E. de Klerk, C. Roos, T. Terlaky, R. van Geemert, * J.E. Hoogenboom, T.Illes, * "Finding Optimal Nuclear Reactor Core Reload Patterns Using Nonlinear * Optimization and Search Heuristics", * Delft University, January 1998. * classification LOI2-RN-343-313 * SIF input: Arie Quist, Delft, 1998. * Some useful constants * Sizes * Physical Data * Objective * Sumi(l,m) and sumlm(i) * Kern, peak and norm contain no linear elements. * Burn contains two * Kern, burn, norm: See section 3.1 * Peak: See section 3.4 AND 4.4.3 * Plac contains k(i,1) and -sum_m x(i,1,m)*kfresh (Section 3.3) * Kefford contains two linear terms. * This constraint is in section 4.4.2 of the paper * Two adjacent diagonal positions contain the same fuel. * See section 3.6, although it is not explicitly stated. * Rhs of sum-constraints = 1 * Rhs of Norm-constraints = 1 * Rhs of peak constraints = Flim/Nnod * X(i,l,m) variables between 0 en 1 * k(i,t) en keff(t) between 0 en kfresh * phi(i,t) between 0.0001 (bijv?) en 1.0(bijv?) * Epsilon between 0 en 0.01. Currently between 0 and 100 *XL x(i,l,m) 0.08333333 *XU x(i,l,m) 0.08333334 * See Section 4.4.1 of the paper cited as Source. * Elements k(i,t)*phi(i,t) * Elements keff(t)*phi(i,t) * Elements x(i,l,m)*x(j,l-1,m)*k(j,EoC) * Kern(i,t) contains groups kefph(i,t) and kphi(j,t) * -G(i,j) * Norm(t) contains groups kphi(i,t) with factor v(i) * Burn(i,t) contains alpha*Pc*delta_t *kphi(i,t) * Peak(i,t) contains kphi(i,t) $offdigit Parameter nnod ; nnod = 14; Parameter nred ; nred = 12; Parameter ndia ; ndia = 2; Parameter ntim ; ntim = 6; Parameter nage ; nage = 4; Parameter d1_1 ; d1_1 = 1.0; Parameter d2_1 ; d2_1 = 11.0; Parameter d1_2 ; d1_2 = 7.0; Parameter d2_2 ; d2_2 = 14.0; Parameter alpha ; alpha = 6.0e-6; Parameter pc ; pc = 364.0; Parameter cyclen ; cyclen = 350.0; Parameter kfresh ; kfresh = 1.2; Parameter flim ; flim = 2.0; Parameter w1 ; w1 = 1.0; Parameter v1 ; v1 = 0.5; Parameter v2 ; v2 = 1.0; Parameter v3 ; v3 = 1.0; Parameter v4 ; v4 = 1.0; Parameter v5 ; v5 = 1.0; Parameter v6 ; v6 = 1.0; Parameter v7 ; v7 = 0.5; Parameter v8 ; v8 = 1.0; Parameter v9 ; v9 = 1.0; Parameter v10 ; v10 = 1.0; Parameter v11 ; v11 = 0.5; Parameter v12 ; v12 = 1.0; Parameter v13 ; v13 = 1.0; Parameter v14 ; v14 = 0.5; Parameter rnnod ; rnnod = 14.0; Parameter rntim ; rntim = 6.0; Parameter rnred ; rnred = 12.0; Parameter rntimm1 ; rntimm1 = -1.0 + (6.0); Parameter fl_nred ; fl_nred = (2.0) / (12.0); Parameter ntimm1 ; ntimm1 = -1 + (6); Parameter dt ; dt = (350.0) / (-1.0 + (6.0)); Parameter alp_pc ; alp_pc = (6.0e-6) * (364.0); Parameter alp_pc_dt; alp_pc_dt= ((6.0e-6)*364.0)*((350.0)/(-1.0 + 6.0)); Parameter ntra ; ntra = 4; Parameter tp1 ; tp1 = 1 + (5); Parameter d1 ; d1 = round(0 + (11.0)); Parameter d2 ; d2 = round(0 + (14.0)); Parameter myg ; myg = -0.999 + (-0.684); Parameter myintg ; myintg = -1 * (round(-0.999 + (-0.684))); Variable x1_1_1 , x1_1_2 , x1_1_3 , x1_2_1 , x1_2_2 , x1_2_3 , x1_3_1 , x1_3_2 , x1_3_3 , x1_4_1 , x1_4_2 , x1_4_3 , x2_1_1 , x2_1_2 , x2_1_3 , x2_2_1 , x2_2_2 , x2_2_3 , x2_3_1 , x2_3_2 , x2_3_3 , x2_4_1 , x2_4_2 , x2_4_3 , x3_1_1 , x3_1_2 , x3_1_3 , x3_2_1 , x3_2_2 , x3_2_3 , x3_3_1 , x3_3_2 , x3_3_3 , x3_4_1 , x3_4_2 , x3_4_3 , x4_1_1 , x4_1_2 , x4_1_3 , x4_2_1 , x4_2_2 , x4_2_3 , x4_3_1 , x4_3_2 , x4_3_3 , x4_4_1 , x4_4_2 , x4_4_3 , x5_1_1 , x5_1_2 , x5_1_3 , x5_2_1 , x5_2_2 , x5_2_3 , x5_3_1 , x5_3_2 , x5_3_3 , x5_4_1 , x5_4_2 , x5_4_3 , x6_1_1 , x6_1_2 , x6_1_3 , x6_2_1 , x6_2_2 , x6_2_3 , x6_3_1 , x6_3_2 , x6_3_3 , x6_4_1 , x6_4_2 , x6_4_3 , x7_1_1 , x7_1_2 , x7_1_3 , x7_2_1 , x7_2_2 , x7_2_3 , x7_3_1 , x7_3_2 , x7_3_3 , x7_4_1 , x7_4_2 , x7_4_3 , x8_1_1 , x8_1_2 , x8_1_3 , x8_2_1 , x8_2_2 , x8_2_3 , x8_3_1 , x8_3_2 , x8_3_3 , x8_4_1 , x8_4_2 , x8_4_3 , x9_1_1 , x9_1_2 , x9_1_3 , x9_2_1 , x9_2_2 , x9_2_3 , x9_3_1 , x9_3_2 , x9_3_3 , x9_4_1 , x9_4_2 , x9_4_3 , x10_1_1 , x10_1_2 , x10_1_3 , x10_2_1 , x10_2_2 , x10_2_3 , x10_3_1 , x10_3_2 , x10_3_3 , x10_4_1 , x10_4_2 , x10_4_3 , x11_1_1 , x11_1_2 , x11_1_3 , x11_2_1 , x11_2_2 , x11_2_3 , x11_3_1 , x11_3_2 , x11_3_3 , x11_4_1 , x11_4_2 , x11_4_3 , x12_1_1 , x12_1_2 , x12_1_3 , x12_2_1 , x12_2_2 , x12_2_3 , x12_3_1 , x12_3_2 , x12_3_3 , x12_4_1 , x12_4_2 , x12_4_3 , x13_1_1 , x13_1_2 , x13_1_3 , x13_2_1 , x13_2_2 , x13_2_3 , x13_3_1 , x13_3_2 , x13_3_3 , x13_4_1 , x13_4_2 , x13_4_3 , x14_1_1 , x14_1_2 , x14_1_3 , x14_2_1 , x14_2_2 , x14_2_3 , x14_3_1 , x14_3_2 , x14_3_3 , x14_4_1 , x14_4_2 , x14_4_3 , k1_1 , k1_2 , k1_3 , k1_4 , k1_5 , k1_6 , k2_1 , k2_2 , k2_3 , k2_4 , k2_5 , k2_6 , k3_1 , k3_2 , k3_3 , k3_4 , k3_5 , k3_6 , k4_1 , k4_2 , k4_3 , k4_4 , k4_5 , k4_6 , k5_1 , k5_2 , k5_3 , k5_4 , k5_5 , k5_6 , k6_1 , k6_2 , k6_3 , k6_4 , k6_5 , k6_6 , k7_1 , k7_2 , k7_3 , k7_4 , k7_5 , k7_6 , k8_1 , k8_2 , k8_3 , k8_4 , k8_5 , k8_6 , k9_1 , k9_2 , k9_3 , k9_4 , k9_5 , k9_6 , k10_1 , k10_2 , k10_3 , k10_4 , k10_5 , k10_6 , k11_1 , k11_2 , k11_3 , k11_4 , k11_5 , k11_6 , k12_1 , k12_2 , k12_3 , k12_4 , k12_5 , k12_6 , k13_1 , k13_2 , k13_3 , k13_4 , k13_5 , k13_6 , k14_1 , k14_2 , k14_3 , k14_4 , k14_5 , k14_6 , keff1 , keff2 , keff3 , keff4 , keff5 , keff6 , epsilon , phi1_1 , phi1_2 , phi1_3 , phi1_4 , phi1_5 , phi1_6 , phi2_1 , phi2_2 , phi2_3 , phi2_4 , phi2_5 , phi2_6 , phi3_1 , phi3_2 , phi3_3 , phi3_4 , phi3_5 , phi3_6 , phi4_1 , phi4_2 , phi4_3 , phi4_4 , phi4_5 , phi4_6 , phi5_1 , phi5_2 , phi5_3 , phi5_4 , phi5_5 , phi5_6 , phi6_1 , phi6_2 , phi6_3 , phi6_4 , phi6_5 , phi6_6 , phi7_1 , phi7_2 , phi7_3 , phi7_4 , phi7_5 , phi7_6 , phi8_1 , phi8_2 , phi8_3 , phi8_4 , phi8_5 , phi8_6 , phi9_1 , phi9_2 , phi9_3 , phi9_4 , phi9_5 , phi9_6 , phi10_1 , phi10_2 , phi10_3 , phi10_4 , phi10_5 , phi10_6 , phi11_1 , phi11_2 , phi11_3 , phi11_4 , phi11_5 , phi11_6 , phi12_1 , phi12_2 , phi12_3 , phi12_4 , phi12_5 , phi12_6 , phi13_1 , phi13_2 , phi13_3 , phi13_4 , phi13_5 , phi13_6 , phi14_1 , phi14_2 , phi14_3 , phi14_4 , phi14_5 , phi14_6 , obj ; Equation sumi1_1,sumlm1,sumlm2,sumlm3,sumlm4, sumlm5, sumlm6, sumlm7, sumlm8, sumlm9, sumlm10, sumlm11, sumlm12, sumlm13, sumlm14, sumi1_2, sumi1_3, sumi2_1, sumi2_2, sumi2_3, sumi3_1, sumi3_2, sumi3_3, sumi4_1, sumi4_2, sumi4_3, norm1, norm2, norm3, norm4, norm5, norm6, kern1_1,peak1_1, kern1_2, peak1_2, kern1_3, peak1_3, kern1_4, peak1_4, kern1_5, peak1_5, kern1_6, peak1_6, kern2_1, peak2_1, kern2_2, peak2_2, kern2_3, peak2_3, kern2_4, peak2_4, kern2_5, peak2_5, kern2_6, peak2_6, kern3_1, peak3_1, kern3_2, peak3_2, kern3_3, peak3_3, kern3_4, peak3_4, kern3_5, peak3_5, kern3_6, peak3_6, kern4_1, peak4_1, kern4_2, peak4_2, kern4_3, peak4_3, kern4_4, peak4_4, kern4_5, peak4_5, kern4_6, peak4_6, kern5_1, peak5_1, kern5_2, peak5_2, kern5_3, peak5_3, kern5_4, peak5_4, kern5_5, peak5_5, kern5_6, peak5_6, kern6_1, peak6_1, kern6_2, peak6_2, kern6_3, peak6_3, kern6_4, peak6_4, kern6_5, peak6_5, kern6_6, peak6_6, kern7_1, peak7_1, kern7_2, peak7_2, kern7_3, peak7_3, kern7_4, peak7_4, kern7_5, peak7_5, kern7_6, peak7_6, kern8_1, peak8_1, kern8_2, peak8_2, kern8_3, peak8_3, kern8_4, peak8_4, kern8_5, peak8_5, kern8_6, peak8_6, kern9_1, peak9_1, kern9_2, peak9_2, kern9_3, peak9_3, kern9_4, peak9_4, kern9_5, peak9_5, kern9_6, peak9_6, kern10_1, peak10_1, kern10_2, peak10_2, kern10_3, kern10_4, peak10_3, kern10_5, peak10_5, kern10_6, peak10_6, kern11_1, peak11_1, kern11_2, peak11_2, kern11_3, peak11_3, kern11_4, peak11_4, kern11_5, peak11_5, kern11_6, peak11_6, kern12_1, peak12_1, kern12_2, peak12_2, kern12_3, peak12_3, kern12_4, peak12_4, kern12_5, peak12_5, kern12_6, peak12_6, kern13_1, peak13_1, kern13_2, peak13_2, kern13_3, peak13_3, kern13_4, peak13_4, kern13_5, peak13_5, kern13_6, peak13_6, kern14_1, peak14_1, kern14_2, peak14_2, kern14_3, peak14_3, kern14_4, peak14_4, kern14_5, peak14_5, kern14_6, peak14_6, peak10_4, burn1_1, burn1_2, burn1_3, burn1_4, burn1_5, burn2_1, burn2_2, burn2_3, burn2_4, burn2_5, burn3_1, burn3_2, burn3_3, burn3_4, burn3_5, burn4_1, burn4_2, burn4_3, burn4_4, burn4_5, burn5_1, burn5_2, burn5_3, burn5_4, burn5_5, burn6_1, burn6_2, burn6_3, burn6_4, burn6_5, burn7_1, burn7_2, burn7_3, burn7_4, burn7_5, burn8_1, burn8_2, burn8_3, burn8_4, burn8_5, burn9_1, burn9_2, burn9_3, burn9_4, burn9_5, burn10_1, burn10_2, burn10_3, burn10_4, burn10_5, burn11_1, burn11_2, burn11_3, burn11_4, burn11_5, burn12_1, burn12_2, burn12_3, burn12_4, burn12_5, burn13_1, burn13_2, burn13_3, burn13_4, burn13_5, burn14_1, burn14_2, burn14_3, burn14_4, burn14_5, plac1, plac2, plac3, plac4, plac5, plac6, plac7, plac8, plac9, plac10, plac11, plac12, plac13, plac14, kefford1, kefford2, kefford3, kefford4, kefford5, dia1_1_1, dia1_1_2, dia1_1_3, dia1_2_1, dia1_2_2, dia1_2_3, dia1_3_1, dia1_3_2, dia1_3_3, dia1_4_1, dia1_4_2, dia1_4_3, dia2_1_1, dia2_1_2, dia2_1_3, dia2_2_1, dia2_2_2, dia2_2_3, dia2_3_1, dia2_3_2, dia2_3_3, dia2_4_1, dia2_4_2, dia2_4_3, Def_obj ; sumi1_1.. 0.5*x1_1_1 + x2_1_1 + x3_1_1 + x4_1_1 + x5_1_1 + x6_1_1 + 0.5*x7_1_1 + x8_1_1 + x9_1_1 + x10_1_1 + 0.5*x11_1_1 + x12_1_1 + x13_1_1 + 0.5*x14_1_1 - 1.0 =e= 0; sumlm1.. x1_1_1 + x1_1_2 + x1_1_3 + x1_2_1 + x1_2_2 + x1_2_3 + x1_3_1 + x1_3_2 + x1_3_3 + x1_4_1 + x1_4_2 + x1_4_3 - 1.0 =e= 0; sumlm2.. x2_1_1 + x2_1_2 + x2_1_3 + x2_2_1 + x2_2_2 + x2_2_3 + x2_3_1 + x2_3_2 + x2_3_3 + x2_4_1 + x2_4_2 + x2_4_3 - 1.0 =e= 0; sumlm3.. x3_1_1 + x3_1_2 + x3_1_3 + x3_2_1 + x3_2_2 + x3_2_3 + x3_3_1 + x3_3_2 + x3_3_3 + x3_4_1 + x3_4_2 + x3_4_3 - 1.0 =e= 0; sumlm4.. x4_1_1 + x4_1_2 + x4_1_3 + x4_2_1 + x4_2_2 + x4_2_3 + x4_3_1 + x4_3_2 + x4_3_3 + x4_4_1 + x4_4_2 + x4_4_3 - 1.0 =e= 0; sumlm5.. x5_1_1 + x5_1_2 + x5_1_3 + x5_2_1 + x5_2_2 + x5_2_3 + x5_3_1 + x5_3_2 + x5_3_3 + x5_4_1 + x5_4_2 + x5_4_3 - 1.0 =e= 0; sumlm6.. x6_1_1 + x6_1_2 + x6_1_3 + x6_2_1 + x6_2_2 + x6_2_3 + x6_3_1 + x6_3_2 + x6_3_3 + x6_4_1 + x6_4_2 + x6_4_3 - 1.0 =e= 0; sumlm7.. x7_1_1 + x7_1_2 + x7_1_3 + x7_2_1 + x7_2_2 + x7_2_3 + x7_3_1 + x7_3_2 + x7_3_3 + x7_4_1 + x7_4_2 + x7_4_3 - 1.0 =e= 0; sumlm8.. x8_1_1 + x8_1_2 + x8_1_3 + x8_2_1 + x8_2_2 + x8_2_3 + x8_3_1 + x8_3_2 + x8_3_3 + x8_4_1 + x8_4_2 + x8_4_3 - 1.0 =e= 0; sumlm9.. x9_1_1 + x9_1_2 + x9_1_3 + x9_2_1 + x9_2_2 + x9_2_3 + x9_3_1 + x9_3_2 + x9_3_3 + x9_4_1 + x9_4_2 + x9_4_3 - 1.0 =e= 0; sumlm10.. x10_1_1 + x10_1_2 + x10_1_3 + x10_2_1 + x10_2_2 + x10_2_3 + x10_3_1 + x10_3_2 + x10_3_3 + x10_4_1 + x10_4_2 + x10_4_3 - 1.0 =e= 0; sumlm11.. x11_1_1 + x11_1_2 + x11_1_3 + x11_2_1 + x11_2_2 + x11_2_3 + x11_3_1 + x11_3_2 + x11_3_3 + x11_4_1 + x11_4_2 + x11_4_3 - 1.0 =e= 0; sumlm12.. x12_1_1 + x12_1_2 + x12_1_3 + x12_2_1 + x12_2_2 + x12_2_3 + x12_3_1 + x12_3_2 + x12_3_3 + x12_4_1 + x12_4_2 + x12_4_3 - 1.0 =e= 0; sumlm13.. x13_1_1 + x13_1_2 + x13_1_3 + x13_2_1 + x13_2_2 + x13_2_3 + x13_3_1 + x13_3_2 + x13_3_3 + x13_4_1 + x13_4_2 + x13_4_3 - 1.0 =e= 0; sumlm14.. x14_1_1 + x14_1_2 + x14_1_3 + x14_2_1 + x14_2_2 + x14_2_3 + x14_3_1 + x14_3_2 + x14_3_3 + x14_4_1 + x14_4_2 + x14_4_3 - 1.0 =e= 0; sumi1_2.. 0.5*x1_1_2 + x2_1_2 + x3_1_2 + x4_1_2 + x5_1_2 + x6_1_2 + 0.5*x7_1_2 + x8_1_2 + x9_1_2 + x10_1_2 + 0.5*x11_1_2 + x12_1_2 + x13_1_2 + 0.5*x14_1_2 - 1.0 =e= 0; sumi1_3.. 0.5*x1_1_3 + x2_1_3 + x3_1_3 + x4_1_3 + x5_1_3 + x6_1_3 + 0.5*x7_1_3 + x8_1_3 + x9_1_3 + x10_1_3 + 0.5*x11_1_3 + x12_1_3 + x13_1_3 + 0.5*x14_1_3 - 1.0 =e= 0; sumi2_1.. 0.5*x1_2_1 + x2_2_1 + x3_2_1 + x4_2_1 + x5_2_1 + x6_2_1 + 0.5*x7_2_1 + x8_2_1 + x9_2_1 + x10_2_1 + 0.5*x11_2_1 + x12_2_1 + x13_2_1 + 0.5*x14_2_1 - 1.0 =e= 0; sumi2_2.. 0.5*x1_2_2 + x2_2_2 + x3_2_2 + x4_2_2 + x5_2_2 + x6_2_2 + 0.5*x7_2_2 + x8_2_2 + x9_2_2 + x10_2_2 + 0.5*x11_2_2 + x12_2_2 + x13_2_2 + 0.5*x14_2_2 - 1.0 =e= 0; sumi2_3.. 0.5*x1_2_3 + x2_2_3 + x3_2_3 + x4_2_3 + x5_2_3 + x6_2_3 + 0.5*x7_2_3 + x8_2_3 + x9_2_3 + x10_2_3 + 0.5*x11_2_3 + x12_2_3 + x13_2_3 + 0.5*x14_2_3 - 1.0 =e= 0; sumi3_1.. 0.5*x1_3_1 + x2_3_1 + x3_3_1 + x4_3_1 + x5_3_1 + x6_3_1 + 0.5*x7_3_1 + x8_3_1 + x9_3_1 + x10_3_1 + 0.5*x11_3_1 + x12_3_1 + x13_3_1 + 0.5*x14_3_1 - 1.0 =e= 0; sumi3_2.. 0.5*x1_3_2 + x2_3_2 + x3_3_2 + x4_3_2 + x5_3_2 + x6_3_2 + 0.5*x7_3_2 + x8_3_2 + x9_3_2 + x10_3_2 + 0.5*x11_3_2 + x12_3_2 + x13_3_2 + 0.5*x14_3_2 - 1.0 =e= 0; sumi3_3.. 0.5*x1_3_3 + x2_3_3 + x3_3_3 + x4_3_3 + x5_3_3 + x6_3_3 + 0.5*x7_3_3 + x8_3_3 + x9_3_3 + x10_3_3 + 0.5*x11_3_3 + x12_3_3 + x13_3_3 + 0.5*x14_3_3 - 1.0 =e= 0; sumi4_1.. 0.5*x1_4_1 + x2_4_1 + x3_4_1 + x4_4_1 + x5_4_1 + x6_4_1 + 0.5*x7_4_1 + x8_4_1 + x9_4_1 + x10_4_1 + 0.5*x11_4_1 + x12_4_1 + x13_4_1 + 0.5*x14_4_1 - 1.0 =e= 0; sumi4_2.. 0.5*x1_4_2 + x2_4_2 + x3_4_2 + x4_4_2 + x5_4_2 + x6_4_2 + 0.5*x7_4_2 + x8_4_2 + x9_4_2 + x10_4_2 + 0.5*x11_4_2 + x12_4_2 + x13_4_2 + 0.5*x14_4_2 - 1.0 =e= 0; sumi4_3.. 0.5*x1_4_3 + x2_4_3 + x3_4_3 + x4_4_3 + x5_4_3 + x6_4_3 + 0.5*x7_4_3 + x8_4_3 + x9_4_3 + x10_4_3 + 0.5*x11_4_3 + x12_4_3 + x13_4_3 + 0.5*x14_4_3 - 1.0 =e= 0; norm1.. 0.5*k1_1 * phi1_1 + k2_1 * phi2_1 + k3_1 * phi3_1 + k4_1 * phi4_1 + k5_1 * phi5_1 + k6_1 * phi6_1 + 0.5*k7_1 * phi7_1 + k8_1 * phi8_1 + k9_1 * phi9_1 + k10_1 * phi10_1 + 0.5*k11_1 * phi11_1 + k12_1 * phi12_1 + k13_1 * phi13_1 + 0.5*k14_1 * phi14_1 - 1.0 =e= 0; norm2.. 0.5*k1_2 * phi1_2 + k2_2 * phi2_2 + k3_2 * phi3_2 + k4_2 * phi4_2 + k5_2 * phi5_2 + k6_2 * phi6_2 + 0.5*k7_2 * phi7_2 + k8_2 * phi8_2 + k9_2 * phi9_2 + k10_2 * phi10_2 + 0.5*k11_2 * phi11_2 + k12_2 * phi12_2 + k13_2 * phi13_2 + 0.5*k14_2 * phi14_2 - 1.0 =e= 0; norm3.. 0.5*k1_3 * phi1_3 + k2_3 * phi2_3 + k3_3 * phi3_3 + k4_3 * phi4_3 + k5_3 * phi5_3 + k6_3 * phi6_3 + 0.5*k7_3 * phi7_3 + k8_3 * phi8_3 + k9_3 * phi9_3 + k10_3 * phi10_3 + 0.5*k11_3 * phi11_3 + k12_3 * phi12_3 + k13_3 * phi13_3 + 0.5*k14_3 * phi14_3 - 1.0 =e= 0; norm4.. 0.5*k1_4 * phi1_4 + k2_4 * phi2_4 + k3_4 * phi3_4 + k4_4 * phi4_4 + k5_4 * phi5_4 + k6_4 * phi6_4 + 0.5*k7_4 * phi7_4 + k8_4 * phi8_4 + k9_4 * phi9_4 + k10_4 * phi10_4 + 0.5*k11_4 * phi11_4 + k12_4 * phi12_4 + k13_4 * phi13_4 + 0.5*k14_4 * phi14_4 - 1.0 =e= 0; norm5.. 0.5*k1_5 * phi1_5 + k2_5 * phi2_5 + k3_5 * phi3_5 + k4_5 * phi4_5 + k5_5 * phi5_5 + k6_5 * phi6_5 + 0.5*k7_5 * phi7_5 + k8_5 * phi8_5 + k9_5 * phi9_5 + k10_5 * phi10_5 + 0.5*k11_5 * phi11_5 + k12_5 * phi12_5 + k13_5 * phi13_5 + 0.5*k14_5 * phi14_5 - 1.0 =e= 0; norm6.. 0.5*k1_6 * phi1_6 + k2_6 * phi2_6 + k3_6 * phi3_6 + k4_6 * phi4_6 + k5_6 * phi5_6 + k6_6 * phi6_6 + 0.5*k7_6 * phi7_6 + k8_6 * phi8_6 + k9_6 * phi9_6 + k10_6 * phi10_6 + 0.5*k11_6 * phi11_6 + k12_6 * phi12_6 + k13_6 * phi13_6 + 0.5*k14_6 * phi14_6 - 1.0 =e= 0; kern1_1.. keff1 * phi1_1 - 0.828*k1_1 * phi1_1 - 0.158*k2_1 * phi2_1 - 0.014*k7_1 * phi7_1 =e= 0; peak1_1.. 0 =g= k1_1 * phi1_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern1_2.. keff2 * phi1_2 - 0.828*k1_2 * phi1_2 - 0.158*k2_2 * phi2_2 - 0.014*k7_2 * phi7_2 =e= 0; peak1_2.. 0 =g= k1_2 * phi1_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern1_3.. keff3 * phi1_3 - 0.828*k1_3 * phi1_3 - 0.158*k2_3 * phi2_3 - 0.014*k7_3 * phi7_3 =e= 0; peak1_3.. 0 =g= k1_3 * phi1_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern1_4.. keff4 * phi1_4 - 0.828*k1_4 * phi1_4 - 0.158*k2_4 * phi2_4 - 0.014*k7_4 * phi7_4 =e= 0; peak1_4.. 0 =g= k1_4 * phi1_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern1_5.. keff5 * phi1_5 - 0.828*k1_5 * phi1_5 - 0.158*k2_5 * phi2_5 - 0.014*k7_5 * phi7_5 =e= 0; peak1_5.. 0 =g= k1_5 * phi1_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern1_6.. keff6 * phi1_6 - 0.828*k1_6 * phi1_6 - 0.158*k2_6 * phi2_6 - 0.014*k7_6 * phi7_6 =e= 0; peak1_6.. 0 =g= k1_6 * phi1_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern2_1.. keff1 * phi2_1 - 0.079*k1_1 * phi1_1 - 0.763*k2_1 * phi2_1 - 0.079*k3_1 * phi3_1 - 0.065*k7_1 * phi7_1 - 0.014*k8_1 * phi8_1 =e= 0; peak2_1.. 0 =g= k2_1 * phi2_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern2_2.. keff2 * phi2_2 - 0.079*k1_2 * phi1_2 - 0.763*k2_2 * phi2_2 - 0.079*k3_2 * phi3_2 - 0.065*k7_2 * phi7_2 - 0.014*k8_2 * phi8_2 =e= 0; peak2_2.. 0 =g= k2_2 * phi2_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern2_3.. keff3 * phi2_3 - 0.079*k1_3 * phi1_3 - 0.763*k2_3 * phi2_3 - 0.079*k3_3 * phi3_3 - 0.065*k7_3 * phi7_3 - 0.014*k8_3 * phi8_3 =e= 0; peak2_3.. 0 =g= k2_3 * phi2_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern2_4.. keff4 * phi2_4 - 0.079*k1_4 * phi1_4 - 0.763*k2_4 * phi2_4 - 0.079*k3_4 * phi3_4 - 0.065*k7_4 * phi7_4 - 0.014*k8_4 * phi8_4 =e= 0; peak2_4.. 0 =g= k2_4 * phi2_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern2_5.. keff5 * phi2_5 - 0.079*k1_5 * phi1_5 - 0.763*k2_5 * phi2_5 - 0.079*k3_5 * phi3_5 - 0.065*k7_5 * phi7_5 - 0.014*k8_5 * phi8_5 =e= 0; peak2_5.. 0 =g= k2_5 * phi2_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern2_6.. keff6 * phi2_6 - 0.079*k1_6 * phi1_6 - 0.763*k2_6 * phi2_6 - 0.079*k3_6 * phi3_6 - 0.065*k7_6 * phi7_6 - 0.014*k8_6 * phi8_6 =e= 0; peak2_6.. 0 =g= k2_6 * phi2_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern3_1.. keff1 * phi3_1 - 0.079*k2_1 * phi2_1 - 0.749*k3_1 * phi3_1 - 0.079*k4_1 * phi4_1 - 0.014*k7_1 * phi7_1 - 0.065*k8_1 * phi8_1 - 0.014*k9_1 * phi9_1 =e= 0; peak3_1.. 0 =g= k3_1 * phi3_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern3_2.. keff2 * phi3_2 - 0.079*k2_2 * phi2_2 - 0.749*k3_2 * phi3_2 - 0.079*k4_2 * phi4_2 - 0.014*k7_2 * phi7_2 - 0.065*k8_2 * phi8_2 - 0.014*k9_2 * phi9_2 =e= 0; peak3_2.. 0 =g= k3_2 * phi3_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern3_3.. keff3 * phi3_3 - 0.079*k2_3 * phi2_3 - 0.749*k3_3 * phi3_3 - 0.079*k4_3 * phi4_3 - 0.014*k7_3 * phi7_3 - 0.065*k8_3 * phi8_3 - 0.014*k9_3 * phi9_3 =e= 0; peak3_3.. 0 =g= k3_3 * phi3_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern3_4.. keff4 * phi3_4 - 0.079*k2_4 * phi2_4 - 0.749*k3_4 * phi3_4 - 0.079*k4_4 * phi4_4 - 0.014*k7_4 * phi7_4 - 0.065*k8_4 * phi8_4 - 0.014*k9_4 * phi9_4 =e= 0; peak3_4.. 0 =g= k3_4 * phi3_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern3_5.. keff5 * phi3_5 - 0.079*k2_5 * phi2_5 - 0.749*k3_5 * phi3_5 - 0.079*k4_5 * phi4_5 - 0.014*k7_5 * phi7_5 - 0.065*k8_5 * phi8_5 - 0.014*k9_5 * phi9_5 =e= 0; peak3_5.. 0 =g= k3_5 * phi3_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern3_6.. keff6 * phi3_6 - 0.079*k2_6 * phi2_6 - 0.749*k3_6 * phi3_6 - 0.079*k4_6 * phi4_6 - 0.014*k7_6 * phi7_6 - 0.065*k8_6 * phi8_6 - 0.014*k9_6 * phi9_6 =e= 0; peak3_6.. 0 =g= k3_6 * phi3_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern4_1.. keff1 * phi4_1 - 0.079*k3_1 * phi3_1 - 0.749*k4_1 * phi4_1 - 0.079*k5_1 * phi5_1 - 0.014*k8_1 * phi8_1 - 0.065*k9_1 * phi9_1 - 0.014*k10_1 * phi10_1 =e= 0; peak4_1.. 0 =g= k4_1 * phi4_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern4_2.. keff2 * phi4_2 - 0.079*k3_2 * phi3_2 - 0.749*k4_2 * phi4_2 - 0.079*k5_2 * phi5_2 - 0.014*k8_2 * phi8_2 - 0.065*k9_2 * phi9_2 - 0.014*k10_2 * phi10_2 =e= 0; peak4_2.. 0 =g= k4_2 * phi4_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern4_3.. keff3 * phi4_3 - 0.079*k3_3 * phi3_3 - 0.749*k4_3 * phi4_3 - 0.079*k5_3 * phi5_3 - 0.014*k8_3 * phi8_3 - 0.065*k9_3 * phi9_3 - 0.014*k10_3 * phi10_3 =e= 0; peak4_3.. 0 =g= k4_3 * phi4_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern4_4.. keff4 * phi4_4 - 0.079*k3_4 * phi3_4 - 0.749*k4_4 * phi4_4 - 0.079*k5_4 * phi5_4 - 0.014*k8_4 * phi8_4 - 0.065*k9_4 * phi9_4 - 0.014*k10_4 * phi10_4 =e= 0; peak4_4.. 0 =g= k4_4 * phi4_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern4_5.. keff5 * phi4_5 - 0.079*k3_5 * phi3_5 - 0.749*k4_5 * phi4_5 - 0.079*k5_5 * phi5_5 - 0.014*k8_5 * phi8_5 - 0.065*k9_5 * phi9_5 - 0.014*k10_5 * phi10_5 =e= 0; peak4_5.. 0 =g= k4_5 * phi4_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern4_6.. keff6 * phi4_6 - 0.079*k3_6 * phi3_6 - 0.749*k4_6 * phi4_6 - 0.079*k5_6 * phi5_6 - 0.014*k8_6 * phi8_6 - 0.065*k9_6 * phi9_6 - 0.014*k10_6 * phi10_6 =e= 0; peak4_6.. 0 =g= k4_6 * phi4_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern5_1.. keff1 * phi5_1 - 0.079*k4_1 * phi4_1 - 0.749*k5_1 * phi5_1 - 0.079*k6_1 * phi6_1 - 0.014*k9_1 * phi9_1 - 0.065*k10_1 * phi10_1 =e= 0; peak5_1.. 0 =g= k5_1 * phi5_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern5_2.. keff2 * phi5_2 - 0.079*k4_2 * phi4_2 - 0.749*k5_2 * phi5_2 - 0.079*k6_2 * phi6_2 - 0.014*k9_2 * phi9_2 - 0.065*k10_2 * phi10_2 =e= 0; peak5_2.. 0 =g= k5_2 * phi5_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern5_3.. keff3 * phi5_3 - 0.079*k4_3 * phi4_3 - 0.749*k5_3 * phi5_3 - 0.079*k6_3 * phi6_3 - 0.014*k9_3 * phi9_3 - 0.065*k10_3 * phi10_3 =e= 0; peak5_3.. 0 =g= k5_3 * phi5_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern5_4.. keff4 * phi5_4 - 0.079*k4_4 * phi4_4 - 0.749*k5_4 * phi5_4 - 0.079*k6_4 * phi6_4 - 0.014*k9_4 * phi9_4 - 0.065*k10_4 * phi10_4 =e= 0; peak5_4.. 0 =g= k5_4 * phi5_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern5_5.. keff5 * phi5_5 - 0.079*k4_5 * phi4_5 - 0.749*k5_5 * phi5_5 - 0.079*k6_5 * phi6_5 - 0.014*k9_5 * phi9_5 - 0.065*k10_5 * phi10_5 =e= 0; peak5_5.. 0 =g= k5_5 * phi5_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern5_6.. keff6 * phi5_6 - 0.079*k4_6 * phi4_6 - 0.749*k5_6 * phi5_6 - 0.079*k6_6 * phi6_6 - 0.014*k9_6 * phi9_6 - 0.065*k10_6 * phi10_6 =e= 0; peak5_6.. 0 =g= k5_6 * phi5_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern6_1.. keff1 * phi6_1 - 0.079*k5_1 * phi5_1 - 0.749*k6_1 * phi6_1 - 0.014*k10_1 * phi10_1 =e= 0; peak6_1.. 0 =g= k6_1 * phi6_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern6_2.. keff2 * phi6_2 - 0.079*k5_2 * phi5_2 - 0.749*k6_2 * phi6_2 - 0.014*k10_2 * phi10_2 =e= 0; peak6_2.. 0 =g= k6_2 * phi6_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern6_3.. keff3 * phi6_3 - 0.079*k5_3 * phi5_3 - 0.749*k6_3 * phi6_3 - 0.014*k10_3 * phi10_3 =e= 0; peak6_3.. 0 =g= k6_3 * phi6_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern6_4.. keff4 * phi6_4 - 0.079*k5_4 * phi5_4 - 0.749*k6_4 * phi6_4 - 0.014*k10_4 * phi10_4 =e= 0; peak6_4.. 0 =g= k6_4 * phi6_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern6_5.. keff5 * phi6_5 - 0.079*k5_5 * phi5_5 - 0.749*k6_5 * phi6_5 - 0.014*k10_5 * phi10_5 =e= 0; peak6_5.. 0 =g= k6_5 * phi6_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern6_6.. keff6 * phi6_6 - 0.079*k5_6 * phi5_6 - 0.749*k6_6 * phi6_6 - 0.014*k10_6 * phi10_6 =e= 0; peak6_6.. 0 =g= k6_6 * phi6_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern7_1.. keff1 * phi7_1 - 0.014*k1_1 * phi1_1 - 0.13*k2_1 * phi2_1 - 0.028*k3_1 * phi3_1 - 0.684*k7_1 * phi7_1 - 0.13*k8_1 * phi8_1 - 0.014*k11_1 * phi11_1 =e= 0; peak7_1.. 0 =g= k7_1 * phi7_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern7_2.. keff2 * phi7_2 - 0.014*k1_2 * phi1_2 - 0.13*k2_2 * phi2_2 - 0.028*k3_2 * phi3_2 - 0.684*k7_2 * phi7_2 - 0.13*k8_2 * phi8_2 - 0.014*k11_2 * phi11_2 =e= 0; peak7_2.. 0 =g= k7_2 * phi7_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern7_3.. keff3 * phi7_3 - 0.014*k1_3 * phi1_3 - 0.13*k2_3 * phi2_3 - 0.028*k3_3 * phi3_3 - 0.684*k7_3 * phi7_3 - 0.13*k8_3 * phi8_3 - 0.014*k11_3 * phi11_3 =e= 0; peak7_3.. 0 =g= k7_3 * phi7_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern7_4.. keff4 * phi7_4 - 0.014*k1_4 * phi1_4 - 0.13*k2_4 * phi2_4 - 0.028*k3_4 * phi3_4 - 0.684*k7_4 * phi7_4 - 0.13*k8_4 * phi8_4 - 0.014*k11_4 * phi11_4 =e= 0; peak7_4.. 0 =g= k7_4 * phi7_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern7_5.. keff5 * phi7_5 - 0.014*k1_5 * phi1_5 - 0.13*k2_5 * phi2_5 - 0.028*k3_5 * phi3_5 - 0.684*k7_5 * phi7_5 - 0.13*k8_5 * phi8_5 - 0.014*k11_5 * phi11_5 =e= 0; peak7_5.. 0 =g= k7_5 * phi7_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern7_6.. keff6 * phi7_6 - 0.014*k1_6 * phi1_6 - 0.13*k2_6 * phi2_6 - 0.028*k3_6 * phi3_6 - 0.684*k7_6 * phi7_6 - 0.13*k8_6 * phi8_6 - 0.014*k11_6 * phi11_6 =e= 0; peak7_6.. 0 =g= k7_6 * phi7_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern8_1.. keff1 * phi8_1 - 0.014*k2_1 * phi2_1 - 0.065*k3_1 * phi3_1 - 0.014*k4_1 * phi4_1 - 0.065*k7_1 * phi7_1 - 0.698*k8_1 * phi8_1 - 0.065*k9_1 * phi9_1 - 0.065*k11_1 * phi11_1 - 0.014*k12_1 * phi12_1 =e= 0; peak8_1.. 0 =g= k8_1 * phi8_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern8_2.. keff2 * phi8_2 - 0.014*k2_2 * phi2_2 - 0.065*k3_2 * phi3_2 - 0.014*k4_2 * phi4_2 - 0.065*k7_2 * phi7_2 - 0.698*k8_2 * phi8_2 - 0.065*k9_2 * phi9_2 - 0.065*k11_2 * phi11_2 - 0.014*k12_2 * phi12_2 =e= 0; peak8_2.. 0 =g= k8_2 * phi8_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern8_3.. keff3 * phi8_3 - 0.014*k2_3 * phi2_3 - 0.065*k3_3 * phi3_3 - 0.014*k4_3 * phi4_3 - 0.065*k7_3 * phi7_3 - 0.698*k8_3 * phi8_3 - 0.065*k9_3 * phi9_3 - 0.065*k11_3 * phi11_3 - 0.014*k12_3 * phi12_3 =e= 0; peak8_3.. 0 =g= k8_3 * phi8_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern8_4.. keff4 * phi8_4 - 0.014*k2_4 * phi2_4 - 0.065*k3_4 * phi3_4 - 0.014*k4_4 * phi4_4 - 0.065*k7_4 * phi7_4 - 0.698*k8_4 * phi8_4 - 0.065*k9_4 * phi9_4 - 0.065*k11_4 * phi11_4 - 0.014*k12_4 * phi12_4 =e= 0; peak8_4.. 0 =g= k8_4 * phi8_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern8_5.. keff5 * phi8_5 - 0.014*k2_5 * phi2_5 - 0.065*k3_5 * phi3_5 - 0.014*k4_5 * phi4_5 - 0.065*k7_5 * phi7_5 - 0.698*k8_5 * phi8_5 - 0.065*k9_5 * phi9_5 - 0.065*k11_5 * phi11_5 - 0.014*k12_5 * phi12_5 =e= 0; peak8_5.. 0 =g= k8_5 * phi8_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern8_6.. keff6 * phi8_6 - 0.014*k2_6 * phi2_6 - 0.065*k3_6 * phi3_6 - 0.014*k4_6 * phi4_6 - 0.065*k7_6 * phi7_6 - 0.698*k8_6 * phi8_6 - 0.065*k9_6 * phi9_6 - 0.065*k11_6 * phi11_6 - 0.014*k12_6 * phi12_6 =e= 0; peak8_6.. 0 =g= k8_6 * phi8_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern9_1.. keff1 * phi9_1 - 0.014*k3_1 * phi3_1 - 0.065*k4_1 * phi4_1 - 0.014*k5_1 * phi5_1 - 0.065*k8_1 * phi8_1 - 0.684*k9_1 * phi9_1 - 0.065*k10_1 * phi10_1 - 0.014*k11_1 * phi11_1 - 0.065*k12_1 * phi12_1 - 0.014*k13_1 * phi13_1 =e= 0; peak9_1.. 0 =g= k9_1 * phi9_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern9_2.. keff2 * phi9_2 - 0.014*k3_2 * phi3_2 - 0.065*k4_2 * phi4_2 - 0.014*k5_2 * phi5_2 - 0.065*k8_2 * phi8_2 - 0.684*k9_2 * phi9_2 - 0.065*k10_2 * phi10_2 - 0.014*k11_2 * phi11_2 - 0.065*k12_2 * phi12_2 - 0.014*k13_2 * phi13_2 =e= 0; peak9_2.. 0 =g= k9_2 * phi9_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern9_3.. keff3 * phi9_3 - 0.014*k3_3 * phi3_3 - 0.065*k4_3 * phi4_3 - 0.014*k5_3 * phi5_3 - 0.065*k8_3 * phi8_3 - 0.684*k9_3 * phi9_3 - 0.065*k10_3 * phi10_3 - 0.014*k11_3 * phi11_3 - 0.065*k12_3 * phi12_3 - 0.014*k13_3 * phi13_3 =e= 0; peak9_3.. 0 =g= k9_3 * phi9_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern9_4.. keff4 * phi9_4 - 0.014*k3_4 * phi3_4 - 0.065*k4_4 * phi4_4 - 0.014*k5_4 * phi5_4 - 0.065*k8_4 * phi8_4 - 0.684*k9_4 * phi9_4 - 0.065*k10_4 * phi10_4 - 0.014*k11_4 * phi11_4 - 0.065*k12_4 * phi12_4 - 0.014*k13_4 * phi13_4 =e= 0; peak9_4.. 0 =g= k9_4 * phi9_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern9_5.. keff5 * phi9_5 - 0.014*k3_5 * phi3_5 - 0.065*k4_5 * phi4_5 - 0.014*k5_5 * phi5_5 - 0.065*k8_5 * phi8_5 - 0.684*k9_5 * phi9_5 - 0.065*k10_5 * phi10_5 - 0.014*k11_5 * phi11_5 - 0.065*k12_5 * phi12_5 - 0.014*k13_5 * phi13_5 =e= 0; peak9_5.. 0 =g= k9_5 * phi9_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern9_6.. keff6 * phi9_6 - 0.014*k3_6 * phi3_6 - 0.065*k4_6 * phi4_6 - 0.014*k5_6 * phi5_6 - 0.065*k8_6 * phi8_6 - 0.684*k9_6 * phi9_6 - 0.065*k10_6 * phi10_6 - 0.014*k11_6 * phi11_6 - 0.065*k12_6 * phi12_6 - 0.014*k13_6 * phi13_6 =e= 0; peak9_6.. 0 =g= k9_6 * phi9_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern10_1.. keff1 * phi10_1 - 0.014*k4_1 * phi4_1 - 0.065*k5_1 * phi5_1 - 0.014*k6_1 * phi6_1 - 0.065*k9_1 * phi9_1 - 0.684*k10_1 * phi10_1 - 0.014*k12_1 * phi12_1 - 0.065*k13_1 * phi13_1 =e= 0; peak10_1.. 0 =g= k10_1 * phi10_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern10_2.. keff2 * phi10_2 - 0.014*k4_2 * phi4_2 - 0.065*k5_2 * phi5_2 - 0.014*k6_2 * phi6_2 - 0.065*k9_2 * phi9_2 - 0.684*k10_2 * phi10_2 - 0.014*k12_2 * phi12_2 - 0.065*k13_2 * phi13_2 =e= 0; peak10_2.. 0 =g= k10_2 * phi10_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern10_3.. keff3 * phi10_3 - 0.014*k4_3 * phi4_3 - 0.065*k5_3 * phi5_3 - 0.014*k6_3 * phi6_3 - 0.065*k9_3 * phi9_3 - 0.684*k10_3 * phi10_3 - 0.014*k12_3 * phi12_3 - 0.065*k13_3 * phi13_3 =e= 0; peak10_3.. 0 =g= k10_3 * phi10_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern10_4.. keff4 * phi10_4 - 0.014*k4_4 * phi4_4 - 0.065*k5_4 * phi5_4 - 0.014*k6_4 * phi6_4 - 0.065*k9_4 * phi9_4 - 0.684*k10_4 * phi10_4 - 0.014*k12_4 * phi12_4 - 0.065*k13_4 * phi13_4 =e= 0; peak10_4.. 0 =g= k10_4 * phi10_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern10_5.. keff5 * phi10_5 - 0.014*k4_5 * phi4_5 - 0.065*k5_5 * phi5_5 - 0.014*k6_5 * phi6_5 - 0.065*k9_5 * phi9_5 - 0.684*k10_5 * phi10_5 - 0.014*k12_5 * phi12_5 - 0.065*k13_5 * phi13_5 =e= 0; peak10_5.. 0 =g= k10_5 * phi10_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern10_6.. keff6 * phi10_6 - 0.014*k4_6 * phi4_6 - 0.065*k5_6 * phi5_6 - 0.014*k6_6 * phi6_6 - 0.065*k9_6 * phi9_6 - 0.684*k10_6 * phi10_6 - 0.014*k12_6 * phi12_6 - 0.065*k13_6 * phi13_6 =e= 0; peak10_6.. 0 =g= k10_6 * phi10_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern11_1.. keff1 * phi11_1 - 0.014*k7_1 * phi7_1 - 0.13*k8_1 * phi8_1 - 0.028*k9_1 * phi9_1 - 0.684*k11_1 * phi11_1 - 0.13*k12_1 * phi12_1 - 0.014*k14_1 * phi14_1 =e= 0; peak11_1.. 0 =g= k11_1 * phi11_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern11_2.. keff2 * phi11_2 - 0.014*k7_2 * phi7_2 - 0.13*k8_2 * phi8_2 - 0.028*k9_2 * phi9_2 - 0.684*k11_2 * phi11_2 - 0.13*k12_2 * phi12_2 - 0.014*k14_2 * phi14_2 =e= 0; peak11_2.. 0 =g= k11_2 * phi11_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern11_3.. keff3 * phi11_3 - 0.014*k7_3 * phi7_3 - 0.13*k8_3 * phi8_3 - 0.028*k9_3 * phi9_3 - 0.684*k11_3 * phi11_3 - 0.13*k12_3 * phi12_3 - 0.014*k14_3 * phi14_3 =e= 0; peak11_3.. 0 =g= k11_3 * phi11_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern11_4.. keff4 * phi11_4 - 0.014*k7_4 * phi7_4 - 0.13*k8_4 * phi8_4 - 0.028*k9_4 * phi9_4 - 0.684*k11_4 * phi11_4 - 0.13*k12_4 * phi12_4 - 0.014*k14_4 * phi14_4 =e= 0; peak11_4.. 0 =g= k11_4 * phi11_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern11_5.. keff5 * phi11_5 - 0.014*k7_5 * phi7_5 - 0.13*k8_5 * phi8_5 - 0.028*k9_5 * phi9_5 - 0.684*k11_5 * phi11_5 - 0.13*k12_5 * phi12_5 - 0.014*k14_5 * phi14_5 =e= 0; peak11_5.. 0 =g= k11_5 * phi11_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern11_6.. keff6 * phi11_6 - 0.014*k7_6 * phi7_6 - 0.13*k8_6 * phi8_6 - 0.028*k9_6 * phi9_6 - 0.684*k11_6 * phi11_6 - 0.13*k12_6 * phi12_6 - 0.014*k14_6 * phi14_6 =e= 0; peak11_6.. 0 =g= k11_6 * phi11_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern12_1.. keff1 * phi12_1 - 0.014*k8_1 * phi8_1 - 0.065*k9_1 * phi9_1 - 0.014*k10_1 * phi10_1 - 0.065*k11_1 * phi11_1 - 0.698*k12_1 * phi12_1 - 0.065*k13_1 * phi13_1 - 0.065*k14_1 * phi14_1 =e= 0; peak12_1.. 0 =g= k12_1 * phi12_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern12_2.. keff2 * phi12_2 - 0.014*k8_2 * phi8_2 - 0.065*k9_2 * phi9_2 - 0.014*k10_2 * phi10_2 - 0.065*k11_2 * phi11_2 - 0.698*k12_2 * phi12_2 - 0.065*k13_2 * phi13_2 - 0.065*k14_2 * phi14_2 =e= 0; peak12_2.. 0 =g= k12_2 * phi12_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern12_3.. keff3 * phi12_3 - 0.014*k8_3 * phi8_3 - 0.065*k9_3 * phi9_3 - 0.014*k10_3 * phi10_3 - 0.065*k11_3 * phi11_3 - 0.698*k12_3 * phi12_3 - 0.065*k13_3 * phi13_3 - 0.065*k14_3 * phi14_3 =e= 0; peak12_3.. 0 =g= k12_3 * phi12_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern12_4.. keff4 * phi12_4 - 0.014*k8_4 * phi8_4 - 0.065*k9_4 * phi9_4 - 0.014*k10_4 * phi10_4 - 0.065*k11_4 * phi11_4 - 0.698*k12_4 * phi12_4 - 0.065*k13_4 * phi13_4 - 0.065*k14_4 * phi14_4 =e= 0; peak12_4.. 0 =g= k12_4 * phi12_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern12_5.. keff5 * phi12_5 - 0.014*k8_5 * phi8_5 - 0.065*k9_5 * phi9_5 - 0.014*k10_5 * phi10_5 - 0.065*k11_5 * phi11_5 - 0.698*k12_5 * phi12_5 - 0.065*k13_5 * phi13_5 - 0.065*k14_5 * phi14_5 =e= 0; peak12_5.. 0 =g= k12_5 * phi12_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern12_6.. keff6 * phi12_6 - 0.014*k8_6 * phi8_6 - 0.065*k9_6 * phi9_6 - 0.014*k10_6 * phi10_6 - 0.065*k11_6 * phi11_6 - 0.698*k12_6 * phi12_6 - 0.065*k13_6 * phi13_6 - 0.065*k14_6 * phi14_6 =e= 0; peak12_6.. 0 =g= k12_6 * phi12_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern13_1.. keff1 * phi13_1 - 0.014*k9_1 * phi9_1 - 0.065*k10_1 * phi10_1 - 0.065*k12_1 * phi12_1 - 0.684*k13_1 * phi13_1 - 0.014*k14_1 * phi14_1 =e= 0; peak13_1.. 0 =g= k13_1 * phi13_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern13_2.. keff2 * phi13_2 - 0.014*k9_2 * phi9_2 - 0.065*k10_2 * phi10_2 - 0.065*k12_2 * phi12_2 - 0.684*k13_2 * phi13_2 - 0.014*k14_2 * phi14_2 =e= 0; peak13_2.. 0 =g= k13_2 * phi13_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern13_3.. keff3 * phi13_3 - 0.014*k9_3 * phi9_3 - 0.065*k10_3 * phi10_3 - 0.065*k12_3 * phi12_3 - 0.684*k13_3 * phi13_3 - 0.014*k14_3 * phi14_3 =e= 0; peak13_3.. 0 =g= k13_3 * phi13_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern13_4.. keff4 * phi13_4 - 0.014*k9_4 * phi9_4 - 0.065*k10_4 * phi10_4 - 0.065*k12_4 * phi12_4 - 0.684*k13_4 * phi13_4 - 0.014*k14_4 * phi14_4 =e= 0; peak13_4.. 0 =g= k13_4 * phi13_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern13_5.. keff5 * phi13_5 - 0.014*k9_5 * phi9_5 - 0.065*k10_5 * phi10_5 - 0.065*k12_5 * phi12_5 - 0.684*k13_5 * phi13_5 - 0.014*k14_5 * phi14_5 =e= 0; peak13_5.. 0 =g= k13_5 * phi13_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern13_6.. keff6 * phi13_6 - 0.014*k9_6 * phi9_6 - 0.065*k10_6 * phi10_6 - 0.065*k12_6 * phi12_6 - 0.684*k13_6 * phi13_6 - 0.014*k14_6 * phi14_6 =e= 0; peak13_6.. 0 =g= k13_6 * phi13_6 - 0.16666666666666666*epsilon - 0.16666666666666666; kern14_1.. keff1 * phi14_1 - 0.014*k11_1 * phi11_1 - 0.13*k12_1 * phi12_1 - 0.028*k13_1 * phi13_1 - 0.684*k14_1 * phi14_1 =e= 0; peak14_1.. 0 =g= k14_1 * phi14_1 - 0.16666666666666666*epsilon - 0.16666666666666666; kern14_2.. keff2 * phi14_2 - 0.014*k11_2 * phi11_2 - 0.13*k12_2 * phi12_2 - 0.028*k13_2 * phi13_2 - 0.684*k14_2 * phi14_2 =e= 0; peak14_2.. 0 =g= k14_2 * phi14_2 - 0.16666666666666666*epsilon - 0.16666666666666666; kern14_3.. keff3 * phi14_3 - 0.014*k11_3 * phi11_3 - 0.13*k12_3 * phi12_3 - 0.028*k13_3 * phi13_3 - 0.684*k14_3 * phi14_3 =e= 0; peak14_3.. 0 =g= k14_3 * phi14_3 - 0.16666666666666666*epsilon - 0.16666666666666666; kern14_4.. keff4 * phi14_4 - 0.014*k11_4 * phi11_4 - 0.13*k12_4 * phi12_4 - 0.028*k13_4 * phi13_4 - 0.684*k14_4 * phi14_4 =e= 0; peak14_4.. 0 =g= k14_4 * phi14_4 - 0.16666666666666666*epsilon - 0.16666666666666666; kern14_5.. keff5 * phi14_5 - 0.014*k11_5 * phi11_5 - 0.13*k12_5 * phi12_5 - 0.028*k13_5 * phi13_5 - 0.684*k14_5 * phi14_5 =e= 0; peak14_5.. 0 =g= k14_5 * phi14_5 - 0.16666666666666666*epsilon - 0.16666666666666666; kern14_6.. keff6 * phi14_6 - 0.014*k11_6 * phi11_6 - 0.13*k12_6 * phi12_6 - 0.028*k13_6 * phi13_6 - 0.684*k14_6 * phi14_6 =e= 0; peak14_6.. 0 =g= k14_6 * phi14_6 - 0.16666666666666666*epsilon - 0.16666666666666666; burn1_1.. 0.15288000000000002* k1_1 * phi1_1 + k1_2 - k1_1 =e= 0 ; burn1_2.. 0.15288000000000002* k1_2 * phi1_2 + k1_3 - k1_2 =e= 0 ; burn1_3.. 0.15288000000000002* k1_3 * phi1_3 + k1_4 - k1_3 =e= 0 ; burn1_4.. 0.15288000000000002* k1_4 * phi1_4 + k1_5 - k1_4 =e= 0 ; burn1_5.. 0.15288000000000002* k1_5 * phi1_5 + k1_6 - k1_5 =e= 0 ; burn2_1.. 0.15288000000000002* k2_1 * phi2_1 + k2_2 - k2_1 =e= 0 ; burn2_2.. 0.15288000000000002* k2_2 * phi2_2 + k2_3 - k2_2 =e= 0 ; burn2_3.. 0.15288000000000002* k2_3 * phi2_3 + k2_4 - k2_3 =e= 0 ; burn2_4.. 0.15288000000000002* k2_4 * phi2_4 + k2_5 - k2_4 =e= 0 ; burn2_5.. 0.15288000000000002* k2_5 * phi2_5 + k2_6 - k2_5 =e= 0 ; burn3_1.. 0.15288000000000002* k3_1 * phi3_1 + k3_2 - k3_1 =e= 0 ; burn3_2.. 0.15288000000000002* k3_2 * phi3_2 + k3_3 - k3_2 =e= 0 ; burn3_3.. 0.15288000000000002* k3_3 * phi3_3 + k3_4 - k3_3 =e= 0 ; burn3_4.. 0.15288000000000002* k3_4 * phi3_4 + k3_5 - k3_4 =e= 0 ; burn3_5.. 0.15288000000000002* k3_5 * phi3_5 + k3_6 - k3_5 =e= 0 ; burn4_1.. 0.15288000000000002* k4_1 * phi4_1 + k4_2 - k4_1 =e= 0 ; burn4_2.. 0.15288000000000002* k4_2 * phi4_2 + k4_3 - k4_2 =e= 0 ; burn4_3.. 0.15288000000000002* k4_3 * phi4_3 + k4_4 - k4_3 =e= 0 ; burn4_4.. 0.15288000000000002* k4_4 * phi4_4 + k4_5 - k4_4 =e= 0 ; burn4_5.. 0.15288000000000002* k4_5 * phi4_5 + k4_6 - k4_5 =e= 0 ; burn5_1.. 0.15288000000000002* k5_1 * phi5_1 + k5_2 - k5_1 =e= 0 ; burn5_2.. 0.15288000000000002* k5_2 * phi5_2 + k5_3 - k5_2 =e= 0 ; burn5_3.. 0.15288000000000002* k5_3 * phi5_3 + k5_4 - k5_3 =e= 0 ; burn5_4.. 0.15288000000000002* k5_4 * phi5_4 + k5_5 - k5_4 =e= 0 ; burn5_5.. 0.15288000000000002* k5_5 * phi5_5 + k5_6 - k5_5 =e= 0 ; burn6_1.. 0.15288000000000002* k6_1 * phi6_1 + k6_2 - k6_1 =e= 0 ; burn6_2.. 0.15288000000000002* k6_2 * phi6_2 + k6_3 - k6_2 =e= 0 ; burn6_3.. 0.15288000000000002* k6_3 * phi6_3 + k6_4 - k6_3 =e= 0 ; burn6_4.. 0.15288000000000002* k6_4 * phi6_4 + k6_5 - k6_4 =e= 0 ; burn6_5.. 0.15288000000000002* k6_5 * phi6_5 + k6_6 - k6_5 =e= 0 ; burn7_1.. 0.15288000000000002* k7_1 * phi7_1 + k7_2 - k7_1 =e= 0 ; burn7_2.. 0.15288000000000002* k7_2 * phi7_2 + k7_3 - k7_2 =e= 0 ; burn7_3.. 0.15288000000000002* k7_3 * phi7_3 + k7_4 - k7_3 =e= 0 ; burn7_4.. 0.15288000000000002* k7_4 * phi7_4 + k7_5 - k7_4 =e= 0 ; burn7_5.. 0.15288000000000002* k7_5 * phi7_5 + k7_6 - k7_5 =e= 0 ; burn8_1.. 0.15288000000000002* k8_1 * phi8_1 + k8_2 - k8_1 =e= 0 ; burn8_2.. 0.15288000000000002* k8_2 * phi8_2 + k8_3 - k8_2 =e= 0 ; burn8_3.. 0.15288000000000002* k8_3 * phi8_3 + k8_4 - k8_3 =e= 0 ; burn8_4.. 0.15288000000000002* k8_4 * phi8_4 + k8_5 - k8_4 =e= 0 ; burn8_5.. 0.15288000000000002* k8_5 * phi8_5 + k8_6 - k8_5 =e= 0 ; burn9_1.. 0.15288000000000002* k9_1 * phi9_1 + k9_2 - k9_1 =e= 0 ; burn9_2.. 0.15288000000000002* k9_2 * phi9_2 + k9_3 - k9_2 =e= 0 ; burn9_3.. 0.15288000000000002* k9_3 * phi9_3 + k9_4 - k9_3 =e= 0 ; burn9_4.. 0.15288000000000002* k9_4 * phi9_4 + k9_5 - k9_4 =e= 0 ; burn9_5.. 0.15288000000000002* k9_5 * phi9_5 + k9_6 - k9_5 =e= 0 ; burn10_1.. 0.15288000000000002*k10_1 * phi10_1 + k10_2 - k10_1 =e= 0 ; burn10_2.. 0.15288000000000002*k10_2 * phi10_2 + k10_3 - k10_2 =e= 0 ; burn10_3.. 0.15288000000000002*k10_3 * phi10_3 + k10_4 - k10_3 =e= 0 ; burn10_4.. 0.15288000000000002*k10_4 * phi10_4 + k10_5 - k10_4 =e= 0 ; burn10_5.. 0.15288000000000002*k10_5 * phi10_5 + k10_6 - k10_5 =e= 0 ; burn11_1.. 0.15288000000000002*k11_1 * phi11_1 + k11_2 - k11_1 =e= 0 ; burn11_2.. 0.15288000000000002*k11_2 * phi11_2 + k11_3 - k11_2 =e= 0 ; burn11_3.. 0.15288000000000002*k11_3 * phi11_3 + k11_4 - k11_3 =e= 0 ; burn11_4.. 0.15288000000000002*k11_4 * phi11_4 + k11_5 - k11_4 =e= 0 ; burn11_5.. 0.15288000000000002*k11_5 * phi11_5 + k11_6 - k11_5 =e= 0 ; burn12_1.. 0.15288000000000002*k12_1 * phi12_1 + k12_2 - k12_1 =e= 0 ; burn12_2.. 0.15288000000000002*k12_2 * phi12_2 + k12_3 - k12_2 =e= 0 ; burn12_3.. 0.15288000000000002*k12_3 * phi12_3 + k12_4 - k12_3 =e= 0 ; burn12_4.. 0.15288000000000002*k12_4 * phi12_4 + k12_5 - k12_4 =e= 0 ; burn12_5.. 0.15288000000000002*k12_5 * phi12_5 + k12_6 - k12_5 =e= 0 ; burn13_1.. 0.15288000000000002*k13_1 * phi13_1 + k13_2 - k13_1 =e= 0 ; burn13_2.. 0.15288000000000002*k13_2 * phi13_2 + k13_3 - k13_2 =e= 0 ; burn13_3.. 0.15288000000000002*k13_3 * phi13_3 + k13_4 - k13_3 =e= 0 ; burn13_4.. 0.15288000000000002*k13_4 * phi13_4 + k13_5 - k13_4 =e= 0 ; burn13_5.. 0.15288000000000002*k13_5 * phi13_5 + k13_6 - k13_5 =e= 0 ; burn14_1.. 0.15288000000000002*k14_1 * phi14_1 + k14_2 - k14_1 =e= 0 ; burn14_2.. 0.15288000000000002*k14_2 * phi14_2 + k14_3 - k14_2 =e= 0 ; burn14_3.. 0.15288000000000002*k14_3 * phi14_3 + k14_4 - k14_3 =e= 0 ; burn14_4.. 0.15288000000000002*k14_4 * phi14_4 + k14_5 - k14_4 =e= 0 ; burn14_5.. 0.15288000000000002*k14_5 * phi14_5 + k14_6 - k14_5 =e= 0 ; plac1.. -0.5*x1_2_1 * x1_1_1 * k1_6 - 0.5*x1_3_1 * x1_2_1 * k1_6 - 0.5*x1_4_1 * x1_3_1 * k1_6 - 0.5*x1_2_2 * x1_1_2 * k1_6 - 0.5*x1_3_2 * x1_2_2 * k1_6 - 0.5*x1_4_2 * x1_3_2 * k1_6 - 0.5*x1_2_3 * x1_1_3 * k1_6 - 0.5*x1_3_3 * x1_2_3 * k1_6 - 0.5*x1_4_3 * x1_3_3 * k1_6 - x1_2_1 * x2_1_1 * k2_6 - x1_3_1 *x2_2_1 * k2_6 - x1_4_1 * x2_3_1 * k2_6 - x1_2_2 * x2_1_2 * k2_6 - x1_3_2 * x2_2_2 * k2_6 - x1_4_2 * x2_3_2 * k2_6 - x1_2_3 * x2_1_3 * k2_6 - x1_3_3 * x2_2_3 * k2_6 - x1_4_3 * x2_3_3 * k2_6 - x1_2_1 * x3_1_1 * k3_6 - x1_3_1 * x3_2_1 * k3_6 - x1_4_1 * x3_3_1 * k3_6 - x1_2_2 * x3_1_2 * k3_6 - x1_3_2 * x3_2_2 * k3_6 - x1_4_2 * x3_3_2 * k3_6 - x1_2_3 * x3_1_3 * k3_6 - x1_3_3 * x3_2_3 * k3_6 - x1_4_3 * x3_3_3 * k3_6 - x1_2_1 * x4_1_1 * k4_6 - x1_3_1 * x4_2_1 * k4_6 - x1_4_1 * x4_3_1 * k4_6 - x1_2_2 * x4_1_2 * k4_6 - x1_3_2 * x4_2_2 * k4_6 - x1_4_2 * x4_3_2 * k4_6 - x1_2_3 * x4_1_3 * k4_6 - x1_3_3 * x4_2_3 * k4_6 - x1_4_3 * x4_3_3 * k4_6 - x1_2_1 * x5_1_1 * k5_6 - x1_3_1 * x5_2_1 * k5_6 - x1_4_1 * x5_3_1 * k5_6 - x1_2_2 * x5_1_2 * k5_6 - x1_3_2 * x5_2_2 * k5_6 - x1_4_2 * x5_3_2 * k5_6 - x1_2_3 * x5_1_3 * k5_6 - x1_3_3 * x5_2_3 * k5_6 - x1_4_3 * x5_3_3 * k5_6 - x1_2_1 * x6_1_1 * k6_6 - x1_3_1 * x6_2_1 * k6_6 - x1_4_1 * x6_3_1 * k6_6 - x1_2_2 * x6_1_2 * k6_6 - x1_3_2 * x6_2_2 * k6_6 - x1_4_2 * x6_3_2 * k6_6 - x1_2_3 * x6_1_3 * k6_6 - x1_3_3 * x6_2_3 * k6_6 - x1_4_3 * x6_3_3 * k6_6 - 0.5*x1_2_1 * x7_1_1 * k7_6 - 0.5*x1_3_1 * x7_2_1 * k7_6 - 0.5*x1_4_1 * x7_3_1 * k7_6 - 0.5*x1_2_2 * x7_1_2 * k7_6 - 0.5*x1_3_2 * x7_2_2 * k7_6 - 0.5*x1_4_2 * x7_3_2 * k7_6 - 0.5*x1_2_3 * x7_1_3 * k7_6 - 0.5*x1_3_3 * x7_2_3 * k7_6 - 0.5*x1_4_3 * x7_3_3 * k7_6 - x1_2_1 * x8_1_1 * k8_6 - x1_3_1 * x8_2_1 * k8_6 - x1_4_1 * x8_3_1 * k8_6 - x1_2_2 * x8_1_2 * k8_6 - x1_3_2 * x8_2_2 * k8_6 - x1_4_2 * x8_3_2 * k8_6 - x1_2_3 * x8_1_3 * k8_6 - x1_3_3 * x8_2_3 * k8_6 - x1_4_3 * x8_3_3 * k8_6 - x1_2_1 * x9_1_1 * k9_6 - x1_3_1 * x9_2_1 * k9_6 - x1_4_1 * x9_3_1 * k9_6 - x1_2_2 * x9_1_2 * k9_6 - x1_3_2 * x9_2_2 * k9_6 - x1_4_2 * x9_3_2 * k9_6 - x1_2_3 * x9_1_3 * k9_6 - x1_3_3 * x9_2_3 * k9_6 - x1_4_3 * x9_3_3 * k9_6 - x1_2_1 * x10_1_1 * k10_6 - x1_3_1 * x10_2_1 * k10_6 - x1_4_1 * x10_3_1 * k10_6 - x1_2_2 * x10_1_2 * k10_6 - x1_3_2 * x10_2_2 * k10_6 - x1_4_2 * x10_3_2 * k10_6 - x1_2_3 * x10_1_3 * k10_6 - x1_3_3 * x10_2_3 * k10_6 - x1_4_3 * x10_3_3 * k10_6 - 0.5*x1_2_1 * x11_1_1 * k11_6 - 0.5*x1_3_1 * x11_2_1 * k11_6 - 0.5*x1_4_1 * x11_3_1 * k11_6 - 0.5*x1_2_2 * x11_1_2 * k11_6 - 0.5*x1_3_2 * x11_2_2 * k11_6 - 0.5*x1_4_2 * x11_3_2 * k11_6 - 0.5*x1_2_3 * x11_1_3 * k11_6 - 0.5*x1_3_3 * x11_2_3 * k11_6 - 0.5*x1_4_3 * x11_3_3 * k11_6 - x1_2_1 * x12_1_1 * k12_6 - x1_3_1 * x12_2_1 * k12_6 - x1_4_1 * x12_3_1 * k12_6 - x1_2_2 * x12_1_2 * k12_6 - x1_3_2 * x12_2_2 * k12_6 - x1_4_2 * x12_3_2 * k12_6 - x1_2_3 * x12_1_3 * k12_6 - x1_3_3 * x12_2_3 * k12_6 - x1_4_3 * x12_3_3 * k12_6 - x1_2_1 * x13_1_1 * k13_6 - x1_3_1 * x13_2_1 * k13_6 - x1_4_1 * x13_3_1 * k13_6 - x1_2_2 * x13_1_2 * k13_6 - x1_3_2 * x13_2_2 * k13_6 - x1_4_2 * x13_3_2 * k13_6 - x1_2_3 * x13_1_3 * k13_6 - x1_3_3 * x13_2_3 * k13_6 - x1_4_3 * x13_3_3 * k13_6 - 0.5*x1_2_1 * x14_1_1 * k14_6 - 0.5*x1_3_1 * x14_2_1 * k14_6 - 0.5*x1_4_1 * x14_3_1 * k14_6 - 0.5*x1_2_2 * x14_1_2 * k14_6 - 0.5*x1_3_2 * x14_2_2 * k14_6 - 0.5*x1_4_2 * x14_3_2 * k14_6 - 0.5*x1_2_3 * x14_1_3 * k14_6 - 0.5*x1_3_3 * x14_2_3 * k14_6 - 0.5*x1_4_3 * x14_3_3 * k14_6 + k1_1 - 1.2*x1_1_1 - 1.2*x1_1_2 - 1.2*x1_1_3 =e= 0; plac2.. -0.5*x2_2_1 * x1_1_1 * k1_6 - 0.5*x2_3_1 * x1_2_1 * k1_6 - 0.5*x2_4_1 * x1_3_1 * k1_6 - 0.5*x2_2_2 * x1_1_2 * k1_6 - 0.5*x2_3_2 * x1_2_2 * k1_6 - 0.5*x2_4_2 * x1_3_2 * k1_6 - 0.5*x2_2_3 * x1_1_3 * k1_6 - 0.5*x2_3_3 * x1_2_3 * k1_6 - 0.5*x2_4_3 * x1_3_3 * k1_6 - x2_2_1 * x2_1_1 * k2_6 - x2_3_1 * x2_2_1 * k2_6 - x2_4_1 * x2_3_1 * k2_6 - x2_2_2 * x2_1_2 * k2_6 - x2_3_2 * x2_2_2 * k2_6 - x2_4_2 * x2_3_2 * k2_6 - x2_2_3 * x2_1_3 * k2_6 - x2_3_3 * x2_2_3 * k2_6 - x2_4_3 * x2_3_3 * k2_6 - x2_2_1 * x3_1_1 * k3_6 - x2_3_1 * x3_2_1 * k3_6 - x2_4_1 * x3_3_1 * k3_6 - x2_2_2 * x3_1_2 * k3_6 - x2_3_2 * x3_2_2 * k3_6 - x2_4_2 * x3_3_2 * k3_6 - x2_2_3 * x3_1_3 * k3_6 - x2_3_3 * x3_2_3 * k3_6 - x2_4_3 * x3_3_3 * k3_6 - x2_2_1 * x4_1_1 * k4_6 - x2_3_1 * x4_2_1 * k4_6 - x2_4_1 * x4_3_1 * k4_6 - x2_2_2 * x4_1_2 * k4_6 - x2_3_2 * x4_2_2 * k4_6 - x2_4_2 * x4_3_2 * k4_6 - x2_2_3 * x4_1_3 * k4_6 - x2_3_3 * x4_2_3 * k4_6 - x2_4_3 * x4_3_3 * k4_6 - x2_2_1 * x5_1_1 * k5_6 - x2_3_1 * x5_2_1 * k5_6 - x2_4_1 * x5_3_1 * k5_6 - x2_2_2 * x5_1_2 * k5_6 - x2_3_2 * x5_2_2 * k5_6 - x2_4_2 * x5_3_2 * k5_6 - x2_2_3 * x5_1_3 * k5_6 - x2_3_3 * x5_2_3 * k5_6 - x2_4_3 * x5_3_3 * k5_6 - x2_2_1 * x6_1_1 * k6_6 - x2_3_1 * x6_2_1 * k6_6 - x2_4_1 * x6_3_1 * k6_6 - x2_2_2 * x6_1_2 * k6_6 - x2_3_2 * x6_2_2 * k6_6 - x2_4_2 * x6_3_2 * k6_6 - x2_2_3 * x6_1_3 * k6_6 - x2_3_3 * x6_2_3 * k6_6 - x2_4_3 * x6_3_3 * k6_6 - 0.5*x2_2_1 * x7_1_1 * k7_6 - 0.5*x2_3_1 * x7_2_1 * k7_6 - 0.5*x2_4_1 * x7_3_1 * k7_6 - 0.5*x2_2_2 * x7_1_2 * k7_6 - 0.5*x2_3_2 * x7_2_2 * k7_6 - 0.5*x2_4_2 * x7_3_2 * k7_6 - 0.5*x2_2_3 * x7_1_3 * k7_6 - 0.5*x2_3_3 * x7_2_3 * k7_6 - 0.5*x2_4_3 * x7_3_3 * k7_6 - x2_2_1 * x8_1_1 * k8_6 - x2_3_1 * x8_2_1 * k8_6 - x2_4_1 * x8_3_1 * k8_6 - x2_2_2 * x8_1_2 * k8_6 - x2_3_2 * x8_2_2 * k8_6 - x2_4_2 * x8_3_2 * k8_6 - x2_2_3 * x8_1_3 * k8_6 - x2_3_3 * x8_2_3 * k8_6 - x2_4_3 * x8_3_3 * k8_6 - x2_2_1 * x9_1_1 * k9_6 - x2_3_1 * x9_2_1 * k9_6 - x2_4_1 * x9_3_1 * k9_6 - x2_2_2 * x9_1_2 * k9_6 - x2_3_2 * x9_2_2 * k9_6 - x2_4_2 * x9_3_2 * k9_6 - x2_2_3 * x9_1_3 * k9_6 - x2_3_3 * x9_2_3 * k9_6 - x2_4_3 * x9_3_3 * k9_6 - x2_2_1 * x10_1_1 * k10_6 - x2_3_1 * x10_2_1 * k10_6 - x2_4_1 * x10_3_1 * k10_6 - x2_2_2 * x10_1_2 * k10_6 - x2_3_2 * x10_2_2 * k10_6 - x2_4_2 * x10_3_2 * k10_6 - x2_2_3 * x10_1_3 * k10_6 - x2_3_3 * x10_2_3 * k10_6 - x2_4_3 * x10_3_3 * k10_6 - 0.5*x2_2_1 * x11_1_1 * k11_6 - 0.5*x2_3_1 * x11_2_1 * k11_6 - 0.5*x2_4_1 * x11_3_1 * k11_6 - 0.5*x2_2_2 * x11_1_2 * k11_6 - 0.5*x2_3_2 * x11_2_2 * k11_6 - 0.5*x2_4_2 * x11_3_2 * k11_6 - 0.5*x2_2_3 * x11_1_3 * k11_6 - 0.5*x2_3_3 * x11_2_3 * k11_6 - 0.5*x2_4_3 * x11_3_3 * k11_6 - x2_2_1 * x12_1_1 * k12_6 - x2_3_1 * x12_2_1 * k12_6 - x2_4_1 * x12_3_1 * k12_6 - x2_2_2 * x12_1_2 * k12_6 - x2_3_2 * x12_2_2 * k12_6 - x2_4_2 * x12_3_2 * k12_6 - x2_2_3 * x12_1_3 * k12_6 - x2_3_3 * x12_2_3 * k12_6 - x2_4_3 * x12_3_3 * k12_6 - x2_2_1 * x13_1_1 * k13_6 - x2_3_1 * x13_2_1 * k13_6 - x2_4_1 * x13_3_1 * k13_6 - x2_2_2 * x13_1_2 * k13_6 - x2_3_2 * x13_2_2 * k13_6 - x2_4_2 * x13_3_2 * k13_6 - x2_2_3 * x13_1_3 * k13_6 - x2_3_3 * x13_2_3 * k13_6 - x2_4_3 * x13_3_3 * k13_6 - 0.5*x2_2_1 * x14_1_1 * k14_6 - 0.5*x2_3_1 * x14_2_1 * k14_6 - 0.5*x2_4_1 * x14_3_1 * k14_6 - 0.5*x2_2_2 * x14_1_2 * k14_6 - 0.5*x2_3_2 * x14_2_2 * k14_6 - 0.5*x2_4_2 * x14_3_2 * k14_6 - 0.5*x2_2_3 * x14_1_3 * k14_6 - 0.5*x2_3_3 * x14_2_3 * k14_6 - 0.5*x2_4_3 * x14_3_3 * k14_6 + k2_1 - 1.2*x2_1_1 - 1.2*x2_1_2 - 1.2*x2_1_3=e= 0; plac3.. -0.5*x3_2_1 * x1_1_1 * k1_6 - 0.5*x3_3_1 * x1_2_1 * k1_6 - 0.5*x3_4_1 * x1_3_1 * k1_6 - 0.5*x3_2_2 * x1_1_2 * k1_6 - 0.5*x3_3_2 * x1_2_2 * k1_6 - 0.5*x3_4_2 * x1_3_2 * k1_6 - 0.5*x3_2_3 * x1_1_3 * k1_6 - 0.5*x3_3_3 * x1_2_3 * k1_6 - 0.5*x3_4_3 * x1_3_3 * k1_6 - x3_2_1 * x2_1_1 * k2_6 - x3_3_1 * x2_2_1 * k2_6 - x3_4_1 * x2_3_1 * k2_6 - x3_2_2 * x2_1_2 * k2_6 - x3_3_2 * x2_2_2 * k2_6 - x3_4_2 * x2_3_2 * k2_6 - x3_2_3 * x2_1_3 * k2_6 - x3_3_3 * x2_2_3 * k2_6 - x3_4_3 * x2_3_3 * k2_6 - x3_2_1 * x3_1_1 * k3_6 - x3_3_1 * x3_2_1 * k3_6 - x3_4_1 * x3_3_1 * k3_6 - x3_2_2 * x3_1_2 * k3_6 - x3_3_2 * x3_2_2 * k3_6 - x3_4_2 * x3_3_2 * k3_6 - x3_2_3 * x3_1_3 * k3_6 - x3_3_3 * x3_2_3 * k3_6 - x3_4_3 * x3_3_3 * k3_6 - x3_2_1 * x4_1_1 * k4_6 - x3_3_1 * x4_2_1 * k4_6 - x3_4_1 * x4_3_1 * k4_6 - x3_2_2 * x4_1_2 * k4_6 - x3_3_2 * x4_2_2 * k4_6 - x3_4_2 * x4_3_2 * k4_6 - x3_2_3 * x4_1_3 * k4_6 - x3_3_3 * x4_2_3 * k4_6 - x3_4_3 * x4_3_3 * k4_6 - x3_2_1 * x5_1_1 * k5_6 - x3_3_1 * x5_2_1 * k5_6 - x3_4_1 * x5_3_1 * k5_6 - x3_2_2 * x5_1_2 * k5_6 - x3_3_2 * x5_2_2 * k5_6 - x3_4_2 * x5_3_2 * k5_6 - x3_2_3 * x5_1_3 * k5_6 - x3_3_3 * x5_2_3 * k5_6 - x3_4_3 * x5_3_3 * k5_6 - x3_2_1 * x6_1_1 * k6_6 - x3_3_1 * x6_2_1 * k6_6 - x3_4_1 * x6_3_1 * k6_6 - x3_2_2 * x6_1_2 * k6_6 - x3_3_2 * x6_2_2 * k6_6 - x3_4_2 * x6_3_2 * k6_6 - x3_2_3 * x6_1_3 * k6_6 - x3_3_3 * x6_2_3 * k6_6 - x3_4_3 * x6_3_3 * k6_6 - 0.5*x3_2_1 * x7_1_1 * k7_6 - 0.5*x3_3_1 * x7_2_1 * k7_6 - 0.5*x3_4_1 * x7_3_1 * k7_6 - 0.5*x3_2_2 * x7_1_2 * k7_6 - 0.5*x3_3_2 * x7_2_2 * k7_6 - 0.5*x3_4_2 * x7_3_2 * k7_6 - 0.5*x3_2_3 * x7_1_3 * k7_6 - 0.5*x3_3_3 * x7_2_3 * k7_6 - 0.5*x3_4_3 * x7_3_3 * k7_6 - x3_2_1 * x8_1_1 * k8_6 - x3_3_1 * x8_2_1 * k8_6 - x3_4_1 * x8_3_1 * k8_6 - x3_2_2 * x8_1_2 * k8_6 - x3_3_2 * x8_2_2 * k8_6 - x3_4_2 * x8_3_2 * k8_6 - x3_2_3 * x8_1_3 * k8_6 - x3_3_3 * x8_2_3 * k8_6 - x3_4_3 * x8_3_3 * k8_6 - x3_2_1 * x9_1_1 * k9_6 - x3_3_1 * x9_2_1 * k9_6 - x3_4_1 * x9_3_1 * k9_6 - x3_2_2 * x9_1_2 * k9_6 - x3_3_2 * x9_2_2 * k9_6 - x3_4_2 * x9_3_2 * k9_6 - x3_2_3 * x9_1_3 * k9_6 - x3_3_3 * x9_2_3 * k9_6 - x3_4_3 * x9_3_3 * k9_6 - x3_2_1 * x10_1_1 * k10_6 - x3_3_1 * x10_2_1 * k10_6 - x3_4_1 * x10_3_1 * k10_6 - x3_2_2 * x10_1_2 * k10_6 - x3_3_2 * x10_2_2 * k10_6 - x3_4_2 * x10_3_2 * k10_6 - x3_2_3 * x10_1_3 * k10_6 - x3_3_3 * x10_2_3 * k10_6 - x3_4_3 * x10_3_3 * k10_6 - 0.5*x3_2_1 * x11_1_1 * k11_6 - 0.5*x3_3_1 * x11_2_1 * k11_6 - 0.5*x3_4_1 * x11_3_1 * k11_6 - 0.5*x3_2_2 * x11_1_2 * k11_6 - 0.5*x3_3_2 * x11_2_2 * k11_6 - 0.5*x3_4_2 * x11_3_2 * k11_6 - 0.5*x3_2_3 * x11_1_3 * k11_6 - 0.5*x3_3_3 * x11_2_3 * k11_6 - 0.5*x3_4_3 * x11_3_3 * k11_6 - x3_2_1 * x12_1_1 * k12_6 - x3_3_1 * x12_2_1 * k12_6 - x3_4_1 * x12_3_1 * k12_6 - x3_2_2 * x12_1_2 * k12_6 - x3_3_2 * x12_2_2 * k12_6 - x3_4_2 * x12_3_2 * k12_6 - x3_2_3 * x12_1_3 * k12_6 - x3_3_3 * x12_2_3 * k12_6 - x3_4_3 * x12_3_3 * k12_6 - x3_2_1 * x13_1_1 * k13_6 - x3_3_1 * x13_2_1 * k13_6 - x3_4_1 * x13_3_1 * k13_6 - x3_2_2 * x13_1_2 * k13_6 - x3_3_2 * x13_2_2 * k13_6 - x3_4_2 * x13_3_2 * k13_6 - x3_2_3 * x13_1_3 * k13_6 - x3_3_3 * x13_2_3 * k13_6 - x3_4_3 * x13_3_3 * k13_6 - 0.5*x3_2_1 * x14_1_1 * k14_6 - 0.5*x3_3_1 * x14_2_1 * k14_6 - 0.5*x3_4_1 * x14_3_1 * k14_6 - 0.5*x3_2_2 * x14_1_2 * k14_6 - 0.5*x3_3_2 * x14_2_2 * k14_6 - 0.5*x3_4_2 * x14_3_2 * k14_6 - 0.5*x3_2_3 * x14_1_3 * k14_6 - 0.5*x3_3_3 * x14_2_3 * k14_6 - 0.5*x3_4_3 * x14_3_3 * k14_6 + k3_1 - 1.2*x3_1_1 - 1.2*x3_1_2 - 1.2*x3_1_3=e= 0; plac4.. -0.5*x4_2_1 * x1_1_1 * k1_6 - 0.5*x4_3_1 * x1_2_1 * k1_6 - 0.5*x4_4_1 * x1_3_1 * k1_6 - 0.5*x4_2_2 * x1_1_2 * k1_6 - 0.5*x4_3_2 * x1_2_2 * k1_6 - 0.5*x4_4_2 * x1_3_2 * k1_6 - 0.5*x4_2_3 * x1_1_3 * k1_6 - 0.5*x4_3_3 * x1_2_3 * k1_6 - 0.5*x4_4_3 * x1_3_3 * k1_6 - x4_2_1 * x2_1_1 * k2_6 - x4_3_1 * x2_2_1 * k2_6 - x4_4_1 * x2_3_1 * k2_6 - x4_2_2 * x2_1_2 * k2_6 - x4_3_2 * x2_2_2 * k2_6 - x4_4_2 * x2_3_2 * k2_6 - x4_2_3 * x2_1_3 * k2_6 - x4_3_3 * x2_2_3 * k2_6 - x4_4_3 * x2_3_3 * k2_6 - x4_2_1 * x3_1_1 * k3_6 - x4_3_1 * x3_2_1 * k3_6 - x4_4_1 * x3_3_1 * k3_6 - x4_2_2 * x3_1_2 * k3_6 - x4_3_2 * x3_2_2 * k3_6 - x4_4_2 * x3_3_2 * k3_6 - x4_2_3 * x3_1_3 * k3_6 - x4_3_3 * x3_2_3 * k3_6 - x4_4_3 * x3_3_3 * k3_6 - x4_2_1 * x4_1_1 * k4_6 - x4_3_1 * x4_2_1 * k4_6 - x4_4_1 * x4_3_1 * k4_6 - x4_2_2 * x4_1_2 * k4_6 - x4_3_2 * x4_2_2 * k4_6 - x4_4_2 * x4_3_2 * k4_6 - x4_2_3 * x4_1_3 * k4_6 - x4_3_3 * x4_2_3 * k4_6 - x4_4_3 * x4_3_3 * k4_6 - x4_2_1 * x5_1_1 * k5_6 - x4_3_1 * x5_2_1 * k5_6 - x4_4_1 * x5_3_1 * k5_6 - x4_2_2 * x5_1_2 * k5_6 - x4_3_2 * x5_2_2 * k5_6 - x4_4_2 * x5_3_2 * k5_6 - x4_2_3 * x5_1_3 * k5_6 - x4_3_3 * x5_2_3 * k5_6 - x4_4_3 * x5_3_3 * k5_6 - x4_2_1 * x6_1_1 * k6_6 - x4_3_1 * x6_2_1 * k6_6 - x4_4_1 * x6_3_1 * k6_6 - x4_2_2 * x6_1_2 * k6_6 - x4_3_2 * x6_2_2 * k6_6 - x4_4_2 * x6_3_2 * k6_6 - x4_2_3 * x6_1_3 * k6_6 - x4_3_3 * x6_2_3 * k6_6 - x4_4_3 * x6_3_3 * k6_6 - 0.5*x4_2_1 * x7_1_1 * k7_6 - 0.5*x4_3_1 * x7_2_1 * k7_6 - 0.5*x4_4_1 * x7_3_1 * k7_6 - 0.5*x4_2_2 * x7_1_2 * k7_6 - 0.5*x4_3_2 * x7_2_2 * k7_6 - 0.5*x4_4_2 * x7_3_2 * k7_6 - 0.5*x4_2_3 * x7_1_3 * k7_6 - 0.5*x4_3_3 * x7_2_3 * k7_6 - 0.5*x4_4_3 * x7_3_3 * k7_6 - x4_2_1 * x8_1_1 * k8_6 - x4_3_1 * x8_2_1 * k8_6 - x4_4_1 * x8_3_1 * k8_6 - x4_2_2 * x8_1_2 * k8_6 - x4_3_2 * x8_2_2 * k8_6 - x4_4_2 * x8_3_2 * k8_6 - x4_2_3 * x8_1_3 * k8_6 - x4_3_3 * x8_2_3 * k8_6 - x4_4_3 * x8_3_3 * k8_6 - x4_2_1 * x9_1_1 * k9_6 - x4_3_1 * x9_2_1 * k9_6 - x4_4_1 * x9_3_1 * k9_6 - x4_2_2 * x9_1_2 * k9_6 - x4_3_2 * x9_2_2 * k9_6 - x4_4_2 * x9_3_2 * k9_6 - x4_2_3 * x9_1_3 * k9_6 - x4_3_3 * x9_2_3 * k9_6 - x4_4_3 * x9_3_3 * k9_6 - x4_2_1 * x10_1_1 * k10_6 - x4_3_1 * x10_2_1 * k10_6 - x4_4_1 * x10_3_1 * k10_6 - x4_2_2 * x10_1_2 * k10_6 - x4_3_2 * x10_2_2 * k10_6 - x4_4_2 * x10_3_2 * k10_6 - x4_2_3 * x10_1_3 * k10_6 - x4_3_3 * x10_2_3 * k10_6 - x4_4_3 * x10_3_3 * k10_6 - 0.5*x4_2_1 * x11_1_1 * k11_6 - 0.5*x4_3_1 * x11_2_1 * k11_6 - 0.5*x4_4_1 * x11_3_1 * k11_6 - 0.5*x4_2_2 * x11_1_2 * k11_6 - 0.5*x4_3_2 * x11_2_2 * k11_6 - 0.5*x4_4_2 * x11_3_2 * k11_6 - 0.5*x4_2_3 * x11_1_3 * k11_6 - 0.5*x4_3_3 * x11_2_3 * k11_6 - 0.5*x4_4_3 * x11_3_3 * k11_6 - x4_2_1 * x12_1_1 * k12_6 - x4_3_1 * x12_2_1 * k12_6 - x4_4_1 * x12_3_1 * k12_6 - x4_2_2 * x12_1_2 * k12_6 - x4_3_2 * x12_2_2 * k12_6 - x4_4_2 * x12_3_2 * k12_6 - x4_2_3 * x12_1_3 * k12_6 - x4_3_3 * x12_2_3 * k12_6 - x4_4_3 * x12_3_3 * k12_6 - x4_2_1 * x13_1_1 * k13_6 - x4_3_1 * x13_2_1 * k13_6 - x4_4_1 * x13_3_1 * k13_6 - x4_2_2 * x13_1_2 * k13_6 - x4_3_2 * x13_2_2 * k13_6 - x4_4_2 * x13_3_2 * k13_6 - x4_2_3 * x13_1_3 * k13_6 - x4_3_3 * x13_2_3 * k13_6 - x4_4_3 * x13_3_3 * k13_6 - 0.5*x4_2_1 * x14_1_1 * k14_6 - 0.5*x4_3_1 * x14_2_1 * k14_6 - 0.5*x4_4_1 * x14_3_1 * k14_6 - 0.5*x4_2_2 * x14_1_2 * k14_6 - 0.5*x4_3_2 * x14_2_2 * k14_6 - 0.5*x4_4_2 * x14_3_2 * k14_6 - 0.5*x4_2_3 * x14_1_3 * k14_6 - 0.5*x4_3_3 * x14_2_3 * k14_6 - 0.5*x4_4_3 * x14_3_3 * k14_6 + k4_1 - 1.2*x4_1_1 - 1.2*x4_1_2 - 1.2*x4_1_3=e= 0; plac5.. -0.5*x5_2_1 * x1_1_1 * k1_6 - 0.5*x5_3_1 * x1_2_1 * k1_6 - 0.5*x5_4_1 * x1_3_1 * k1_6 - 0.5*x5_2_2 * x1_1_2 * k1_6 - 0.5*x5_3_2 * x1_2_2 * k1_6 - 0.5*x5_4_2 * x1_3_2 * k1_6 - 0.5*x5_2_3 * x1_1_3 * k1_6 - 0.5*x5_3_3 * x1_2_3 * k1_6 - 0.5*x5_4_3 * x1_3_3 * k1_6 - x5_2_1 * x2_1_1 * k2_6 - x5_3_1 * x2_2_1 * k2_6 - x5_4_1 * x2_3_1 * k2_6 - x5_2_2 * x2_1_2 * k2_6 - x5_3_2 * x2_2_2 * k2_6 - x5_4_2 * x2_3_2 * k2_6 - x5_2_3 * x2_1_3 * k2_6 - x5_3_3 * x2_2_3 * k2_6 - x5_4_3 * x2_3_3 * k2_6 - x5_2_1 * x3_1_1 * k3_6 - x5_3_1 * x3_2_1 * k3_6 - x5_4_1 * x3_3_1 * k3_6 - x5_2_2 * x3_1_2 * k3_6 - x5_3_2 * x3_2_2 * k3_6 - x5_4_2 * x3_3_2 * k3_6 - x5_2_3 * x3_1_3 * k3_6 - x5_3_3 * x3_2_3 * k3_6 - x5_4_3 * x3_3_3 * k3_6 - x5_2_1 * x4_1_1 * k4_6 - x5_3_1 * x4_2_1 * k4_6 - x5_4_1 * x4_3_1 * k4_6 - x5_2_2 * x4_1_2 * k4_6 - x5_3_2 * x4_2_2 * k4_6 - x5_4_2 * x4_3_2 * k4_6 - x5_2_3 * x4_1_3 * k4_6 - x5_3_3 * x4_2_3 * k4_6 - x5_4_3 * x4_3_3 * k4_6 - x5_2_1 * x5_1_1 * k5_6 - x5_3_1 * x5_2_1 * k5_6 - x5_4_1 * x5_3_1 * k5_6 - x5_2_2 * x5_1_2 * k5_6 - x5_3_2 * x5_2_2 * k5_6 - x5_4_2 * x5_3_2 * k5_6 - x5_2_3 * x5_1_3 * k5_6 - x5_3_3 * x5_2_3 * k5_6 - x5_4_3 * x5_3_3 * k5_6 - x5_2_1 * x6_1_1 * k6_6 - x5_3_1 * x6_2_1 * k6_6 - x5_4_1 * x6_3_1 * k6_6 - x5_2_2 * x6_1_2 * k6_6 - x5_3_2 * x6_2_2 * k6_6 - x5_4_2 * x6_3_2 * k6_6 - x5_2_3 * x6_1_3 * k6_6 - x5_3_3 * x6_2_3 * k6_6 - x5_4_3 * x6_3_3 * k6_6 - 0.5*x5_2_1 * x7_1_1 * k7_6 - 0.5*x5_3_1 * x7_2_1 * k7_6 - 0.5*x5_4_1 * x7_3_1 * k7_6 - 0.5*x5_2_2 * x7_1_2 * k7_6 - 0.5*x5_3_2 * x7_2_2 * k7_6 - 0.5*x5_4_2 * x7_3_2 * k7_6 - 0.5*x5_2_3 * x7_1_3 * k7_6 - 0.5*x5_3_3 * x7_2_3 * k7_6 - 0.5*x5_4_3 * x7_3_3 * k7_6 - x5_2_1 * x8_1_1 * k8_6 - x5_3_1 * x8_2_1 * k8_6 - x5_4_1 * x8_3_1 * k8_6 - x5_2_2 * x8_1_2 * k8_6 - x5_3_2 * x8_2_2 * k8_6 - x5_4_2 * x8_3_2 * k8_6 - x5_2_3 * x8_1_3 * k8_6 - x5_3_3 * x8_2_3 * k8_6 - x5_4_3 * x8_3_3 * k8_6 - x5_2_1 * x9_1_1 * k9_6 - x5_3_1 * x9_2_1 * k9_6 - x5_4_1 * x9_3_1 * k9_6 - x5_2_2 * x9_1_2 * k9_6 - x5_3_2 * x9_2_2 * k9_6 - x5_4_2 * x9_3_2 * k9_6 - x5_2_3 * x9_1_3 * k9_6 - x5_3_3 * x9_2_3 * k9_6 - x5_4_3 * x9_3_3 * k9_6 - x5_2_1 * x10_1_1 * k10_6 - x5_3_1 * x10_2_1 * k10_6 - x5_4_1 * x10_3_1 * k10_6 - x5_2_2 * x10_1_2 * k10_6 - x5_3_2 * x10_2_2 * k10_6 - x5_4_2 * x10_3_2 * k10_6 - x5_2_3 * x10_1_3 * k10_6 - x5_3_3 * x10_2_3 * k10_6 - x5_4_3 * x10_3_3 * k10_6 - 0.5*x5_2_1 * x11_1_1 * k11_6 - 0.5*x5_3_1 * x11_2_1 * k11_6 - 0.5*x5_4_1 * x11_3_1 * k11_6 - 0.5*x5_2_2 * x11_1_2 * k11_6 - 0.5*x5_3_2 * x11_2_2 * k11_6 - 0.5*x5_4_2 * x11_3_2 * k11_6 - 0.5*x5_2_3 * x11_1_3 * k11_6 - 0.5*x5_3_3 * x11_2_3 * k11_6 - 0.5*x5_4_3 * x11_3_3 * k11_6 - x5_2_1 * x12_1_1 * k12_6 - x5_3_1 * x12_2_1 * k12_6 - x5_4_1 * x12_3_1 * k12_6 - x5_2_2 * x12_1_2 * k12_6 - x5_3_2 * x12_2_2 * k12_6 - x5_4_2 * x12_3_2 * k12_6 - x5_2_3 * x12_1_3 * k12_6 - x5_3_3 * x12_2_3 * k12_6 - x5_4_3 * x12_3_3 * k12_6 - x5_2_1 * x13_1_1 * k13_6 - x5_3_1 * x13_2_1 * k13_6 - x5_4_1 * x13_3_1 * k13_6 - x5_2_2 * x13_1_2 * k13_6 - x5_3_2 * x13_2_2 * k13_6 - x5_4_2 * x13_3_2 * k13_6 - x5_2_3 * x13_1_3 * k13_6 - x5_3_3 * x13_2_3 * k13_6 - x5_4_3 * x13_3_3 * k13_6 - 0.5*x5_2_1 * x14_1_1 * k14_6 - 0.5*x5_3_1 * x14_2_1 * k14_6 - 0.5*x5_4_1 * x14_3_1 * k14_6 - 0.5*x5_2_2 * x14_1_2 * k14_6 - 0.5*x5_3_2 * x14_2_2 * k14_6 - 0.5*x5_4_2 * x14_3_2 * k14_6 - 0.5*x5_2_3 * x14_1_3 * k14_6 - 0.5*x5_3_3 * x14_2_3 * k14_6 - 0.5*x5_4_3 * x14_3_3 * k14_6 + k5_1 - 1.2*x5_1_1 - 1.2*x5_1_2 - 1.2*x5_1_3=e= 0; plac6.. -0.5*x6_2_1 * x1_1_1 * k1_6 - 0.5*x6_3_1 * x1_2_1 * k1_6 - 0.5*x6_4_1 * x1_3_1 * k1_6 - 0.5*x6_2_2 * x1_1_2 * k1_6 - 0.5*x6_3_2 * x1_2_2 * k1_6 - 0.5*x6_4_2 * x1_3_2 * k1_6 - 0.5*x6_2_3 * x1_1_3 * k1_6 - 0.5*x6_3_3 * x1_2_3 * k1_6 - 0.5*x6_4_3 * x1_3_3 * k1_6 - x6_2_1 * x2_1_1 * k2_6 - x6_3_1 * x2_2_1 * k2_6 - x6_4_1 * x2_3_1 * k2_6 - x6_2_2 * x2_1_2 * k2_6 - x6_3_2 * x2_2_2 * k2_6 - x6_4_2 * x2_3_2 * k2_6 - x6_2_3 * x2_1_3 * k2_6 - x6_3_3 * x2_2_3 * k2_6 - x6_4_3 * x2_3_3 * k2_6 - x6_2_1 * x3_1_1 * k3_6 - x6_3_1 * x3_2_1 * k3_6 - x6_4_1 * x3_3_1 * k3_6 - x6_2_2 * x3_1_2 * k3_6 - x6_3_2 * x3_2_2 * k3_6 - x6_4_2 * x3_3_2 * k3_6 - x6_2_3 * x3_1_3 * k3_6 - x6_3_3 * x3_2_3 * k3_6 - x6_4_3 * x3_3_3 * k3_6 - x6_2_1 * x4_1_1 * k4_6 - x6_3_1 * x4_2_1 * k4_6 - x6_4_1 * x4_3_1 * k4_6 - x6_2_2 * x4_1_2 * k4_6 - x6_3_2 * x4_2_2 * k4_6 - x6_4_2 * x4_3_2 * k4_6 - x6_2_3 * x4_1_3 * k4_6 - x6_3_3 * x4_2_3 * k4_6 - x6_4_3 * x4_3_3 * k4_6 - x6_2_1 * x5_1_1 * k5_6 - x6_3_1 * x5_2_1 * k5_6 - x6_4_1 * x5_3_1 * k5_6 - x6_2_2 * x5_1_2 * k5_6 - x6_3_2 * x5_2_2 * k5_6 - x6_4_2 * x5_3_2 * k5_6 - x6_2_3 * x5_1_3 * k5_6 - x6_3_3 * x5_2_3 * k5_6 - x6_4_3 * x5_3_3 * k5_6 - x6_2_1 * x6_1_1 * k6_6 - x6_3_1 * x6_2_1 * k6_6 - x6_4_1 * x6_3_1 * k6_6 - x6_2_2 * x6_1_2 * k6_6 - x6_3_2 * x6_2_2 * k6_6 - x6_4_2 * x6_3_2 * k6_6 - x6_2_3 * x6_1_3 * k6_6 - x6_3_3 * x6_2_3 * k6_6 - x6_4_3 * x6_3_3 * k6_6 - 0.5*x6_2_1 * x7_1_1 * k7_6 - 0.5*x6_3_1 * x7_2_1 * k7_6 - 0.5*x6_4_1 * x7_3_1 * k7_6 - 0.5*x6_2_2 * x7_1_2 * k7_6 - 0.5*x6_3_2 * x7_2_2 * k7_6 - 0.5*x6_4_2 * x7_3_2 * k7_6 - 0.5*x6_2_3 * x7_1_3 * k7_6 - 0.5*x6_3_3 * x7_2_3 * k7_6 - 0.5*x6_4_3 * x7_3_3 * k7_6 - x6_2_1 * x8_1_1 * k8_6 - x6_3_1 * x8_2_1 * k8_6 - x6_4_1 * x8_3_1 * k8_6 - x6_2_2 * x8_1_2 * k8_6 - x6_3_2 * x8_2_2 * k8_6 - x6_4_2 * x8_3_2 * k8_6 - x6_2_3 * x8_1_3 * k8_6 - x6_3_3 * x8_2_3 * k8_6 - x6_4_3 * x8_3_3 * k8_6 - x6_2_1 * x9_1_1 * k9_6 - x6_3_1 * x9_2_1 * k9_6 - x6_4_1 * x9_3_1 * k9_6 - x6_2_2 * x9_1_2 * k9_6 - x6_3_2 * x9_2_2 * k9_6 - x6_4_2 * x9_3_2 * k9_6 - x6_2_3 * x9_1_3 * k9_6 - x6_3_3 * x9_2_3 * k9_6 - x6_4_3 * x9_3_3 * k9_6 - x6_2_1 * x10_1_1 * k10_6 - x6_3_1 * x10_2_1 * k10_6 - x6_4_1 * x10_3_1 * k10_6 - x6_2_2 * x10_1_2 * k10_6 - x6_3_2 * x10_2_2 * k10_6 - x6_4_2 * x10_3_2 * k10_6 - x6_2_3 * x10_1_3 * k10_6 - x6_3_3 * x10_2_3 * k10_6 - x6_4_3 * x10_3_3 * k10_6 - 0.5*x6_2_1 * x11_1_1 * k11_6 - 0.5*x6_3_1 * x11_2_1 * k11_6 - 0.5*x6_4_1 * x11_3_1 * k11_6 - 0.5*x6_2_2 * x11_1_2 * k11_6 - 0.5*x6_3_2 * x11_2_2 * k11_6 - 0.5*x6_4_2 * x11_3_2 * k11_6 - 0.5*x6_2_3 * x11_1_3 * k11_6 - 0.5*x6_3_3 * x11_2_3 * k11_6 - 0.5*x6_4_3 * x11_3_3 * k11_6 - x6_2_1 * x12_1_1 * k12_6 - x6_3_1 * x12_2_1 * k12_6 - x6_4_1 * x12_3_1 * k12_6 - x6_2_2 * x12_1_2 * k12_6 - x6_3_2 * x12_2_2 * k12_6 - x6_4_2 * x12_3_2 * k12_6 - x6_2_3 * x12_1_3 * k12_6 - x6_3_3 * x12_2_3 * k12_6 - x6_4_3 * x12_3_3 * k12_6 - x6_2_1 * x13_1_1 * k13_6 - x6_3_1 * x13_2_1 * k13_6 - x6_4_1 * x13_3_1 * k13_6 - x6_2_2 * x13_1_2 * k13_6 - x6_3_2 * x13_2_2 * k13_6 - x6_4_2 * x13_3_2 * k13_6 - x6_2_3 * x13_1_3 * k13_6 - x6_3_3 * x13_2_3 * k13_6 - x6_4_3 * x13_3_3 * k13_6 - 0.5*x6_2_1 * x14_1_1 * k14_6 - 0.5*x6_3_1 * x14_2_1 * k14_6 - 0.5*x6_4_1 * x14_3_1 * k14_6 - 0.5*x6_2_2 * x14_1_2 * k14_6 - 0.5*x6_3_2 * x14_2_2 * k14_6 - 0.5*x6_4_2 * x14_3_2 * k14_6 - 0.5*x6_2_3 * x14_1_3 * k14_6 - 0.5*x6_3_3 * x14_2_3 * k14_6 - 0.5*x6_4_3 * x14_3_3 * k14_6 + k6_1 - 1.2*x6_1_1 - 1.2*x6_1_2 - 1.2*x6_1_3=e= 0; plac7.. -0.5*x7_2_1 * x1_1_1 * k1_6 - 0.5*x7_3_1 * x1_2_1 * k1_6 - 0.5*x7_4_1 * x1_3_1 * k1_6 - 0.5*x7_2_2 * x1_1_2 * k1_6 - 0.5*x7_3_2 * x1_2_2 * k1_6 - 0.5*x7_4_2 * x1_3_2 * k1_6 - 0.5*x7_2_3 * x1_1_3 * k1_6 - 0.5*x7_3_3 * x1_2_3 * k1_6 - 0.5*x7_4_3 * x1_3_3 * k1_6 - x7_2_1 * x2_1_1 * k2_6 - x7_3_1 * x2_2_1 * k2_6 - x7_4_1 * x2_3_1 * k2_6 - x7_2_2 * x2_1_2 * k2_6 - x7_3_2 * x2_2_2 * k2_6 - x7_4_2 * x2_3_2 * k2_6 - x7_2_3 * x2_1_3 * k2_6 - x7_3_3 * x2_2_3 * k2_6 - x7_4_3 * x2_3_3 * k2_6 - x7_2_1 * x3_1_1 * k3_6 - x7_3_1 * x3_2_1 * k3_6 - x7_4_1 * x3_3_1 * k3_6 - x7_2_2 * x3_1_2 * k3_6 - x7_3_2 * x3_2_2 * k3_6 - x7_4_2 * x3_3_2 * k3_6 - x7_2_3 * x3_1_3 * k3_6 - x7_3_3 * x3_2_3 * k3_6 - x7_4_3 * x3_3_3 * k3_6 - x7_2_1 * x4_1_1 * k4_6 - x7_3_1 * x4_2_1 * k4_6 - x7_4_1 * x4_3_1 * k4_6 - x7_2_2 * x4_1_2 * k4_6 - x7_3_2 * x4_2_2 * k4_6 - x7_4_2 * x4_3_2 * k4_6 - x7_2_3 * x4_1_3 * k4_6 - x7_3_3 * x4_2_3 * k4_6 - x7_4_3 * x4_3_3 * k4_6 - x7_2_1 * x5_1_1 * k5_6 - x7_3_1 * x5_2_1 * k5_6 - x7_4_1 * x5_3_1 * k5_6 - x7_2_2 * x5_1_2 * k5_6 - x7_3_2 * x5_2_2 * k5_6 - x7_4_2 * x5_3_2 * k5_6 - x7_2_3 * x5_1_3 * k5_6 - x7_3_3 * x5_2_3 * k5_6 - x7_4_3 * x5_3_3 * k5_6 - x7_2_1 * x6_1_1 * k6_6 - x7_3_1 * x6_2_1 * k6_6 - x7_4_1 * x6_3_1 * k6_6 - x7_2_2 * x6_1_2 * k6_6 - x7_3_2 * x6_2_2 * k6_6 - x7_4_2 * x6_3_2 * k6_6 - x7_2_3 * x6_1_3 * k6_6 - x7_3_3 * x6_2_3 * k6_6 - x7_4_3 * x6_3_3 * k6_6 - 0.5*x7_2_1 * x7_1_1 * k7_6 - 0.5*x7_3_1 * x7_2_1 * k7_6 - 0.5*x7_4_1 * x7_3_1 * k7_6 - 0.5*x7_2_2 * x7_1_2 * k7_6 - 0.5*x7_3_2 * x7_2_2 * k7_6 - 0.5*x7_4_2 * x7_3_2 * k7_6 - 0.5*x7_2_3 * x7_1_3 * k7_6 - 0.5*x7_3_3 * x7_2_3 * k7_6 - 0.5*x7_4_3 * x7_3_3 * k7_6 - x7_2_1 * x8_1_1 * k8_6 - x7_3_1 * x8_2_1 * k8_6 - x7_4_1 * x8_3_1 * k8_6 - x7_2_2 * x8_1_2 * k8_6 - x7_3_2 * x8_2_2 * k8_6 - x7_4_2 * x8_3_2 * k8_6 - x7_2_3 * x8_1_3 * k8_6 - x7_3_3 * x8_2_3 * k8_6 - x7_4_3 * x8_3_3 * k8_6 - x7_2_1 * x9_1_1 * k9_6 - x7_3_1 * x9_2_1 * k9_6 - x7_4_1 * x9_3_1 * k9_6 - x7_2_2 * x9_1_2 * k9_6 - x7_3_2 * x9_2_2 * k9_6 - x7_4_2 * x9_3_2 * k9_6 - x7_2_3 * x9_1_3 * k9_6 - x7_3_3 * x9_2_3 * k9_6 - x7_4_3 * x9_3_3 * k9_6 - x7_2_1 * x10_1_1 * k10_6 - x7_3_1 * x10_2_1 * k10_6 - x7_4_1 * x10_3_1 * k10_6 - x7_2_2 * x10_1_2 * k10_6 - x7_3_2 * x10_2_2 * k10_6 - x7_4_2 * x10_3_2 * k10_6 - x7_2_3 * x10_1_3 * k10_6 - x7_3_3 * x10_2_3 * k10_6 - x7_4_3 * x10_3_3 * k10_6 - 0.5*x7_2_1 * x11_1_1 * k11_6 - 0.5*x7_3_1 * x11_2_1 * k11_6 - 0.5*x7_4_1 * x11_3_1 * k11_6 - 0.5*x7_2_2 * x11_1_2 * k11_6 - 0.5*x7_3_2 * x11_2_2 * k11_6 - 0.5*x7_4_2 * x11_3_2 * k11_6 - 0.5*x7_2_3 * x11_1_3 * k11_6 - 0.5*x7_3_3 * x11_2_3 * k11_6 - 0.5*x7_4_3 * x11_3_3 * k11_6 - x7_2_1 * x12_1_1 * k12_6 - x7_3_1 * x12_2_1 * k12_6 - x7_4_1 * x12_3_1 * k12_6 - x7_2_2 * x12_1_2 * k12_6 - x7_3_2 * x12_2_2 * k12_6 - x7_4_2 * x12_3_2 * k12_6 - x7_2_3 * x12_1_3 * k12_6 - x7_3_3 * x12_2_3 * k12_6 - x7_4_3 * x12_3_3 * k12_6 - x7_2_1 * x13_1_1 * k13_6 - x7_3_1 * x13_2_1 * k13_6 - x7_4_1 * x13_3_1 * k13_6 - x7_2_2 * x13_1_2 * k13_6 - x7_3_2 * x13_2_2 * k13_6 - x7_4_2 * x13_3_2 * k13_6 - x7_2_3 * x13_1_3 * k13_6 - x7_3_3 * x13_2_3 * k13_6 - x7_4_3 * x13_3_3 * k13_6 - 0.5*x7_2_1 * x14_1_1 * k14_6 - 0.5*x7_3_1 * x14_2_1 * k14_6 - 0.5*x7_4_1 * x14_3_1 * k14_6 - 0.5*x7_2_2 * x14_1_2 * k14_6 - 0.5*x7_3_2 * x14_2_2 * k14_6 - 0.5*x7_4_2 * x14_3_2 * k14_6 - 0.5*x7_2_3 * x14_1_3 * k14_6 - 0.5*x7_3_3 * x14_2_3 * k14_6 - 0.5*x7_4_3 * x14_3_3 * k14_6 + k7_1 - 1.2*x7_1_1 - 1.2*x7_1_2 - 1.2*x7_1_3=e= 0; plac8.. -0.5*x8_2_1 * x1_1_1 * k1_6 - 0.5*x8_3_1 * x1_2_1 * k1_6 - 0.5*x8_4_1 * x1_3_1 * k1_6 - 0.5*x8_2_2 * x1_1_2 * k1_6 - 0.5*x8_3_2 * x1_2_2 * k1_6 - 0.5*x8_4_2 * x1_3_2 * k1_6 - 0.5*x8_2_3 * x1_1_3 * k1_6 - 0.5*x8_3_3 * x1_2_3 * k1_6 - 0.5*x8_4_3 * x1_3_3 * k1_6 - x8_2_1 * x2_1_1 * k2_6 - x8_3_1 * x2_2_1 * k2_6 - x8_4_1 * x2_3_1 * k2_6 - x8_2_2 * x2_1_2 * k2_6 - x8_3_2 * x2_2_2 * k2_6 - x8_4_2 * x2_3_2 * k2_6 - x8_2_3 * x2_1_3 * k2_6 - x8_3_3 * x2_2_3 * k2_6 - x8_4_3 * x2_3_3 * k2_6 - x8_2_1 * x3_1_1 * k3_6 - x8_3_1 * x3_2_1 * k3_6 - x8_4_1 * x3_3_1 * k3_6 - x8_2_2 * x3_1_2 * k3_6 - x8_3_2 * x3_2_2 * k3_6 - x8_4_2 * x3_3_2 * k3_6 - x8_2_3 * x3_1_3 * k3_6 - x8_3_3 * x3_2_3 * k3_6 - x8_4_3 * x3_3_3 * k3_6 - x8_2_1 * x4_1_1 * k4_6 - x8_3_1 * x4_2_1 * k4_6 - x8_4_1 * x4_3_1 * k4_6 - x8_2_2 * x4_1_2 * k4_6 - x8_3_2 * x4_2_2 * k4_6 - x8_4_2 * x4_3_2 * k4_6 - x8_2_3 * x4_1_3 * k4_6 - x8_3_3 * x4_2_3 * k4_6 - x8_4_3 * x4_3_3 * k4_6 - x8_2_1 * x5_1_1 * k5_6 - x8_3_1 * x5_2_1 * k5_6 - x8_4_1 * x5_3_1 * k5_6 - x8_2_2 * x5_1_2 * k5_6 - x8_3_2 * x5_2_2 * k5_6 - x8_4_2 * x5_3_2 * k5_6 - x8_2_3 * x5_1_3 * k5_6 - x8_3_3 * x5_2_3 * k5_6 - x8_4_3 * x5_3_3 * k5_6 - x8_2_1 * x6_1_1 * k6_6 - x8_3_1 * x6_2_1 * k6_6 - x8_4_1 * x6_3_1 * k6_6 - x8_2_2 * x6_1_2 * k6_6 - x8_3_2 * x6_2_2 * k6_6 - x8_4_2 * x6_3_2 * k6_6 - x8_2_3 * x6_1_3 * k6_6 - x8_3_3 * x6_2_3 * k6_6 - x8_4_3 * x6_3_3 * k6_6 - 0.5*x8_2_1 * x7_1_1 * k7_6 - 0.5*x8_3_1 * x7_2_1 * k7_6 - 0.5*x8_4_1 * x7_3_1 * k7_6 - 0.5*x8_2_2 * x7_1_2 * k7_6 - 0.5*x8_3_2 * x7_2_2 * k7_6 - 0.5*x8_4_2 * x7_3_2 * k7_6 - 0.5*x8_2_3 * x7_1_3 * k7_6 - 0.5*x8_3_3 * x7_2_3 * k7_6 - 0.5*x8_4_3 * x7_3_3 * k7_6 - x8_2_1 * x8_1_1 * k8_6 - x8_3_1 * x8_2_1 * k8_6 - x8_4_1 * x8_3_1 * k8_6 - x8_2_2 * x8_1_2 * k8_6 - x8_3_2 * x8_2_2 * k8_6 - x8_4_2 * x8_3_2 * k8_6 - x8_2_3 * x8_1_3 * k8_6 - x8_3_3 * x8_2_3 * k8_6 - x8_4_3 * x8_3_3 * k8_6 - x8_2_1 * x9_1_1 * k9_6 - x8_3_1 * x9_2_1 * k9_6 - x8_4_1 * x9_3_1 * k9_6 - x8_2_2 * x9_1_2 * k9_6 - x8_3_2 * x9_2_2 * k9_6 - x8_4_2 * x9_3_2 * k9_6 - x8_2_3 * x9_1_3 * k9_6 - x8_3_3 * x9_2_3 * k9_6 - x8_4_3 * x9_3_3 * k9_6 - x8_2_1 * x10_1_1 * k10_6 - x8_3_1 * x10_2_1 * k10_6 - x8_4_1 * x10_3_1 * k10_6 - x8_2_2 * x10_1_2 * k10_6 - x8_3_2 * x10_2_2 * k10_6 - x8_4_2 * x10_3_2 * k10_6 - x8_2_3 * x10_1_3 * k10_6 - x8_3_3 * x10_2_3 * k10_6 - x8_4_3 * x10_3_3 * k10_6 - 0.5*x8_2_1 * x11_1_1 * k11_6 - 0.5*x8_3_1 * x11_2_1 * k11_6 - 0.5*x8_4_1 * x11_3_1 * k11_6 - 0.5*x8_2_2 * x11_1_2 * k11_6 - 0.5*x8_3_2 * x11_2_2 * k11_6 - 0.5*x8_4_2 * x11_3_2 * k11_6 - 0.5*x8_2_3 * x11_1_3 * k11_6 - 0.5*x8_3_3 * x11_2_3 * k11_6 - 0.5*x8_4_3 * x11_3_3 * k11_6 - x8_2_1 * x12_1_1 * k12_6 - x8_3_1 * x12_2_1 * k12_6 - x8_4_1 * x12_3_1 * k12_6 - x8_2_2 * x12_1_2 * k12_6 - x8_3_2 * x12_2_2 * k12_6 - x8_4_2 * x12_3_2 * k12_6 - x8_2_3 * x12_1_3 * k12_6 - x8_3_3 * x12_2_3 * k12_6 - x8_4_3 * x12_3_3 * k12_6 - x8_2_1 * x13_1_1 * k13_6 - x8_3_1 * x13_2_1 * k13_6 - x8_4_1 * x13_3_1 * k13_6 - x8_2_2 * x13_1_2 * k13_6 - x8_3_2 * x13_2_2 * k13_6 - x8_4_2 * x13_3_2 * k13_6 - x8_2_3 * x13_1_3 * k13_6 - x8_3_3 * x13_2_3 * k13_6 - x8_4_3 * x13_3_3 * k13_6 - 0.5*x8_2_1 * x14_1_1 * k14_6 - 0.5*x8_3_1 * x14_2_1 * k14_6 - 0.5*x8_4_1 * x14_3_1 * k14_6 - 0.5*x8_2_2 * x14_1_2 * k14_6 - 0.5*x8_3_2 * x14_2_2 * k14_6 - 0.5*x8_4_2 * x14_3_2 * k14_6 - 0.5*x8_2_3 * x14_1_3 * k14_6 - 0.5*x8_3_3 * x14_2_3 * k14_6 - 0.5*x8_4_3 * x14_3_3 * k14_6 + k8_1 - 1.2*x8_1_1 - 1.2*x8_1_2 - 1.2*x8_1_3=e= 0; plac9.. -0.5*x9_2_1 * x1_1_1 * k1_6 - 0.5*x9_3_1 * x1_2_1 * k1_6 - 0.5*x9_4_1 * x1_3_1 * k1_6 - 0.5*x9_2_2 * x1_1_2 * k1_6 - 0.5*x9_3_2 * x1_2_2 * k1_6 - 0.5*x9_4_2 * x1_3_2 * k1_6 - 0.5*x9_2_3 * x1_1_3 * k1_6 - 0.5*x9_3_3 * x1_2_3 * k1_6 - 0.5*x9_4_3 * x1_3_3 * k1_6 - x9_2_1 * x2_1_1 * k2_6 - x9_3_1 * x2_2_1 * k2_6 - x9_4_1 * x2_3_1 * k2_6 - x9_2_2 * x2_1_2 * k2_6 - x9_3_2 * x2_2_2 * k2_6 - x9_4_2 * x2_3_2 * k2_6 - x9_2_3 * x2_1_3 * k2_6 - x9_3_3 * x2_2_3 * k2_6 - x9_4_3 * x2_3_3 * k2_6 - x9_2_1 * x3_1_1 * k3_6 - x9_3_1 * x3_2_1 * k3_6 - x9_4_1 * x3_3_1 * k3_6 - x9_2_2 * x3_1_2 * k3_6 - x9_3_2 * x3_2_2 * k3_6 - x9_4_2 * x3_3_2 * k3_6 - x9_2_3 * x3_1_3 * k3_6 - x9_3_3 * x3_2_3 * k3_6 - x9_4_3 * x3_3_3 * k3_6 - x9_2_1 * x4_1_1 * k4_6 - x9_3_1 * x4_2_1 * k4_6 - x9_4_1 * x4_3_1 * k4_6 - x9_2_2 * x4_1_2 * k4_6 - x9_3_2 * x4_2_2 * k4_6 - x9_4_2 * x4_3_2 * k4_6 - x9_2_3 * x4_1_3 * k4_6 - x9_3_3 * x4_2_3 * k4_6 - x9_4_3 * x4_3_3 * k4_6 - x9_2_1 * x5_1_1 * k5_6 - x9_3_1 * x5_2_1 * k5_6 - x9_4_1 * x5_3_1 * k5_6 - x9_2_2 * x5_1_2 * k5_6 - x9_3_2 * x5_2_2 * k5_6 - x9_4_2 * x5_3_2 * k5_6 - x9_2_3 * x5_1_3 * k5_6 - x9_3_3 * x5_2_3 * k5_6 - x9_4_3 * x5_3_3 * k5_6 - x9_2_1 * x6_1_1 * k6_6 - x9_3_1 * x6_2_1 * k6_6 - x9_4_1 * x6_3_1 * k6_6 - x9_2_2 * x6_1_2 * k6_6 - x9_3_2 * x6_2_2 * k6_6 - x9_4_2 * x6_3_2 * k6_6 - x9_2_3 * x6_1_3 * k6_6 - x9_3_3 * x6_2_3 * k6_6 - x9_4_3 * x6_3_3 * k6_6 - 0.5*x9_2_1 * x7_1_1 * k7_6 - 0.5*x9_3_1 * x7_2_1 * k7_6 - 0.5*x9_4_1 * x7_3_1 * k7_6 - 0.5*x9_2_2 * x7_1_2 * k7_6 - 0.5*x9_3_2 * x7_2_2 * k7_6 - 0.5*x9_4_2 * x7_3_2 * k7_6 - 0.5*x9_2_3 * x7_1_3 * k7_6 - 0.5*x9_3_3 * x7_2_3 * k7_6 - 0.5*x9_4_3 * x7_3_3 * k7_6 - x9_2_1 * x8_1_1 * k8_6 - x9_3_1 * x8_2_1 * k8_6 - x9_4_1 * x8_3_1 * k8_6 - x9_2_2 * x8_1_2 * k8_6 - x9_3_2 * x8_2_2 * k8_6 - x9_4_2 * x8_3_2 * k8_6 - x9_2_3 * x8_1_3 * k8_6 - x9_3_3 * x8_2_3 * k8_6 - x9_4_3 * x8_3_3 * k8_6 - x9_2_1 * x9_1_1 * k9_6 - x9_3_1 * x9_2_1 * k9_6 - x9_4_1 * x9_3_1 * k9_6 - x9_2_2 * x9_1_2 * k9_6 - x9_3_2 * x9_2_2 * k9_6 - x9_4_2 * x9_3_2 * k9_6 - x9_2_3 * x9_1_3 * k9_6 - x9_3_3 * x9_2_3 * k9_6 - x9_4_3 * x9_3_3 * k9_6 - x9_2_1 * x10_1_1 * k10_6 - x9_3_1 * x10_2_1 * k10_6 - x9_4_1 * x10_3_1 * k10_6 - x9_2_2 * x10_1_2 * k10_6 - x9_3_2 * x10_2_2 * k10_6 - x9_4_2 * x10_3_2 * k10_6 - x9_2_3 * x10_1_3 * k10_6 - x9_3_3 * x10_2_3 * k10_6 - x9_4_3 * x10_3_3 * k10_6 - 0.5*x9_2_1 * x11_1_1 * k11_6 - 0.5*x9_3_1 * x11_2_1 * k11_6 - 0.5*x9_4_1 * x11_3_1 * k11_6 - 0.5*x9_2_2 * x11_1_2 * k11_6 - 0.5*x9_3_2 * x11_2_2 * k11_6 - 0.5*x9_4_2 * x11_3_2 * k11_6 - 0.5*x9_2_3 * x11_1_3 * k11_6 - 0.5*x9_3_3 * x11_2_3 * k11_6 - 0.5*x9_4_3 * x11_3_3 * k11_6 - x9_2_1 * x12_1_1 * k12_6 - x9_3_1 * x12_2_1 * k12_6 - x9_4_1 * x12_3_1 * k12_6 - x9_2_2 * x12_1_2 * k12_6 - x9_3_2 * x12_2_2 * k12_6 - x9_4_2 * x12_3_2 * k12_6 - x9_2_3 * x12_1_3 * k12_6 - x9_3_3 * x12_2_3 * k12_6 - x9_4_3 * x12_3_3 * k12_6 - x9_2_1 * x13_1_1 * k13_6 - x9_3_1 * x13_2_1 * k13_6 - x9_4_1 * x13_3_1 * k13_6 - x9_2_2 * x13_1_2 * k13_6 - x9_3_2 * x13_2_2 * k13_6 - x9_4_2 * x13_3_2 * k13_6 - x9_2_3 * x13_1_3 * k13_6 - x9_3_3 * x13_2_3 * k13_6 - x9_4_3 * x13_3_3 * k13_6 - 0.5*x9_2_1 * x14_1_1 * k14_6 - 0.5*x9_3_1 * x14_2_1 * k14_6 - 0.5*x9_4_1 * x14_3_1 * k14_6 - 0.5*x9_2_2 * x14_1_2 * k14_6 - 0.5*x9_3_2 * x14_2_2 * k14_6 - 0.5*x9_4_2 * x14_3_2 * k14_6 - 0.5*x9_2_3 * x14_1_3 * k14_6 - 0.5*x9_3_3 * x14_2_3 * k14_6 - 0.5*x9_4_3 * x14_3_3 * k14_6 + k9_1 - 1.2*x9_1_1 - 1.2*x9_1_2 - 1.2*x9_1_3=e= 0; plac10.. -0.5*x10_2_1 * x1_1_1 * k1_6 - 0.5*x10_3_1 * x1_2_1 * k1_6 - 0.5*x10_4_1 * x1_3_1 * k1_6 - 0.5*x10_2_2 * x1_1_2 * k1_6 - 0.5*x10_3_2 * x1_2_2 * k1_6 - 0.5*x10_4_2 * x1_3_2 * k1_6 - 0.5*x10_2_3 * x1_1_3 * k1_6 - 0.5*x10_3_3 * x1_2_3 * k1_6 - 0.5*x10_4_3 * x1_3_3 * k1_6 - x10_2_1 * x2_1_1 * k2_6 - x10_3_1 * x2_2_1 * k2_6 - x10_4_1 * x2_3_1 * k2_6 - x10_2_2 * x2_1_2 * k2_6 - x10_3_2 * x2_2_2 * k2_6 - x10_4_2 * x2_3_2 * k2_6 - x10_2_3 * x2_1_3 * k2_6 - x10_3_3 * x2_2_3 * k2_6 - x10_4_3 * x2_3_3 * k2_6 - x10_2_1 * x3_1_1 * k3_6 - x10_3_1 * x3_2_1 * k3_6 - x10_4_1 * x3_3_1 * k3_6 - x10_2_2 * x3_1_2 * k3_6 - x10_3_2 * x3_2_2 * k3_6 - x10_4_2 * x3_3_2 * k3_6 - x10_2_3 * x3_1_3 * k3_6 - x10_3_3 * x3_2_3 * k3_6 - x10_4_3 * x3_3_3 * k3_6 - x10_2_1 * x4_1_1 * k4_6 - x10_3_1 * x4_2_1 * k4_6 - x10_4_1 * x4_3_1 * k4_6 - x10_2_2 * x4_1_2 * k4_6 - x10_3_2 * x4_2_2 * k4_6 - x10_4_2 * x4_3_2 * k4_6 - x10_2_3 * x4_1_3 * k4_6 - x10_3_3 * x4_2_3 * k4_6 - x10_4_3 * x4_3_3 * k4_6 - x10_2_1 * x5_1_1 * k5_6 - x10_3_1 * x5_2_1 * k5_6 - x10_4_1 * x5_3_1 * k5_6 - x10_2_2 * x5_1_2 * k5_6 - x10_3_2 * x5_2_2 * k5_6 - x10_4_2 * x5_3_2 * k5_6 - x10_2_3 * x5_1_3 * k5_6 - x10_3_3 * x5_2_3 * k5_6 - x10_4_3 * x5_3_3 * k5_6 - x10_2_1 * x6_1_1 * k6_6 - x10_3_1 * x6_2_1 * k6_6 - x10_4_1 * x6_3_1 * k6_6 - x10_2_2 * x6_1_2 * k6_6 - x10_3_2 * x6_2_2 * k6_6 - x10_4_2 * x6_3_2 * k6_6 - x10_2_3 * x6_1_3 * k6_6 - x10_3_3 * x6_2_3 * k6_6 - x10_4_3 * x6_3_3 * k6_6 - 0.5*x10_2_1 * x7_1_1 * k7_6 - 0.5*x10_3_1 * x7_2_1 * k7_6 - 0.5*x10_4_1 * x7_3_1 * k7_6 - 0.5*x10_2_2 * x7_1_2 * k7_6 - 0.5*x10_3_2 * x7_2_2 * k7_6 - 0.5*x10_4_2 * x7_3_2 * k7_6 - 0.5*x10_2_3 * x7_1_3 * k7_6 - 0.5*x10_3_3 * x7_2_3 * k7_6 - 0.5*x10_4_3 * x7_3_3 * k7_6 - x10_2_1 * x8_1_1 * k8_6 - x10_3_1 * x8_2_1 * k8_6 - x10_4_1 * x8_3_1 * k8_6 - x10_2_2 * x8_1_2 * k8_6 - x10_3_2 * x8_2_2 * k8_6 - x10_4_2 * x8_3_2 * k8_6 - x10_2_3 * x8_1_3 * k8_6 - x10_3_3 * x8_2_3 * k8_6 - x10_4_3 * x8_3_3 * k8_6 - x10_2_1 * x9_1_1 * k9_6 - x10_3_1 * x9_2_1 * k9_6 - x10_4_1 * x9_3_1 * k9_6 - x10_2_2 * x9_1_2 * k9_6 - x10_3_2 * x9_2_2 * k9_6 - x10_4_2 * x9_3_2 * k9_6 - x10_2_3 * x9_1_3 * k9_6 - x10_3_3 * x9_2_3 * k9_6 - x10_4_3 * x9_3_3 * k9_6 - x10_2_1 * x10_1_1 * k10_6 - x10_3_1 * x10_2_1 * k10_6 - x10_4_1 * x10_3_1 * k10_6 - x10_2_2 * x10_1_2 * k10_6 - x10_3_2 * x10_2_2 * k10_6 - x10_4_2 * x10_3_2 * k10_6 - x10_2_3 * x10_1_3 * k10_6 - x10_3_3 * x10_2_3 * k10_6 - x10_4_3 * x10_3_3 * k10_6 - 0.5*x10_2_1 * x11_1_1 * k11_6 - 0.5*x10_3_1 * x11_2_1 * k11_6 - 0.5*x10_4_1 * x11_3_1 * k11_6 - 0.5*x10_2_2 * x11_1_2 * k11_6 - 0.5*x10_3_2 * x11_2_2 * k11_6 - 0.5*x10_4_2 * x11_3_2 * k11_6 - 0.5*x10_2_3 * x11_1_3 * k11_6 - 0.5*x10_3_3 * x11_2_3 * k11_6 - 0.5*x10_4_3 * x11_3_3 * k11_6 - x10_2_1 * x12_1_1 * k12_6 - x10_3_1 * x12_2_1 * k12_6 - x10_4_1 * x12_3_1 * k12_6 - x10_2_2 * x12_1_2 * k12_6 - x10_3_2 * x12_2_2 * k12_6 - x10_4_2 * x12_3_2 * k12_6 - x10_2_3 * x12_1_3 * k12_6 - x10_3_3 * x12_2_3 * k12_6 - x10_4_3 * x12_3_3 * k12_6 - x10_2_1 * x13_1_1 * k13_6 - x10_3_1 * x13_2_1 * k13_6 - x10_4_1 * x13_3_1 * k13_6 - x10_2_2 * x13_1_2 * k13_6 - x10_3_2 * x13_2_2 * k13_6 - x10_4_2 * x13_3_2 * k13_6 - x10_2_3 * x13_1_3 * k13_6 - x10_3_3 * x13_2_3 * k13_6 - x10_4_3 * x13_3_3 * k13_6 - 0.5*x10_2_1 * x14_1_1 * k14_6 - 0.5*x10_3_1 * x14_2_1 * k14_6 - 0.5*x10_4_1 * x14_3_1 * k14_6 - 0.5*x10_2_2 * x14_1_2 * k14_6 - 0.5*x10_3_2 * x14_2_2 * k14_6 - 0.5*x10_4_2 * x14_3_2 * k14_6 - 0.5*x10_2_3 * x14_1_3 * k14_6 - 0.5*x10_3_3 * x14_2_3 * k14_6 - 0.5*x10_4_3 * x14_3_3 * k14_6 + k10_1 - 1.2*x10_1_1 - 1.2*x10_1_2 - 1.2*x10_1_3 =e=0; plac11.. -0.5*x11_2_1 * x1_1_1 * k1_6 - 0.5*x11_3_1 * x1_2_1 * k1_6 - 0.5*x11_4_1 * x1_3_1 * k1_6 - 0.5*x11_2_2 * x1_1_2 * k1_6 - 0.5*x11_3_2 * x1_2_2 * k1_6 - 0.5*x11_4_2 * x1_3_2 * k1_6 - 0.5*x11_2_3 * x1_1_3 * k1_6 - 0.5*x11_3_3 * x1_2_3 * k1_6 - 0.5*x11_4_3 * x1_3_3 * k1_6 - x11_2_1 * x2_1_1 * k2_6 - x11_3_1 * x2_2_1 * k2_6 - x11_4_1 * x2_3_1 * k2_6 - x11_2_2 * x2_1_2 * k2_6 - x11_3_2 * x2_2_2 * k2_6 - x11_4_2 * x2_3_2 * k2_6 - x11_2_3 * x2_1_3 * k2_6 - x11_3_3 * x2_2_3 * k2_6 - x11_4_3 * x2_3_3 * k2_6 - x11_2_1 * x3_1_1 * k3_6 - x11_3_1 * x3_2_1 * k3_6 - x11_4_1 * x3_3_1 * k3_6 - x11_2_2 * x3_1_2 * k3_6 - x11_3_2 * x3_2_2 * k3_6 - x11_4_2 * x3_3_2 * k3_6 - x11_2_3 * x3_1_3 * k3_6 - x11_3_3 * x3_2_3 * k3_6 - x11_4_3 * x3_3_3 * k3_6 - x11_2_1 * x4_1_1 * k4_6 - x11_3_1 * x4_2_1 * k4_6 - x11_4_1 * x4_3_1 * k4_6 - x11_2_2 * x4_1_2 * k4_6 - x11_3_2 * x4_2_2 * k4_6 - x11_4_2 * x4_3_2 * k4_6 - x11_2_3 * x4_1_3 * k4_6 - x11_3_3 * x4_2_3 * k4_6 - x11_4_3 * x4_3_3 * k4_6 - x11_2_1 * x5_1_1 * k5_6 - x11_3_1 * x5_2_1 * k5_6 - x11_4_1 * x5_3_1 * k5_6 - x11_2_2 * x5_1_2 * k5_6 - x11_3_2 * x5_2_2 * k5_6 - x11_4_2 * x5_3_2 * k5_6 - x11_2_3 * x5_1_3 * k5_6 - x11_3_3 * x5_2_3 * k5_6 - x11_4_3 * x5_3_3 * k5_6 - x11_2_1 * x6_1_1 * k6_6 - x11_3_1 * x6_2_1 * k6_6 - x11_4_1 * x6_3_1 * k6_6 - x11_2_2 * x6_1_2 * k6_6 - x11_3_2 * x6_2_2 * k6_6 - x11_4_2 * x6_3_2 * k6_6 - x11_2_3 * x6_1_3 * k6_6 - x11_3_3 * x6_2_3 * k6_6 - x11_4_3 * x6_3_3 * k6_6 - 0.5*x11_2_1 * x7_1_1 * k7_6 - 0.5*x11_3_1 * x7_2_1 * k7_6 - 0.5*x11_4_1 * x7_3_1 * k7_6 - 0.5*x11_2_2 * x7_1_2 * k7_6 - 0.5*x11_3_2 * x7_2_2 * k7_6 - 0.5*x11_4_2 * x7_3_2 * k7_6 - 0.5*x11_2_3 * x7_1_3 * k7_6 - 0.5*x11_3_3 * x7_2_3 * k7_6 - 0.5*x11_4_3 * x7_3_3 * k7_6 - x11_2_1 * x8_1_1 * k8_6 - x11_3_1 * x8_2_1 * k8_6 - x11_4_1 * x8_3_1 * k8_6 - x11_2_2 * x8_1_2 * k8_6 - x11_3_2 * x8_2_2 * k8_6 - x11_4_2 * x8_3_2 * k8_6 - x11_2_3 * x8_1_3 * k8_6 - x11_3_3 * x8_2_3 * k8_6 - x11_4_3 * x8_3_3 * k8_6 - x11_2_1 * x9_1_1 * k9_6 - x11_3_1 * x9_2_1 * k9_6 - x11_4_1 * x9_3_1 * k9_6 - x11_2_2 * x9_1_2 * k9_6 - x11_3_2 * x9_2_2 * k9_6 - x11_4_2 * x9_3_2 * k9_6 - x11_2_3 * x9_1_3 * k9_6 - x11_3_3 * x9_2_3 * k9_6 - x11_4_3 * x9_3_3 * k9_6 - x11_2_1 * x10_1_1 * k10_6 - x11_3_1 * x10_2_1 * k10_6 - x11_4_1 * x10_3_1 * k10_6 - x11_2_2 * x10_1_2 * k10_6 - x11_3_2 * x10_2_2 * k10_6 - x11_4_2 * x10_3_2 * k10_6 - x11_2_3 * x10_1_3 * k10_6 - x11_3_3 * x10_2_3 * k10_6 - x11_4_3 * x10_3_3 * k10_6 - 0.5*x11_2_1 * x11_1_1 * k11_6 - 0.5*x11_3_1 * x11_2_1 * k11_6 - 0.5*x11_4_1 * x11_3_1 * k11_6 - 0.5*x11_2_2 * x11_1_2 * k11_6 - 0.5*x11_3_2 * x11_2_2 * k11_6 - 0.5*x11_4_2 * x11_3_2 * k11_6 - 0.5*x11_2_3 * x11_1_3 * k11_6 - 0.5*x11_3_3 * x11_2_3 * k11_6 - 0.5*x11_4_3 * x11_3_3 * k11_6 - x11_2_1 * x12_1_1 * k12_6 - x11_3_1 * x12_2_1 * k12_6 - x11_4_1 * x12_3_1 * k12_6 - x11_2_2 * x12_1_2 * k12_6 - x11_3_2 * x12_2_2 * k12_6 - x11_4_2 * x12_3_2 * k12_6 - x11_2_3 * x12_1_3 * k12_6 - x11_3_3 * x12_2_3 * k12_6 - x11_4_3 * x12_3_3 * k12_6 - x11_2_1 * x13_1_1 * k13_6 - x11_3_1 * x13_2_1 * k13_6 - x11_4_1 * x13_3_1 * k13_6 - x11_2_2 * x13_1_2 * k13_6 - x11_3_2 * x13_2_2 * k13_6 - x11_4_2 * x13_3_2 * k13_6 - x11_2_3 * x13_1_3 * k13_6 - x11_3_3 * x13_2_3 * k13_6 - x11_4_3 * x13_3_3 * k13_6 - 0.5*x11_2_1 * x14_1_1 * k14_6 - 0.5*x11_3_1 * x14_2_1 * k14_6 - 0.5*x11_4_1 * x14_3_1 * k14_6 - 0.5*x11_2_2 * x14_1_2 * k14_6 - 0.5*x11_3_2 * x14_2_2 * k14_6 - 0.5*x11_4_2 * x14_3_2 * k14_6 - 0.5*x11_2_3 * x14_1_3 * k14_6 - 0.5*x11_3_3 * x14_2_3 * k14_6 - 0.5*x11_4_3 * x14_3_3 * k14_6 + k11_1 - 1.2*x11_1_1 - 1.2*x11_1_2 - 1.2*x11_1_3 =e=0; plac12.. -0.5*x12_2_1 * x1_1_1 * k1_6 - 0.5*x12_3_1 * x1_2_1 * k1_6 - 0.5*x12_4_1 * x1_3_1 * k1_6 - 0.5*x12_2_2 * x1_1_2 * k1_6 - 0.5*x12_3_2 * x1_2_2 * k1_6 - 0.5*x12_4_2 * x1_3_2 * k1_6 - 0.5*x12_2_3 * x1_1_3 * k1_6 - 0.5*x12_3_3 * x1_2_3 * k1_6 - 0.5*x12_4_3 * x1_3_3 * k1_6 - x12_2_1 * x2_1_1 * k2_6 - x12_3_1 * x2_2_1 * k2_6 - x12_4_1 * x2_3_1 * k2_6 - x12_2_2 * x2_1_2 * k2_6 - x12_3_2 * x2_2_2 * k2_6 - x12_4_2 * x2_3_2 * k2_6 - x12_2_3 * x2_1_3 * k2_6 - x12_3_3 * x2_2_3 * k2_6 - x12_4_3 * x2_3_3 * k2_6 - x12_2_1 * x3_1_1 * k3_6 - x12_3_1 * x3_2_1 * k3_6 - x12_4_1 * x3_3_1 * k3_6 - x12_2_2 * x3_1_2 * k3_6 - x12_3_2 * x3_2_2 * k3_6 - x12_4_2 * x3_3_2 * k3_6 - x12_2_3 * x3_1_3 * k3_6 - x12_3_3 * x3_2_3 * k3_6 - x12_4_3 * x3_3_3 * k3_6 - x12_2_1 * x4_1_1 * k4_6 - x12_3_1 * x4_2_1 * k4_6 - x12_4_1 * x4_3_1 * k4_6 - x12_2_2 * x4_1_2 * k4_6 - x12_3_2 * x4_2_2 * k4_6 - x12_4_2 * x4_3_2 * k4_6 - x12_2_3 * x4_1_3 * k4_6 - x12_3_3 * x4_2_3 * k4_6 - x12_4_3 * x4_3_3 * k4_6 - x12_2_1 * x5_1_1 * k5_6 - x12_3_1 * x5_2_1 * k5_6 - x12_4_1 * x5_3_1 * k5_6 - x12_2_2 * x5_1_2 * k5_6 - x12_3_2 * x5_2_2 * k5_6 - x12_4_2 * x5_3_2 * k5_6 - x12_2_3 * x5_1_3 * k5_6 - x12_3_3 * x5_2_3 * k5_6 - x12_4_3 * x5_3_3 * k5_6 - x12_2_1 * x6_1_1 * k6_6 - x12_3_1 * x6_2_1 * k6_6 - x12_4_1 * x6_3_1 * k6_6 - x12_2_2 * x6_1_2 * k6_6 - x12_3_2 * x6_2_2 * k6_6 - x12_4_2 * x6_3_2 * k6_6 - x12_2_3 * x6_1_3 * k6_6 - x12_3_3 * x6_2_3 * k6_6 - x12_4_3 * x6_3_3 * k6_6 - 0.5*x12_2_1 * x7_1_1 * k7_6 - 0.5*x12_3_1 * x7_2_1 * k7_6 - 0.5*x12_4_1 * x7_3_1 * k7_6 - 0.5*x12_2_2 * x7_1_2 * k7_6 - 0.5*x12_3_2 * x7_2_2 * k7_6 - 0.5*x12_4_2 * x7_3_2 * k7_6 - 0.5*x12_2_3 * x7_1_3 * k7_6 - 0.5*x12_3_3 * x7_2_3 * k7_6 - 0.5*x12_4_3 * x7_3_3 * k7_6 - x12_2_1 * x8_1_1 * k8_6 - x12_3_1 * x8_2_1 * k8_6 - x12_4_1 * x8_3_1 * k8_6 - x12_2_2 * x8_1_2 * k8_6 - x12_3_2 * x8_2_2 * k8_6 - x12_4_2 * x8_3_2 * k8_6 - x12_2_3 * x8_1_3 * k8_6 - x12_3_3 * x8_2_3 * k8_6 - x12_4_3 * x8_3_3 * k8_6 - x12_2_1 * x9_1_1 * k9_6 - x12_3_1 * x9_2_1 * k9_6 - x12_4_1 * x9_3_1 * k9_6 - x12_2_2 * x9_1_2 * k9_6 - x12_3_2 * x9_2_2 * k9_6 - x12_4_2 * x9_3_2 * k9_6 - x12_2_3 * x9_1_3 * k9_6 - x12_3_3 * x9_2_3 * k9_6 - x12_4_3 * x9_3_3 * k9_6 - x12_2_1 * x10_1_1 * k10_6 - x12_3_1 * x10_2_1 * k10_6 - x12_4_1 * x10_3_1 * k10_6 - x12_2_2 * x10_1_2 * k10_6 - x12_3_2 * x10_2_2 * k10_6 - x12_4_2 * x10_3_2 * k10_6 - x12_2_3 * x10_1_3 * k10_6 - x12_3_3 * x10_2_3 * k10_6 - x12_4_3 * x10_3_3 * k10_6 - 0.5*x12_2_1 * x11_1_1 * k11_6 - 0.5*x12_3_1 * x11_2_1 * k11_6 - 0.5*x12_4_1 * x11_3_1 * k11_6 - 0.5*x12_2_2 * x11_1_2 * k11_6 - 0.5*x12_3_2 * x11_2_2 * k11_6 - 0.5*x12_4_2 * x11_3_2 * k11_6 - 0.5*x12_2_3 * x11_1_3 * k11_6 - 0.5*x12_3_3 * x11_2_3 * k11_6 - 0.5*x12_4_3 * x11_3_3 * k11_6 - x12_2_1 * x12_1_1 * k12_6 - x12_3_1 * x12_2_1 * k12_6 - x12_4_1 * x12_3_1 * k12_6 - x12_2_2 * x12_1_2 * k12_6 - x12_3_2 * x12_2_2 * k12_6 - x12_4_2 * x12_3_2 * k12_6 - x12_2_3 * x12_1_3 * k12_6 - x12_3_3 * x12_2_3 * k12_6 - x12_4_3 * x12_3_3 * k12_6 - x12_2_1 * x13_1_1 * k13_6 - x12_3_1 * x13_2_1 * k13_6 - x12_4_1 * x13_3_1 * k13_6 - x12_2_2 * x13_1_2 * k13_6 - x12_3_2 * x13_2_2 * k13_6 - x12_4_2 * x13_3_2 * k13_6 - x12_2_3 * x13_1_3 * k13_6 - x12_3_3 * x13_2_3 * k13_6 - x12_4_3 * x13_3_3 * k13_6 - 0.5*x12_2_1 * x14_1_1 * k14_6 - 0.5*x12_3_1 * x14_2_1 * k14_6 - 0.5*x12_4_1 * x14_3_1 * k14_6 - 0.5*x12_2_2 * x14_1_2 * k14_6 - 0.5*x12_3_2 * x14_2_2 * k14_6 - 0.5*x12_4_2 * x14_3_2 * k14_6 - 0.5*x12_2_3 * x14_1_3 * k14_6 - 0.5*x12_3_3 * x14_2_3 * k14_6 - 0.5*x12_4_3 * x14_3_3 * k14_6 + k12_1 - 1.2*x12_1_1 - 1.2*x12_1_2 - 1.2*x12_1_3 =e=0; plac13.. -0.5*x13_2_1 * x1_1_1 * k1_6 - 0.5*x13_3_1 * x1_2_1 * k1_6 - 0.5*x13_4_1 * x1_3_1 * k1_6 - 0.5*x13_2_2 * x1_1_2 * k1_6 - 0.5*x13_3_2 * x1_2_2 * k1_6 - 0.5*x13_4_2 * x1_3_2 * k1_6 - 0.5*x13_2_3 * x1_1_3 * k1_6 - 0.5*x13_3_3 * x1_2_3 * k1_6 - 0.5*x13_4_3 * x1_3_3 * k1_6 - x13_2_1 * x2_1_1 * k2_6 - x13_3_1 * x2_2_1 * k2_6 - x13_4_1 * x2_3_1 * k2_6 - x13_2_2 * x2_1_2 * k2_6 - x13_3_2 * x2_2_2 * k2_6 - x13_4_2 * x2_3_2 * k2_6 - x13_2_3 * x2_1_3 * k2_6 - x13_3_3 * x2_2_3 * k2_6 - x13_4_3 * x2_3_3 * k2_6 - x13_2_1 * x3_1_1 * k3_6 - x13_3_1 * x3_2_1 * k3_6 - x13_4_1 * x3_3_1 * k3_6 - x13_2_2 * x3_1_2 * k3_6 - x13_3_2 * x3_2_2 * k3_6 - x13_4_2 * x3_3_2 * k3_6 - x13_2_3 * x3_1_3 * k3_6 - x13_3_3 * x3_2_3 * k3_6 - x13_4_3 * x3_3_3 * k3_6 - x13_2_1 * x4_1_1 * k4_6 - x13_3_1 * x4_2_1 * k4_6 - x13_4_1 * x4_3_1 * k4_6 - x13_2_2 * x4_1_2 * k4_6 - x13_3_2 * x4_2_2 * k4_6 - x13_4_2 * x4_3_2 * k4_6 - x13_2_3 * x4_1_3 * k4_6 - x13_3_3 * x4_2_3 * k4_6 - x13_4_3 * x4_3_3 * k4_6 - x13_2_1 * x5_1_1 * k5_6 - x13_3_1 * x5_2_1 * k5_6 - x13_4_1 * x5_3_1 * k5_6 - x13_2_2 * x5_1_2 * k5_6 - x13_3_2 * x5_2_2 * k5_6 - x13_4_2 * x5_3_2 * k5_6 - x13_2_3 * x5_1_3 * k5_6 - x13_3_3 * x5_2_3 * k5_6 - x13_4_3 * x5_3_3 * k5_6 - x13_2_1 * x6_1_1 * k6_6 - x13_3_1 * x6_2_1 * k6_6 - x13_4_1 * x6_3_1 * k6_6 - x13_2_2 * x6_1_2 * k6_6 - x13_3_2 * x6_2_2 * k6_6 - x13_4_2 * x6_3_2 * k6_6 - x13_2_3 * x6_1_3 * k6_6 - x13_3_3 * x6_2_3 * k6_6 - x13_4_3 * x6_3_3 * k6_6 - 0.5*x13_2_1 * x7_1_1 * k7_6 - 0.5*x13_3_1 * x7_2_1 * k7_6 - 0.5*x13_4_1 * x7_3_1 * k7_6 - 0.5*x13_2_2 * x7_1_2 * k7_6 - 0.5*x13_3_2 * x7_2_2 * k7_6 - 0.5*x13_4_2 * x7_3_2 * k7_6 - 0.5*x13_2_3 * x7_1_3 * k7_6 - 0.5*x13_3_3 * x7_2_3 * k7_6 - 0.5*x13_4_3 * x7_3_3 * k7_6 - x13_2_1 * x8_1_1 * k8_6 - x13_3_1 * x8_2_1 * k8_6 - x13_4_1 * x8_3_1 * k8_6 - x13_2_2 * x8_1_2 * k8_6 - x13_3_2 * x8_2_2 * k8_6 - x13_4_2 * x8_3_2 * k8_6 - x13_2_3 * x8_1_3 * k8_6 - x13_3_3 * x8_2_3 * k8_6 - x13_4_3 * x8_3_3 * k8_6 - x13_2_1 * x9_1_1 * k9_6 - x13_3_1 * x9_2_1 * k9_6 - x13_4_1 * x9_3_1 * k9_6 - x13_2_2 * x9_1_2 * k9_6 - x13_3_2 * x9_2_2 * k9_6 - x13_4_2 * x9_3_2 * k9_6 - x13_2_3 * x9_1_3 * k9_6 - x13_3_3 * x9_2_3 * k9_6 - x13_4_3 * x9_3_3 * k9_6 - x13_2_1 * x10_1_1 * k10_6 - x13_3_1 * x10_2_1 * k10_6 - x13_4_1 * x10_3_1 * k10_6 - x13_2_2 * x10_1_2 * k10_6 - x13_3_2 * x10_2_2 * k10_6 - x13_4_2 * x10_3_2 * k10_6 - x13_2_3 * x10_1_3 * k10_6 - x13_3_3 * x10_2_3 * k10_6 - x13_4_3 * x10_3_3 * k10_6 - 0.5*x13_2_1 * x11_1_1 * k11_6 - 0.5*x13_3_1 * x11_2_1 * k11_6 - 0.5*x13_4_1 * x11_3_1 * k11_6 - 0.5*x13_2_2 * x11_1_2 * k11_6 - 0.5*x13_3_2 * x11_2_2 * k11_6 - 0.5*x13_4_2 * x11_3_2 * k11_6 - 0.5*x13_2_3 * x11_1_3 * k11_6 - 0.5*x13_3_3 * x11_2_3 * k11_6 - 0.5*x13_4_3 * x11_3_3 * k11_6 - x13_2_1 * x12_1_1 * k12_6 - x13_3_1 * x12_2_1 * k12_6 - x13_4_1 * x12_3_1 * k12_6 - x13_2_2 * x12_1_2 * k12_6 - x13_3_2 * x12_2_2 * k12_6 - x13_4_2 * x12_3_2 * k12_6 - x13_2_3 * x12_1_3 * k12_6 - x13_3_3 * x12_2_3 * k12_6 - x13_4_3 * x12_3_3 * k12_6 - x13_2_1 * x13_1_1 * k13_6 - x13_3_1 * x13_2_1 * k13_6 - x13_4_1 * x13_3_1 * k13_6 - x13_2_2 * x13_1_2 * k13_6 - x13_3_2 * x13_2_2 * k13_6 - x13_4_2 * x13_3_2 * k13_6 - x13_2_3 * x13_1_3 * k13_6 - x13_3_3 * x13_2_3 * k13_6 - x13_4_3 * x13_3_3 * k13_6 - 0.5*x13_2_1 * x14_1_1 * k14_6 - 0.5*x13_3_1 * x14_2_1 * k14_6 - 0.5*x13_4_1 * x14_3_1 * k14_6 - 0.5*x13_2_2 * x14_1_2 * k14_6 - 0.5*x13_3_2 * x14_2_2 * k14_6 - 0.5*x13_4_2 * x14_3_2 * k14_6 - 0.5*x13_2_3 * x14_1_3 * k14_6 - 0.5*x13_3_3 * x14_2_3 * k14_6 - 0.5*x13_4_3 * x14_3_3 * k14_6 + k13_1 - 1.2*x13_1_1 - 1.2*x13_1_2 - 1.2*x13_1_3 =e=0; plac14.. -0.5*x14_2_1 * x1_1_1 * k1_6 - 0.5*x14_3_1 * x1_2_1 * k1_6 - 0.5*x14_4_1 * x1_3_1 * k1_6 - 0.5*x14_2_2 * x1_1_2 * k1_6 - 0.5*x14_3_2 * x1_2_2 * k1_6 - 0.5*x14_4_2 * x1_3_2 * k1_6 - 0.5*x14_2_3 * x1_1_3 * k1_6 - 0.5*x14_3_3 * x1_2_3 * k1_6 - 0.5*x14_4_3 * x1_3_3 * k1_6 - x14_2_1 * x2_1_1 * k2_6 - x14_3_1 * x2_2_1 * k2_6 - x14_4_1 * x2_3_1 * k2_6 - x14_2_2 * x2_1_2 * k2_6 - x14_3_2 * x2_2_2 * k2_6 - x14_4_2 * x2_3_2 * k2_6 - x14_2_3 * x2_1_3 * k2_6 - x14_3_3 * x2_2_3 * k2_6 - x14_4_3 * x2_3_3 * k2_6 - x14_2_1 * x3_1_1 * k3_6 - x14_3_1 * x3_2_1 * k3_6 - x14_4_1 * x3_3_1 * k3_6 - x14_2_2 * x3_1_2 * k3_6 - x14_3_2 * x3_2_2 * k3_6 - x14_4_2 * x3_3_2 * k3_6 - x14_2_3 * x3_1_3 * k3_6 - x14_3_3 * x3_2_3 * k3_6 - x14_4_3 * x3_3_3 * k3_6 - x14_2_1 * x4_1_1 * k4_6 - x14_3_1 * x4_2_1 * k4_6 - x14_4_1 * x4_3_1 * k4_6 - x14_2_2 * x4_1_2 * k4_6 - x14_3_2 * x4_2_2 * k4_6 - x14_4_2 * x4_3_2 * k4_6 - x14_2_3 * x4_1_3 * k4_6 - x14_3_3 * x4_2_3 * k4_6 - x14_4_3 * x4_3_3 * k4_6 - x14_2_1 * x5_1_1 * k5_6 - x14_3_1 * x5_2_1 * k5_6 - x14_4_1 * x5_3_1 * k5_6 - x14_2_2 * x5_1_2 * k5_6 - x14_3_2 * x5_2_2 * k5_6 - x14_4_2 * x5_3_2 * k5_6 - x14_2_3 * x5_1_3 * k5_6 - x14_3_3 * x5_2_3 * k5_6 - x14_4_3 * x5_3_3 * k5_6 - x14_2_1 * x6_1_1 * k6_6 - x14_3_1 * x6_2_1 * k6_6 - x14_4_1 * x6_3_1 * k6_6 - x14_2_2 * x6_1_2 * k6_6 - x14_3_2 * x6_2_2 * k6_6 - x14_4_2 * x6_3_2 * k6_6 - x14_2_3 * x6_1_3 * k6_6 - x14_3_3 * x6_2_3 * k6_6 - x14_4_3 * x6_3_3 * k6_6 - 0.5*x14_2_1 * x7_1_1 * k7_6 - 0.5*x14_3_1 * x7_2_1 * k7_6 - 0.5*x14_4_1 * x7_3_1 * k7_6 - 0.5*x14_2_2 * x7_1_2 * k7_6 - 0.5*x14_3_2 * x7_2_2 * k7_6 - 0.5*x14_4_2 * x7_3_2 * k7_6 - 0.5*x14_2_3 * x7_1_3 * k7_6 - 0.5*x14_3_3 * x7_2_3 * k7_6 - 0.5*x14_4_3 * x7_3_3 * k7_6 - x14_2_1 * x8_1_1 * k8_6 - x14_3_1 * x8_2_1 * k8_6 - x14_4_1 * x8_3_1 * k8_6 - x14_2_2 * x8_1_2 * k8_6 - x14_3_2 * x8_2_2 * k8_6 - x14_4_2 * x8_3_2 * k8_6 - x14_2_3 * x8_1_3 * k8_6 - x14_3_3 * x8_2_3 * k8_6 - x14_4_3 * x8_3_3 * k8_6 - x14_2_1 * x9_1_1 * k9_6 - x14_3_1 * x9_2_1 * k9_6 - x14_4_1 * x9_3_1 * k9_6 - x14_2_2 * x9_1_2 * k9_6 - x14_3_2 * x9_2_2 * k9_6 - x14_4_2 * x9_3_2 * k9_6 - x14_2_3 * x9_1_3 * k9_6 - x14_3_3 * x9_2_3 * k9_6 - x14_4_3 * x9_3_3 * k9_6 - x14_2_1 * x10_1_1 * k10_6 - x14_3_1 * x10_2_1 * k10_6 - x14_4_1 * x10_3_1 * k10_6 - x14_2_2 * x10_1_2 * k10_6 - x14_3_2 * x10_2_2 * k10_6 - x14_4_2 * x10_3_2 * k10_6 - x14_2_3 * x10_1_3 * k10_6 - x14_3_3 * x10_2_3 * k10_6 - x14_4_3 * x10_3_3 * k10_6 - 0.5*x14_2_1 * x11_1_1 * k11_6 - 0.5*x14_3_1 * x11_2_1 * k11_6 - 0.5*x14_4_1 * x11_3_1 * k11_6 - 0.5*x14_2_2 * x11_1_2 * k11_6 - 0.5*x14_3_2 * x11_2_2 * k11_6 - 0.5*x14_4_2 * x11_3_2 * k11_6 - 0.5*x14_2_3 * x11_1_3 * k11_6 - 0.5*x14_3_3 * x11_2_3 * k11_6 - 0.5*x14_4_3 * x11_3_3 * k11_6 - x14_2_1 * x12_1_1 * k12_6 - x14_3_1 * x12_2_1 * k12_6 - x14_4_1 * x12_3_1 * k12_6 - x14_2_2 * x12_1_2 * k12_6 - x14_3_2 * x12_2_2 * k12_6 - x14_4_2 * x12_3_2 * k12_6 - x14_2_3 * x12_1_3 * k12_6 - x14_3_3 * x12_2_3 * k12_6 - x14_4_3 * x12_3_3 * k12_6 - x14_2_1 * x13_1_1 * k13_6 - x14_3_1 * x13_2_1 * k13_6 - x14_4_1 * x13_3_1 * k13_6 - x14_2_2 * x13_1_2 * k13_6 - x14_3_2 * x13_2_2 * k13_6 - x14_4_2 * x13_3_2 * k13_6 - x14_2_3 * x13_1_3 * k13_6 - x14_3_3 * x13_2_3 * k13_6 - x14_4_3 * x13_3_3 * k13_6 - 0.5*x14_2_1 * x14_1_1 * k14_6 - 0.5*x14_3_1 * x14_2_1 * k14_6 - 0.5*x14_4_1 * x14_3_1 * k14_6 - 0.5*x14_2_2 * x14_1_2 * k14_6 - 0.5*x14_3_2 * x14_2_2 * k14_6 - 0.5*x14_4_2 * x14_3_2 * k14_6 - 0.5*x14_2_3 * x14_1_3 * k14_6 - 0.5*x14_3_3 * x14_2_3 * k14_6 - 0.5*x14_4_3 * x14_3_3 * k14_6 + k14_1 - 1.2*x14_1_1 - 1.2*x14_1_2 - 1.2*x14_1_3 =e=0; kefford1.. 0 =g= keff2 - keff1 ; kefford2.. 0 =g= keff3 - keff2 ; kefford3.. 0 =g= keff4 - keff3 ; kefford4.. 0 =g= keff5 - keff4 ; kefford5.. 0 =g= keff6 - keff5 ; dia1_1_1.. x1_1_1 - x7_1_1 =e= 0 ; dia1_1_2.. x1_1_2 - x7_1_2 =e= 0 ; dia1_1_3.. x1_1_3 - x7_1_3 =e= 0 ; dia1_2_1.. x1_2_1 - x7_2_1 =e= 0 ; dia1_2_2.. x1_2_2 - x7_2_2 =e= 0 ; dia1_2_3.. x1_2_3 - x7_2_3 =e= 0 ; dia1_3_1.. x1_3_1 - x7_3_1 =e= 0 ; dia1_3_2.. x1_3_2 - x7_3_2 =e= 0 ; dia1_3_3.. x1_3_3 - x7_3_3 =e= 0 ; dia1_4_1.. x1_4_1 - x7_4_1 =e= 0 ; dia1_4_2.. x1_4_2 - x7_4_2 =e= 0 ; dia1_4_3.. x1_4_3 - x7_4_3 =e= 0 ; dia2_1_1.. x11_1_1 - x14_1_1 =e= 0 ; dia2_1_2.. x11_1_2 - x14_1_2 =e= 0 ; dia2_1_3.. x11_1_3 - x14_1_3 =e= 0 ; dia2_2_1.. x11_2_1 - x14_2_1 =e= 0 ; dia2_2_2.. x11_2_2 - x14_2_2 =e= 0 ; dia2_2_3.. x11_2_3 - x14_2_3 =e= 0 ; dia2_3_1.. x11_3_1 - x14_3_1 =e= 0 ; dia2_3_2.. x11_3_2 - x14_3_2 =e= 0 ; dia2_3_3.. x11_3_3 - x14_3_3 =e= 0 ; dia2_4_1.. x11_4_1 - x14_4_1 =e= 0 ; dia2_4_2.. x11_4_2 - x14_4_2 =e= 0 ; dia2_4_3.. x11_4_3 - x14_4_3 =e= 0 ; Def_obj.. obj =e= - keff6 + epsilon; x1_1_1.lo = 0.0 ; x1_1_1.up = 0.900 ; x1_1_1.l = 0.0 ; x1_1_2.lo = 0.0 ; x1_1_2.up = 0.900 ; x1_1_2.l = 0.0 ; x1_1_3.lo = 0.0 ; x1_1_3.up = 0.900 ; x1_1_3.l = 0.0 ; x1_2_1.lo = 0.0 ; x1_2_1.up = 0.900 ; x1_2_1.l = 0.0 ; x1_2_2.lo = 0.0 ; x1_2_2.up = 0.900 ; x1_2_2.l = 0.0 ; x1_2_3.lo = 0.0 ; x1_2_3.up = 0.900 ; x1_2_3.l = 0.0 ; x1_3_1.lo = 0.0 ; x1_3_1.up = 0.900 ; x1_3_1.l = 0.0 ; x1_3_2.lo = 0.0 ; x1_3_2.up = 0.900 ; x1_3_2.l = 0.0 ; x1_3_3.lo = 0.0 ; x1_3_3.up = 0.900 ; x1_3_3.l = 0.0 ; x1_4_1.lo = 0.0 ; x1_4_1.up = 0.900 ; x1_4_1.l = 0.0 ; x1_4_2.lo = 0.0 ; x1_4_2.up = 0.900 ; x1_4_2.l = 0.0 ; x1_4_3.lo = 0.0 ; x1_4_3.up = 0.900 ; x1_4_3.l = 0.0 ; x2_1_1.lo = 0.0 ; x2_1_1.up = 0.900 ; x2_1_1.l = 0.0 ; x2_1_2.lo = 0.0 ; x2_1_2.up = 0.900 ; x2_1_2.l = 0.0 ; x2_1_3.lo = 0.0 ; x2_1_3.up = 0.900 ; x2_1_3.l = 0.0 ; x2_2_1.lo = 0.0 ; x2_2_1.up = 0.900 ; x2_2_1.l = 0.0 ; x2_2_2.lo = 0.0 ; x2_2_2.up = 0.900 ; x2_2_2.l = 0.0 ; x2_2_3.lo = 0.0 ; x2_2_3.up = 0.900 ; x2_2_3.l = 0.0 ; x2_3_1.lo = 0.0 ; x2_3_1.up = 0.900 ; x2_3_1.l = 0.0 ; x2_3_2.lo = 0.0 ; x2_3_2.up = 0.900 ; x2_3_2.l = 0.0 ; x2_3_3.lo = 0.0 ; x2_3_3.up = 0.900 ; x2_3_3.l = 0.0 ; x2_4_1.lo = 0.0 ; x2_4_1.up = 0.900 ; x2_4_1.l = 0.0 ; x2_4_2.lo = 0.0 ; x2_4_2.up = 0.900 ; x2_4_2.l = 0.0 ; x2_4_3.lo = 0.0 ; x2_4_3.up = 0.900 ; x2_4_3.l = 0.0 ; x3_1_1.lo = 0.0 ; x3_1_1.up = 0.900 ; x3_1_1.l = 0.0 ; x3_1_2.lo = 0.0 ; x3_1_2.up = 0.900 ; x3_1_2.l = 0.0 ; x3_1_3.lo = 0.0 ; x3_1_3.up = 0.900 ; x3_1_3.l = 0.0 ; x3_2_1.lo = 0.0 ; x3_2_1.up = 0.900 ; x3_2_1.l = 0.0 ; x3_2_2.lo = 0.0 ; x3_2_2.up = 0.900 ; x3_2_2.l = 0.0 ; x3_2_3.lo = 0.0 ; x3_2_3.up = 0.900 ; x3_2_3.l = 0.0 ; x3_3_1.lo = 0.0 ; x3_3_1.up = 0.900 ; x3_3_1.l = 0.0 ; x3_3_2.lo = 0.0 ; x3_3_2.up = 0.900 ; x3_3_2.l = 0.0 ; x3_3_3.lo = 0.0 ; x3_3_3.up = 0.900 ; x3_3_3.l = 0.0 ; x3_4_1.lo = 0.0 ; x3_4_1.up = 0.900 ; x3_4_1.l = 0.0 ; x3_4_2.lo = 0.0 ; x3_4_2.up = 0.900 ; x3_4_2.l = 0.0 ; x3_4_3.lo = 0.0 ; x3_4_3.up = 0.900 ; x3_4_3.l = 0.0 ; x4_1_1.lo = 0.0 ; x4_1_1.up = 0.900 ; x4_1_1.l = 0.0 ; x4_1_2.lo = 0.0 ; x4_1_2.up = 0.900 ; x4_1_2.l = 0.0 ; x4_1_3.lo = 0.0 ; x4_1_3.up = 0.900 ; x4_1_3.l = 0.0 ; x4_2_1.lo = 0.0 ; x4_2_1.up = 0.900 ; x4_2_1.l = 0.0 ; x4_2_2.lo = 0.0 ; x4_2_2.up = 0.900 ; x4_2_2.l = 0.0 ; x4_2_3.lo = 0.0 ; x4_2_3.up = 0.900 ; x4_2_3.l = 0.0 ; x4_3_1.lo = 0.0 ; x4_3_1.up = 0.900 ; x4_3_1.l = 0.0 ; x4_3_2.lo = 0.0 ; x4_3_2.up = 0.900 ; x4_3_2.l = 0.0 ; x4_3_3.lo = 0.0 ; x4_3_3.up = 0.900 ; x4_3_3.l = 0.0 ; x4_4_1.lo = 0.0 ; x4_4_1.up = 0.900 ; x4_4_1.l = 0.0 ; x4_4_2.lo = 0.0 ; x4_4_2.up = 0.900 ; x4_4_2.l = 0.0 ; x4_4_3.lo = 0.0 ; x4_4_3.up = 0.900 ; x4_4_3.l = 0.0 ; x5_1_1.lo = 0.0 ; x5_1_1.up = 0.900 ; x5_1_1.l = 0.0 ; x5_1_2.lo = 0.0 ; x5_1_2.up = 0.900 ; x5_1_2.l = 0.0 ; x5_1_3.lo = 0.0 ; x5_1_3.up = 0.900 ; x5_1_3.l = 0.0 ; x5_2_1.lo = 0.0 ; x5_2_1.up = 0.900 ; x5_2_1.l = 0.0 ; x5_2_2.lo = 0.0 ; x5_2_2.up = 0.900 ; x5_2_2.l = 0.0 ; x5_2_3.lo = 0.0 ; x5_2_3.up = 0.900 ; x5_2_3.l = 0.0 ; x5_3_1.lo = 0.0 ; x5_3_1.up = 0.900 ; x5_3_1.l = 0.0 ; x5_3_2.lo = 0.0 ; x5_3_2.up = 0.900 ; x5_3_2.l = 0.0 ; x5_3_3.lo = 0.0 ; x5_3_3.up = 0.900 ; x5_3_3.l = 0.0 ; x5_4_1.lo = 0.0 ; x5_4_1.up = 0.900 ; x5_4_1.l = 0.0 ; x5_4_2.lo = 0.0 ; x5_4_2.up = 0.900 ; x5_4_2.l = 0.0 ; x5_4_3.lo = 0.0 ; x5_4_3.up = 0.900 ; x5_4_3.l = 0.0 ; x6_1_1.lo = 0.0 ; x6_1_1.up = 0.900 ; x6_1_1.l = 0.0 ; x6_1_2.lo = 0.0 ; x6_1_2.up = 0.900 ; x6_1_2.l = 0.0 ; x6_1_3.lo = 0.0 ; x6_1_3.up = 0.900 ; x6_1_3.l = 0.0 ; x6_2_1.lo = 0.0 ; x6_2_1.up = 0.900 ; x6_2_1.l = 0.0 ; x6_2_2.lo = 0.0 ; x6_2_2.up = 0.900 ; x6_2_2.l = 0.0 ; x6_2_3.lo = 0.0 ; x6_2_3.up = 0.900 ; x6_2_3.l = 0.0 ; x6_3_1.lo = 0.0 ; x6_3_1.up = 0.900 ; x6_3_1.l = 0.0 ; x6_3_2.lo = 0.0 ; x6_3_2.up = 0.900 ; x6_3_2.l = 0.0 ; x6_3_3.lo = 0.0 ; x6_3_3.up = 0.900 ; x6_3_3.l = 0.0 ; x6_4_1.lo = 0.0 ; x6_4_1.up = 0.900 ; x6_4_1.l = 0.0 ; x6_4_2.lo = 0.0 ; x6_4_2.up = 0.900 ; x6_4_2.l = 0.0 ; x6_4_3.lo = 0.0 ; x6_4_3.up = 0.900 ; x6_4_3.l = 0.0 ; x7_1_1.lo = 0.0 ; x7_1_1.up = 0.900 ; x7_1_1.l = 0.0 ; x7_1_2.lo = 0.0 ; x7_1_2.up = 0.900 ; x7_1_2.l = 0.0 ; x7_1_3.lo = 0.0 ; x7_1_3.up = 0.900 ; x7_1_3.l = 0.0 ; x7_2_1.lo = 0.0 ; x7_2_1.up = 0.900 ; x7_2_1.l = 0.0 ; x7_2_2.lo = 0.0 ; x7_2_2.up = 0.900 ; x7_2_2.l = 0.0 ; x7_2_3.lo = 0.0 ; x7_2_3.up = 0.900 ; x7_2_3.l = 0.0 ; x7_3_1.lo = 0.0 ; x7_3_1.up = 0.900 ; x7_3_1.l = 0.0 ; x7_3_2.lo = 0.0 ; x7_3_2.up = 0.900 ; x7_3_2.l = 0.0 ; x7_3_3.lo = 0.0 ; x7_3_3.up = 0.900 ; x7_3_3.l = 0.0 ; x7_4_1.lo = 0.0 ; x7_4_1.up = 0.900 ; x7_4_1.l = 0.0 ; x7_4_2.lo = 0.0 ; x7_4_2.up = 0.900 ; x7_4_2.l = 0.0 ; x7_4_3.lo = 0.0 ; x7_4_3.up = 0.900 ; x7_4_3.l = 0.0 ; x8_1_1.lo = 0.0 ; x8_1_1.up = 0.900 ; x8_1_1.l = 0.0 ; x8_1_2.lo = 0.0 ; x8_1_2.up = 0.900 ; x8_1_2.l = 0.0 ; x8_1_3.lo = 0.0 ; x8_1_3.up = 0.900 ; x8_1_3.l = 0.0 ; x8_2_1.lo = 0.0 ; x8_2_1.up = 0.900 ; x8_2_1.l = 0.0 ; x8_2_2.lo = 0.0 ; x8_2_2.up = 0.900 ; x8_2_2.l = 0.0 ; x8_2_3.lo = 0.0 ; x8_2_3.up = 0.900 ; x8_2_3.l = 0.0 ; x8_3_1.lo = 0.0 ; x8_3_1.up = 0.900 ; x8_3_1.l = 0.0 ; x8_3_2.lo = 0.0 ; x8_3_2.up = 0.900 ; x8_3_2.l = 0.0 ; x8_3_3.lo = 0.0 ; x8_3_3.up = 0.900 ; x8_3_3.l = 0.0 ; x8_4_1.lo = 0.0 ; x8_4_1.up = 0.900 ; x8_4_1.l = 0.0 ; x8_4_2.lo = 0.0 ; x8_4_2.up = 0.900 ; x8_4_2.l = 0.0 ; x8_4_3.lo = 0.0 ; x8_4_3.up = 0.900 ; x8_4_3.l = 0.0 ; x9_1_1.lo = 0.0 ; x9_1_1.up = 0.900 ; x9_1_1.l = 0.0 ; x9_1_2.lo = 0.0 ; x9_1_2.up = 0.900 ; x9_1_2.l = 0.0 ; x9_1_3.lo = 0.0 ; x9_1_3.up = 0.900 ; x9_1_3.l = 0.0 ; x9_2_1.lo = 0.0 ; x9_2_1.up = 0.900 ; x9_2_1.l = 0.0 ; x9_2_2.lo = 0.0 ; x9_2_2.up = 0.900 ; x9_2_2.l = 0.0 ; x9_2_3.lo = 0.0 ; x9_2_3.up = 0.900 ; x9_2_3.l = 0.0 ; x9_3_1.lo = 0.0 ; x9_3_1.up = 0.900 ; x9_3_1.l = 0.0 ; x9_3_2.lo = 0.0 ; x9_3_2.up = 0.900 ; x9_3_2.l = 0.0 ; x9_3_3.lo = 0.0 ; x9_3_3.up = 0.900 ; x9_3_3.l = 0.0 ; x9_4_1.lo = 0.0 ; x9_4_1.up = 0.900 ; x9_4_1.l = 0.0 ; x9_4_2.lo = 0.0 ; x9_4_2.up = 0.900 ; x9_4_2.l = 0.0 ; x9_4_3.lo = 0.0 ; x9_4_3.up = 0.900 ; x9_4_3.l = 0.0 ; x10_1_1.lo = 0.0 ; x10_1_1.up = 0.900 ; x10_1_1.l = 0.0 ; x10_1_2.lo = 0.0 ; x10_1_2.up = 0.900 ; x10_1_2.l = 0.0 ; x10_1_3.lo = 0.0 ; x10_1_3.up = 0.900 ; x10_1_3.l = 0.0 ; x10_2_1.lo = 0.0 ; x10_2_1.up = 0.900 ; x10_2_1.l = 0.0 ; x10_2_2.lo = 0.0 ; x10_2_2.up = 0.900 ; x10_2_2.l = 0.0 ; x10_2_3.lo = 0.0 ; x10_2_3.up = 0.900 ; x10_2_3.l = 0.0 ; x10_3_1.lo = 0.0 ; x10_3_1.up = 0.900 ; x10_3_1.l = 0.0 ; x10_3_2.lo = 0.0 ; x10_3_2.up = 0.900 ; x10_3_2.l = 0.0 ; x10_3_3.lo = 0.0 ; x10_3_3.up = 0.900 ; x10_3_3.l = 0.0 ; x10_4_1.lo = 0.0 ; x10_4_1.up = 0.900 ; x10_4_1.l = 0.0 ; x10_4_2.lo = 0.0 ; x10_4_2.up = 0.900 ; x10_4_2.l = 0.0 ; x10_4_3.lo = 0.0 ; x10_4_3.up = 0.900 ; x10_4_3.l = 0.0 ; x11_1_1.lo = 0.0 ; x11_1_1.up = 0.900 ; x11_1_1.l = 0.0 ; x11_1_2.lo = 0.0 ; x11_1_2.up = 0.900 ; x11_1_2.l = 0.0 ; x11_1_3.lo = 0.0 ; x11_1_3.up = 0.900 ; x11_1_3.l = 0.0 ; x11_2_1.lo = 0.0 ; x11_2_1.up = 0.900 ; x11_2_1.l = 0.0 ; x11_2_2.lo = 0.0 ; x11_2_2.up = 0.900 ; x11_2_2.l = 0.0 ; x11_2_3.lo = 0.0 ; x11_2_3.up = 0.900 ; x11_2_3.l = 0.0 ; x11_3_1.lo = 0.0 ; x11_3_1.up = 0.900 ; x11_3_1.l = 0.0 ; x11_3_2.lo = 0.0 ; x11_3_2.up = 0.900 ; x11_3_2.l = 0.0 ; x11_3_3.lo = 0.0 ; x11_3_3.up = 0.900 ; x11_3_3.l = 0.0 ; x11_4_1.lo = 0.0 ; x11_4_1.up = 0.900 ; x11_4_1.l = 0.0 ; x11_4_2.lo = 0.0 ; x11_4_2.up = 0.900 ; x11_4_2.l = 0.0 ; x11_4_3.lo = 0.0 ; x11_4_3.up = 0.900 ; x11_4_3.l = 0.0 ; x12_1_1.lo = 0.0 ; x12_1_1.up = 0.900 ; x12_1_1.l = 0.0 ; x12_1_2.lo = 0.0 ; x12_1_2.up = 0.900 ; x12_1_2.l = 0.0 ; x12_1_3.lo = 0.0 ; x12_1_3.up = 0.900 ; x12_1_3.l = 0.0 ; x12_2_1.lo = 0.0 ; x12_2_1.up = 0.900 ; x12_2_1.l = 0.0 ; x12_2_2.lo = 0.0 ; x12_2_2.up = 0.900 ; x12_2_2.l = 0.0 ; x12_2_3.lo = 0.0 ; x12_2_3.up = 0.900 ; x12_2_3.l = 0.0 ; x12_3_1.lo = 0.0 ; x12_3_1.up = 0.900 ; x12_3_1.l = 0.0 ; x12_3_2.lo = 0.0 ; x12_3_2.up = 0.900 ; x12_3_2.l = 0.0 ; x12_3_3.lo = 0.0 ; x12_3_3.up = 0.900 ; x12_3_3.l = 0.0 ; x12_4_1.lo = 0.0 ; x12_4_1.up = 0.900 ; x12_4_1.l = 0.0 ; x12_4_2.lo = 0.0 ; x12_4_2.up = 0.900 ; x12_4_2.l = 0.0 ; x12_4_3.lo = 0.0 ; x12_4_3.up = 0.900 ; x12_4_3.l = 0.0 ; x13_1_1.lo = 0.0 ; x13_1_1.up = 0.900 ; x13_1_1.l = 0.0 ; x13_1_2.lo = 0.0 ; x13_1_2.up = 0.900 ; x13_1_2.l = 0.0 ; x13_1_3.lo = 0.0 ; x13_1_3.up = 0.900 ; x13_1_3.l = 0.0 ; x13_2_1.lo = 0.0 ; x13_2_1.up = 0.900 ; x13_2_1.l = 0.0 ; x13_2_2.lo = 0.0 ; x13_2_2.up = 0.900 ; x13_2_2.l = 0.0 ; x13_2_3.lo = 0.0 ; x13_2_3.up = 0.900 ; x13_2_3.l = 0.0 ; x13_3_1.lo = 0.0 ; x13_3_1.up = 0.900 ; x13_3_1.l = 0.0 ; x13_3_2.lo = 0.0 ; x13_3_2.up = 0.900 ; x13_3_2.l = 0.0 ; x13_3_3.lo = 0.0 ; x13_3_3.up = 0.900 ; x13_3_3.l = 0.0 ; x13_4_1.lo = 0.0 ; x13_4_1.up = 0.900 ; x13_4_1.l = 0.0 ; x13_4_2.lo = 0.0 ; x13_4_2.up = 0.900 ; x13_4_2.l = 0.0 ; x13_4_3.lo = 0.0 ; x13_4_3.up = 0.900 ; x13_4_3.l = 0.0 ; x14_1_1.lo = 0.0 ; x14_1_1.up = 0.900 ; x14_1_1.l = 0.0 ; x14_1_2.lo = 0.0 ; x14_1_2.up = 0.900 ; x14_1_2.l = 0.0 ; x14_1_3.lo = 0.0 ; x14_1_3.up = 0.900 ; x14_1_3.l = 0.0 ; x14_2_1.lo = 0.0 ; x14_2_1.up = 0.900 ; x14_2_1.l = 0.0 ; x14_2_2.lo = 0.0 ; x14_2_2.up = 0.900 ; x14_2_2.l = 0.0 ; x14_2_3.lo = 0.0 ; x14_2_3.up = 0.900 ; x14_2_3.l = 0.0 ; x14_3_1.lo = 0.0 ; x14_3_1.up = 0.900 ; x14_3_1.l = 0.0 ; x14_3_2.lo = 0.0 ; x14_3_2.up = 0.900 ; x14_3_2.l = 0.0 ; x14_3_3.lo = 0.0 ; x14_3_3.up = 0.900 ; x14_3_3.l = 0.0 ; x14_4_1.lo = 0.0 ; x14_4_1.up = 0.900 ; x14_4_1.l = 0.0 ; x14_4_2.lo = 0.0 ; x14_4_2.up = 0.900 ; x14_4_2.l = 0.0 ; x14_4_3.lo = 0.0 ; x14_4_3.up = 0.900 ; x14_4_3.l = 0.0 ; k1_1.lo = 0.0 ; k1_1.up = 1.2 ; k1_2.lo = 0.0 ; k1_2.up = 1.2 ; k1_3.lo = 0.0 ; k1_3.up = 1.2 ; k1_4.lo = 0.0 ; k1_4.up = 1.2 ; k1_5.lo = 0.0 ; k1_5.up = 1.2 ; k1_6.lo = 0.0 ; k1_6.up = 1.2 ; k2_1.lo = 0.0 ; k2_1.up = 1.2 ; k2_2.lo = 0.0 ; k2_2.up = 1.2 ; k2_3.lo = 0.0 ; k2_3.up = 1.2 ; k2_4.lo = 0.0 ; k2_4.up = 1.2 ; k2_5.lo = 0.0 ; k2_5.up = 1.2 ; k2_6.lo = 0.0 ; k2_6.up = 1.2 ; k3_1.lo = 0.0 ; k3_1.up = 1.2 ; k3_2.lo = 0.0 ; k3_2.up = 1.2 ; k3_3.lo = 0.0 ; k3_3.up = 1.2 ; k3_4.lo = 0.0 ; k3_4.up = 1.2 ; k3_5.lo = 0.0 ; k3_5.up = 1.2 ; k3_6.lo = 0.0 ; k3_6.up = 1.2 ; k4_1.lo = 0.0 ; k4_1.up = 1.2 ; k4_2.lo = 0.0 ; k4_2.up = 1.2 ; k4_3.lo = 0.0 ; k4_3.up = 1.2 ; k4_4.lo = 0.0 ; k4_4.up = 1.2 ; k4_5.lo = 0.0 ; k4_5.up = 1.2 ; k4_6.lo = 0.0 ; k4_6.up = 1.2 ; k5_1.lo = 0.0 ; k5_1.up = 1.2 ; k5_2.lo = 0.0 ; k5_2.up = 1.2 ; k5_3.lo = 0.0 ; k5_3.up = 1.2 ; k5_4.lo = 0.0 ; k5_4.up = 1.2 ; k5_5.lo = 0.0 ; k5_5.up = 1.2 ; k5_6.lo = 0.0 ; k5_6.up = 1.2 ; k6_1.lo = 0.0 ; k6_1.up = 1.2 ; k6_2.lo = 0.0 ; k6_2.up = 1.2 ; k6_3.lo = 0.0 ; k6_3.up = 1.2 ; k6_4.lo = 0.0 ; k6_4.up = 1.2 ; k6_5.lo = 0.0 ; k6_5.up = 1.2 ; k6_6.lo = 0.0 ; k6_6.up = 1.2 ; k7_1.lo = 0.0 ; k7_1.up = 1.2 ; k7_2.lo = 0.0 ; k7_2.up = 1.2 ; k7_3.lo = 0.0 ; k7_3.up = 1.2 ; k7_4.lo = 0.0 ; k7_4.up = 1.2 ; k7_5.lo = 0.0 ; k7_5.up = 1.2 ; k7_6.lo = 0.0 ; k7_6.up = 1.2 ; k8_1.lo = 0.0 ; k8_1.up = 1.2 ; k8_2.lo = 0.0 ; k8_2.up = 1.2 ; k8_3.lo = 0.0 ; k8_3.up = 1.2 ; k8_4.lo = 0.0 ; k8_4.up = 1.2 ; k8_5.lo = 0.0 ; k8_5.up = 1.2 ; k8_6.lo = 0.0 ; k8_6.up = 1.2 ; k9_1.lo = 0.0 ; k9_1.up = 1.2 ; k9_2.lo = 0.0 ; k9_2.up = 1.2 ; k9_3.lo = 0.0 ; k9_3.up = 1.2 ; k9_4.lo = 0.0 ; k9_4.up = 1.2 ; k9_5.lo = 0.0 ; k9_5.up = 1.2 ; k9_6.lo = 0.0 ; k9_6.up = 1.2 ; k10_1.lo = 0.0 ; k10_1.up = 1.2 ; k10_2.lo = 0.0 ; k10_2.up = 1.2 ; k10_3.lo = 0.0 ; k10_3.up = 1.2 ; k10_4.lo = 0.0 ; k10_4.up = 1.2 ; k10_5.lo = 0.0 ; k10_5.up = 1.2 ; k10_6.lo = 0.0 ; k10_6.up = 1.2 ; k11_1.lo = 0.0 ; k11_1.up = 1.2 ; k11_2.lo = 0.0 ; k11_2.up = 1.2 ; k11_3.lo = 0.0 ; k11_3.up = 1.2 ; k11_4.lo = 0.0 ; k11_4.up = 1.2 ; k11_5.lo = 0.0 ; k11_5.up = 1.2 ; k11_6.lo = 0.0 ; k11_6.up = 1.2 ; k12_1.lo = 0.0 ; k12_1.up = 1.2 ; k12_2.lo = 0.0 ; k12_2.up = 1.2 ; k12_3.lo = 0.0 ; k12_3.up = 1.2 ; k12_4.lo = 0.0 ; k12_4.up = 1.2 ; k12_5.lo = 0.0 ; k12_5.up = 1.2 ; k12_6.lo = 0.0 ; k12_6.up = 1.2 ; k13_1.lo = 0.0 ; k13_1.up = 1.2 ; k13_2.lo = 0.0 ; k13_2.up = 1.2 ; k13_3.lo = 0.0 ; k13_3.up = 1.2 ; k13_4.lo = 0.0 ; k13_4.up = 1.2 ; k13_5.lo = 0.0 ; k13_5.up = 1.2 ; k13_6.lo = 0.0 ; k13_6.up = 1.2 ; k14_1.lo = 0.0 ; k14_1.up = 1.2 ; k14_2.lo = 0.0 ; k14_2.up = 1.2 ; k14_3.lo = 0.0 ; k14_3.up = 1.2 ; k14_4.lo = 0.0 ; k14_4.up = 1.2 ; k14_5.lo = 0.0 ; k14_5.up = 1.2 ; k14_6.lo = 0.0 ; k14_6.up = 1.2 ; keff1.lo = 0.0 ; keff1.up = 1.2 ; keff2.lo = 0.0 ; keff2.up = 1.2 ; keff3.lo = 0.0 ; keff3.up = 1.2 ; keff4.lo = 0.0 ; keff4.up = 1.2 ; keff5.lo = 0.0 ; keff5.up = 1.2 ; keff6.lo = 0.0 ; keff6.up = 1.2 ; epsilon.lo = 0.0 ; epsilon.up = 100.0 ; phi1_1.lo = 0.0001 ; phi1_1.up = 0.900 ; phi1_2.lo = 0.0001 ; phi1_2.up = 0.900 ; phi1_3.lo = 0.0001 ; phi1_3.up = 0.900 ; phi1_4.lo = 0.0001 ; phi1_4.up = 0.900 ; phi1_5.lo = 0.0001 ; phi1_5.up = 0.900 ; phi1_6.lo = 0.0001 ; phi1_6.up = 0.900 ; phi2_1.lo = 0.0001 ; phi2_1.up = 0.900 ; phi2_2.lo = 0.0001 ; phi2_2.up = 0.900 ; phi2_3.lo = 0.0001 ; phi2_3.up = 0.900 ; phi2_4.lo = 0.0001 ; phi2_4.up = 0.900 ; phi2_5.lo = 0.0001 ; phi2_5.up = 0.900 ; phi2_6.lo = 0.0001 ; phi2_6.up = 0.900 ; phi3_1.lo = 0.0001 ; phi3_1.up = 0.900 ; phi3_2.lo = 0.0001 ; phi3_2.up = 0.900 ; phi3_3.lo = 0.0001 ; phi3_3.up = 0.900 ; phi3_4.lo = 0.0001 ; phi3_4.up = 0.900 ; phi3_5.lo = 0.0001 ; phi3_5.up = 0.900 ; phi3_6.lo = 0.0001 ; phi3_6.up = 0.900 ; phi4_1.lo = 0.0001 ; phi4_1.up = 0.900 ; phi4_2.lo = 0.0001 ; phi4_2.up = 0.900 ; phi4_3.lo = 0.0001 ; phi4_3.up = 0.900 ; phi4_4.lo = 0.0001 ; phi4_4.up = 0.900 ; phi4_5.lo = 0.0001 ; phi4_5.up = 0.900 ; phi4_6.lo = 0.0001 ; phi4_6.up = 0.900 ; phi5_1.lo = 0.0001 ; phi5_1.up = 0.900 ; phi5_2.lo = 0.0001 ; phi5_2.up = 0.900 ; phi5_3.lo = 0.0001 ; phi5_3.up = 0.900 ; phi5_4.lo = 0.0001 ; phi5_4.up = 0.900 ; phi5_5.lo = 0.0001 ; phi5_5.up = 0.900 ; phi5_6.lo = 0.0001 ; phi5_6.up = 0.900 ; phi6_1.lo = 0.0001 ; phi6_1.up = 0.900 ; phi6_2.lo = 0.0001 ; phi6_2.up = 0.900 ; phi6_3.lo = 0.0001 ; phi6_3.up = 0.900 ; phi6_4.lo = 0.0001 ; phi6_4.up = 0.900 ; phi6_5.lo = 0.0001 ; phi6_5.up = 0.900 ; phi6_6.lo = 0.0001 ; phi6_6.up = 0.900 ; phi7_1.lo = 0.0001 ; phi7_1.up = 0.900 ; phi7_2.lo = 0.0001 ; phi7_2.up = 0.900 ; phi7_3.lo = 0.0001 ; phi7_3.up = 0.900 ; phi7_4.lo = 0.0001 ; phi7_4.up = 0.900 ; phi7_5.lo = 0.0001 ; phi7_5.up = 0.900 ; phi7_6.lo = 0.0001 ; phi7_6.up = 0.900 ; phi8_1.lo = 0.0001 ; phi8_1.up = 0.900 ; phi8_2.lo = 0.0001 ; phi8_2.up = 0.900 ; phi8_3.lo = 0.0001 ; phi8_3.up = 0.900 ; phi8_4.lo = 0.0001 ; phi8_4.up = 0.900 ; phi8_5.lo = 0.0001 ; phi8_5.up = 0.900 ; phi8_6.lo = 0.0001 ; phi8_6.up = 0.900 ; phi9_1.lo = 0.0001 ; phi9_1.up = 0.900 ; phi9_2.lo = 0.0001 ; phi9_2.up = 0.900 ; phi9_3.lo = 0.0001 ; phi9_3.up = 0.900 ; phi9_4.lo = 0.0001 ; phi9_4.up = 0.900 ; phi9_5.lo = 0.0001 ; phi9_5.up = 0.900 ; phi9_6.lo = 0.0001 ; phi9_6.up = 0.900 ; phi10_1.lo = 0.0001 ; phi10_1.up = 0.900 ; phi10_2.lo = 0.0001 ; phi10_2.up = 0.900 ; phi10_3.lo = 0.0001 ; phi10_3.up = 0.900 ; phi10_4.lo = 0.0001 ; phi10_4.up = 0.900 ; phi10_5.lo = 0.0001 ; phi10_5.up = 0.900 ; phi10_6.lo = 0.0001 ; phi10_6.up = 0.900 ; phi11_1.lo = 0.0001 ; phi11_1.up = 0.900 ; phi11_2.lo = 0.0001 ; phi11_2.up = 0.900 ; phi11_3.lo = 0.0001 ; phi11_3.up = 0.900 ; phi11_4.lo = 0.0001 ; phi11_4.up = 0.900 ; phi11_5.lo = 0.0001 ; phi11_5.up = 0.900 ; phi11_6.lo = 0.0001 ; phi11_6.up = 0.900 ; phi12_1.lo = 0.0001 ; phi12_1.up = 0.900 ; phi12_2.lo = 0.0001 ; phi12_2.up = 0.900 ; phi12_3.lo = 0.0001 ; phi12_3.up = 0.900 ; phi12_4.lo = 0.0001 ; phi12_4.up = 0.900 ; phi12_5.lo = 0.0001 ; phi12_5.up = 0.900 ; phi12_6.lo = 0.0001 ; phi12_6.up = 0.900 ; phi13_1.lo = 0.0001 ; phi13_1.up = 0.900 ; phi13_2.lo = 0.0001 ; phi13_2.up = 0.900 ; phi13_3.lo = 0.0001 ; phi13_3.up = 0.900 ; phi13_4.lo = 0.0001 ; phi13_4.up = 0.900 ; phi13_5.lo = 0.0001 ; phi13_5.up = 0.900 ; phi13_6.lo = 0.0001 ; phi13_6.up = 0.900 ; phi14_1.lo = 0.0001 ; phi14_1.up = 0.900 ; phi14_2.lo = 0.0001 ; phi14_2.up = 0.900 ; phi14_3.lo = 0.0001 ; phi14_3.up = 0.900 ; phi14_4.lo = 0.0001 ; phi14_4.up = 0.900 ; phi14_5.lo = 0.0001 ; phi14_5.up = 0.900 ; phi14_6.lo = 0.0001 ; phi14_6.up = 0.900 ; option nlp = minos; Model twirism1 /all/ ; Solve twirism1 using nlp minimazing obj ; display x1_1_1.l ; display x1_1_2.l ; display x1_1_3.l ; display x1_2_1.l ; display x1_2_2.l ; display x1_2_3.l ; display x1_3_1.l ; display x1_3_2.l ; display x1_3_3.l ; display x1_4_1.l ; display x1_4_2.l ; display x1_4_3.l ; display x2_1_1.l ; display x2_1_2.l ; display x2_1_3.l ; display x2_2_1.l ; display x2_2_2.l ; display x2_2_3.l ; display x2_3_1.l ; display x2_3_2.l ; display x2_3_3.l ; display x2_4_1.l ; display x2_4_2.l ; display x2_4_3.l ; display x3_1_1.l ; display x3_1_2.l ; display x3_1_3.l ; display x3_2_1.l ; display x3_2_2.l ; display x3_2_3.l ; display x3_3_1.l ; display x3_3_2.l ; display x3_3_3.l ; display x3_4_1.l ; display x3_4_2.l ; display x3_4_3.l ; display x4_1_1.l ; display x4_1_2.l ; display x4_1_3.l ; display x4_2_1.l ; display x4_2_2.l ; display x4_2_3.l ; display x4_3_1.l ; display x4_3_2.l ; display x4_3_3.l ; display x4_4_1.l ; display x4_4_2.l ; display x4_4_3.l ; display x5_1_1.l ; display x5_1_2.l ; display x5_1_3.l ; display x5_2_1.l ; display x5_2_2.l ; display x5_2_3.l ; display x5_3_1.l ; display x5_3_2.l ; display x5_3_3.l ; display x5_4_1.l ; display x5_4_2.l ; display x5_4_3.l ; display x6_1_1.l ; display x6_1_2.l ; display x6_1_3.l ; display x6_2_1.l ; display x6_2_2.l ; display x6_2_3.l ; display x6_3_1.l ; display x6_3_2.l ; display x6_3_3.l ; display x6_4_1.l ; display x6_4_2.l ; display x6_4_3.l ; display x7_1_1.l ; display x7_1_2.l ; display x7_1_3.l ; display x7_2_1.l ; display x7_2_2.l ; display x7_2_3.l ; display x7_3_1.l ; display x7_3_2.l ; display x7_3_3.l ; display x7_4_1.l ; display x7_4_2.l ; display x7_4_3.l ; display x8_1_1.l ; display x8_1_2.l ; display x8_1_3.l ; display x8_2_1.l ; display x8_2_2.l ; display x8_2_3.l ; display x8_3_1.l ; display x8_3_2.l ; display x8_3_3.l ; display x8_4_1.l ; display x8_4_2.l ; display x8_4_3.l ; display x9_1_1.l ; display x9_1_2.l ; display x9_1_3.l ; display x9_2_1.l ; display x9_2_2.l ; display x9_2_3.l ; display x9_3_1.l ; display x9_3_2.l ; display x9_3_3.l ; display x9_4_1.l ; display x9_4_2.l ; display x9_4_3.l ; display x10_1_1.l ; display x10_1_2.l ; display x10_1_3.l ; display x10_2_1.l ; display x10_2_2.l ; display x10_2_3.l ; display x10_3_1.l ; display x10_3_2.l ; display x10_3_3.l ; display x10_4_1.l ; display x10_4_2.l ; display x10_4_3.l ; display x11_1_1.l ; display x11_1_2.l ; display x11_1_3.l ; display x11_2_1.l ; display x11_2_2.l ; display x11_2_3.l ; display x11_3_1.l ; display x11_3_2.l ; display x11_3_3.l ; display x11_4_1.l ; display x11_4_2.l ; display x11_4_3.l ; display x12_1_1.l ; display x12_1_2.l ; display x12_1_3.l ; display x12_2_1.l ; display x12_2_2.l ; display x12_2_3.l ; display x12_3_1.l ; display x12_3_2.l ; display x12_3_3.l ; display x12_4_1.l ; display x12_4_2.l ; display x12_4_3.l ; display x13_1_1.l ; display x13_1_2.l ; display x13_1_3.l ; display x13_2_1.l ; display x13_2_2.l ; display x13_2_3.l ; display x13_3_1.l ; display x13_3_2.l ; display x13_3_3.l ; display x13_4_1.l ; display x13_4_2.l ; display x13_4_3.l ; display x14_1_1.l ; display x14_1_2.l ; display x14_1_3.l ; display x14_2_1.l ; display x14_2_2.l ; display x14_2_3.l ; display x14_3_1.l ; display x14_3_2.l ; display x14_3_3.l ; display x14_4_1.l ; display x14_4_2.l ; display x14_4_3.l ; display k1_1.l ; display phi1_1.l ; display k1_2.l ; display phi1_2.l ; display k1_3.l ; display phi1_3.l ; display k1_4.l ; display phi1_4.l ; display k1_5.l ; display phi1_5.l ; display k1_6.l ; display phi1_6.l ; display k2_1.l ; display phi2_1.l ; display k2_2.l ; display phi2_2.l ; display k2_3.l ; display phi2_3.l ; display k2_4.l ; display phi2_4.l ; display k2_5.l ; display phi2_5.l ; display k2_6.l ; display phi2_6.l ; display k3_1.l ; display phi3_1.l ; display k3_2.l ; display phi3_2.l ; display k3_3.l ; display phi3_3.l ; display k3_4.l ; display phi3_4.l ; display k3_5.l ; display phi3_5.l ; display k3_6.l ; display phi3_6.l ; display k4_1.l ; display phi4_1.l ; display k4_2.l ; display phi4_2.l ; display k4_3.l ; display phi4_3.l ; display k4_4.l ; display phi4_4.l ; display k4_5.l ; display phi4_5.l ; display k4_6.l ; display phi4_6.l ; display k5_1.l ; display phi5_1.l ; display k5_2.l ; display phi5_2.l ; display k5_3.l ; display phi5_3.l ; display k5_4.l ; display phi5_4.l ; display k5_5.l ; display phi5_5.l ; display k5_6.l ; display phi5_6.l ; display k6_1.l ; display phi6_1.l ; display k6_2.l ; display phi6_2.l ; display k6_3.l ; display phi6_3.l ; display k6_4.l ; display phi6_4.l ; display k6_5.l ; display phi6_5.l ; display k6_6.l ; display phi6_6.l ; display k7_1.l ; display phi7_1.l ; display k7_2.l ; display phi7_2.l ; display k7_3.l ; display phi7_3.l ; display k7_4.l ; display phi7_4.l ; display k7_5.l ; display phi7_5.l ; display k7_6.l ; display phi7_6.l ; display k8_1.l ; display phi8_1.l ; display k8_2.l ; display phi8_2.l ; display k8_3.l ; display phi8_3.l ; display k8_4.l ; display phi8_4.l ; display k8_5.l ; display phi8_5.l ; display k8_6.l ; display phi8_6.l ; display k9_1.l ; display phi9_1.l ; display k9_2.l ; display phi9_2.l ; display k9_3.l ; display phi9_3.l ; display k9_4.l ; display phi9_4.l ; display k9_5.l ; display phi9_5.l ; display k9_6.l ; display phi9_6.l ; display k10_1.l ; display phi10_1.l ; display k10_2.l ; display phi10_2.l ; display k10_3.l ; display phi10_3.l ; display k10_4.l ; display phi10_4.l ; display k10_5.l ; display phi10_5.l ; display k10_6.l ; display phi10_6.l ; display k11_1.l ; display phi11_1.l ; display k11_2.l ; display phi11_2.l ; display k11_3.l ; display phi11_3.l ; display k11_4.l ; display phi11_4.l ; display k11_5.l ; display phi11_5.l ; display k11_6.l ; display phi11_6.l ; display k12_1.l ; display phi12_1.l ; display k12_2.l ; display phi12_2.l ; display k12_3.l ; display phi12_3.l ; display k12_4.l ; display phi12_4.l ; display k12_5.l ; display phi12_5.l ; display k12_6.l ; display phi12_6.l ; display k13_1.l ; display phi13_1.l ; display k13_2.l ; display phi13_2.l ; display k13_3.l ; display phi13_3.l ; display k13_4.l ; display phi13_4.l ; display k13_5.l ; display phi13_5.l ; display k13_6.l ; display phi13_6.l ; display k14_1.l ; display phi14_1.l ; display k14_2.l ; display phi14_2.l ; display k14_3.l ; display phi14_3.l ; display k14_4.l ; display phi14_4.l ; display k14_5.l ; display phi14_5.l ; display k14_6.l ; display phi14_6.l ; display keff1.l ; display keff2.l ; display keff3.l ; display keff4.l ; display keff5.l ; display keff6.l ; display epsilon.l ; display obj.l ;