--- Job NOM_16112022.gms Start 11/15/22 11:27:24 39.1.0 5f04cd76 WEX-WEI x86 64bit/MS Windows --- Applying: C:\GAMS\39\gmsprmNT.txt C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\GAMS\gamsconfig.yaml --- GAMS Parameters defined LP CONOPT MIP MOSEK RMIP CONOPT NLP CONOPT CNS CONOPT DNLP CONOPT RMINLP CONOPT MINLP MOSEK QCP CONOPT MIQCP MOSEK RMIQCP CONOPT Input "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\NOM_16112022.gms" PageWidth 80 PageSize 0 PageContr 3 Action CE ScrDir "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\225c\" SysDir C:\GAMS\39\ WorkDir "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\" LogOption 3 DFormat 0 TFormat 0 ErrorLog 99 IDE 1 Licensee: Mario Frenandez, Single User License S220601|0002CO-WIN DairyNZ, Economics DC16213 C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\GAMS\gamslice.txt Mario.Fernandez@dairynz.co.nz Processor information: 1 socket(s), 4 core(s), and 8 thread(s) available GAMS 39.1.0 Copyright (C) 1987-2022 GAMS Development. All rights reserved --- Starting compilation --- NOM_16112022.gms(42) 4 Mb --- call GDXXRW.exe NOM_Input_v2.xlsx par=data rng=data!A1:cq11591 Rdim=1 Cdim=1 GDXXRW 39.1.0 5f04cd76 May 3, 2022 VS8 x86 32bit/MS Window Input file : C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\NOM_Input_v2.xlsx Output file: C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\NOM_Input_v2.gdx Total time = 7562 Ms --- NOM_16112022.gms(43) 4 Mb --- GDXin=C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\NOM_Input_v2.gdx --- GDX File ($gdxIn) C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\NOM_Input_v2.gdx --- NOM_16112022.gms(968) 4 Mb --- Starting execution: elapsed 0:00:07.859 --- NOM_16112022.gms(384) 5 Mb --- Generating NLP model FirstStage --- NOM_16112022.gms(386) 7 Mb --- 151 rows 151 columns 399 non-zeroes --- 0 nl-code 0 nl-non-zeroes --- Range statistics (absolute non-zero finite values) --- RHS [min, max] : [ 1.092E+02, 1.070E+03] - Zero values observed as well --- Bound [min, max] : [ NA, NA] - Zero values observed as well --- Matrix [min, max] : [ 1.000E-04, 2.437E+03] --- NOM_16112022.gms(386) 5 Mb --- Executing MOSEK (Solvelink=2): elapsed 0:00:07.868 MOSEK 39.1.0 5f04cd76 May 3, 2022 WEI x86 64bit/MS Window M O S E K version 9.3.20 (Build date: 2022-4-27 08:24:47) Copyright (C) MOSEK ApS, Fruebjergvej 3, Box 16 DK-2100 Copenhagen, Denmark https://www.mosek.com Reading parameter(s) from "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\mosek.opt" >> *MSK_IPAR_SIM_DUAL_RESTRICT_SELECTION = 100 >> >> *MSK_IPAR_SIM_REFORMULATION=MSK_SIM_REFORMULATION_ON >> >> *MSK_IPAR_SIM_SWITCH_OPTIMIZER= MSK_ON >> >> *MSK_DPAR_INTPNT_CO_TOL_MU_RED = 1e-08 >> >> *MSK_DPAR_INTPNT_TOL_DSAFE =1000 >> >> * Controls how close the interior-point optimizer follows the central path. ? >> * A large value of this parameter means the central path is followed very closely. >> * On numerically unstable problems it may be worthwhile to increase this parameter. >> >> MSK_DPAR_INTPNT_TOL_PATH=0.35 >> *Default: 1e-08 >> >> *Controls the initial primal starting point used by the interior-point optimizer. ? >> * If the interior-point optimizer converges slowly and/or the constraint or variable bounds are very large >> * then it may be worthwhile to increase this value. >> * Default: 1 >> >> *MSK_DPAR_INTPNT_TOL_PSAFE =0.05 >> >> >> *MSK_DPAR_INTPNT_TOL_STEP_SIZE = 1 >> >> *MSK_IPAR_INTPNT_SOLVE_FORM= MSK_SOLVE_DUAL >> >> *MSK_IPAR_INTPNT_STARTING_POINT = MSK_STARTING_POINT_GUESS >> >> *MSK_IPAR_LOG_INTPNT=5 >> >> *MSK_IPAR_MIO_CONIC_OUTER_APPROXIMATION = MSK_ON >> >> *MSK_IPAR_OPTIMIZER= MSK_OPTIMIZER_CONIC Finished reading from "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\mosek.opt" Setting up initial basis solution. 300 basis variables are specified but 150 are expected. (405) Problem Name : Objective sense : max Type : LO (linear optimization problem) Constraints : 150 Cones : 0 Scalar variables : 150 Matrix variables : 0 Integer variables : 0 Optimizer started. Presolve started. Eliminator started. Freed constraints in eliminator : 0 Eliminator terminated. Eliminator - tries : 1 time : 0.00 Lin. dep. - tries : 0 time : 0.00 Lin. dep. - number : 0 Presolve terminated. Time: 0.00 Optimizer terminated. Time: 0.00 Interior-point solution summary Problem status : PRIMAL_AND_DUAL_FEASIBLE Solution status : OPTIMAL Primal. obj: 8.2972819187e+10 nrm: 2e+06 Viol. con: 6e-11 var: 0e+00 Dual. obj: 8.2972819187e+10 nrm: 2e+07 Viol. con: 0e+00 var: 4e-09 Basic solution summary Problem status : PRIMAL_AND_DUAL_FEASIBLE Solution status : OPTIMAL Primal. obj: 8.2972819187e+10 nrm: 2e+06 Viol. con: 6e-11 var: 0e+00 Dual. obj: 8.2972819187e+10 nrm: 2e+07 Viol. con: 0e+00 var: 4e-09 Return code - 0 [MSK_RES_OK]: No error occurred. --- Reading solution for model FirstStage --- Executing after solve: elapsed 0:00:08.081 --- NOM_16112022.gms(548) 5 Mb --- Generating MINLP model LEASTSQ --- NOM_16112022.gms(551) 7 Mb --- 21 rows 31 columns 61 non-zeroes --- 233 nl-code 50 nl-non-zeroes --- Range statistics (absolute non-zero finite values) --- RHS [min, max] : [ 7.049E+00, 7.884E+00] - Zero values observed as well --- Bound [min, max] : [ 1.000E-04, 1.000E+05] --- Matrix [min, max] : [ 4.353E-03, 1.259E+04] --- NOM_16112022.gms(551) 5 Mb --- Executing BONMIN (Solvelink=2): elapsed 0:00:08.091 COIN-OR Bonmin 39.1.0 5f04cd76 May 3, 2022 WEI x86 64bit/MS Window COIN-OR Bonmin (Bonmin Library 1.8) written by P. Bonami. Cbc3007W No integer variables - nothing to do ****************************************************************************** This program contains Ipopt, a library for large-scale nonlinear optimization. Ipopt is released as open source code under the Eclipse Public License (EPL). For more information visit http://projects.coin-or.org/Ipopt ****************************************************************************** This is Ipopt version 3.12, running with linear solver mumps. Number of nonzeros in equality constraint Jacobian...: 50 Number of nonzeros in inequality constraint Jacobian.: 0 Number of nonzeros in Lagrangian Hessian.............: 40 Total number of variables............................: 30 variables with only lower bounds: 10 variables with lower and upper bounds: 20 variables with only upper bounds: 0 Total number of equality constraints.................: 20 Total number of inequality constraints...............: 0 inequality constraints with only lower bounds: 0 inequality constraints with lower and upper bounds: 0 inequality constraints with only upper bounds: 0 iter objective inf_pr inf_du lg(mu) ||d|| lg(rg) alpha_du alpha_pr ls 0 1.0000000e-01 1.38e+04 2.95e-01 0.0 0.00e+00 - 0.00e+00 0.00e+00 0 Number of Iterations....: 23 (scaled) (unscaled) Objective...............: 1.7333186292764071e+03 1.7333186292764071e+03 Dual infeasibility......: 1.7514678841619469e-11 1.7514678841619469e-11 Constraint violation....: 2.4882819844874104e-16 2.0428103653102880e-14 Complementarity.........: 1.0007892585840845e-11 1.0007892585840845e-11 Overall NLP error.......: 1.0007892585840845e-11 1.7514678841619469e-11 Number of objective function evaluations = 24 Number of objective gradient evaluations = 24 Number of equality constraint evaluations = 24 Number of inequality constraint evaluations = 0 Number of equality constraint Jacobian evaluations = 24 Number of inequality constraint Jacobian evaluations = 0 Number of Lagrangian Hessian evaluations = 23 Total CPU secs in IPOPT (w/o function evaluations) = 0.114 Total CPU secs in NLP function evaluations = 0.003 EXIT: Optimal Solution Found. NLP0012I Num Status Obj It time Location NLP0014I 1 OPT 1733.3186 23 0.117 Cbc3007W No integer variables - nothing to do Bonmin finished. Found feasible solution. Objective function value = 1733.32. Resolve with fixed discrete variables to get dual values. NLP0012I Num Status Obj It time Location NLP0014I 1 OPT 1733.3186 11 0.027 Best solution: 1.733319e+03 (0 nodes, 0.203 seconds) Best possible: 1.733319e+03 (only reliable for convex models) Absolute gap: 0.000000e+00 (absolute tolerance optca: 0) Relative gap: 0.000000e+00 (relative tolerance optcr: 0.0001) --- Reading solution for model LEASTSQ --- Executing after solve: elapsed 0:00:08.416 --- NOM_16112022.gms(726) 5 Mb --- Generating NLP model ThirdStage --- NOM_16112022.gms(727) 7 Mb --- 161 rows 181 columns 429 non-zeroes --- 100 nl-code 20 nl-non-zeroes --- Range statistics (absolute non-zero finite values) --- RHS [min, max] : [ 1.092E+01, 3.457E+01] - Zero values observed as well --- Bound [min, max] : [ 1.000E+00, 6.071E+01] - Zero values observed as well --- Matrix [min, max] : [ 1.000E-04, 2.640E+07] --- NOM_16112022.gms(727) 5 Mb --- Executing MOSEK (Solvelink=2): elapsed 0:00:08.499 MOSEK 39.1.0 5f04cd76 May 3, 2022 WEI x86 64bit/MS Window M O S E K version 9.3.20 (Build date: 2022-4-27 08:24:47) Copyright (C) MOSEK ApS, Fruebjergvej 3, Box 16 DK-2100 Copenhagen, Denmark https://www.mosek.com Reading parameter(s) from "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\mosek.opt" >> *MSK_IPAR_SIM_DUAL_RESTRICT_SELECTION = 100 >> >> *MSK_IPAR_SIM_REFORMULATION=MSK_SIM_REFORMULATION_ON >> >> *MSK_IPAR_SIM_SWITCH_OPTIMIZER= MSK_ON >> >> *MSK_DPAR_INTPNT_CO_TOL_MU_RED = 1e-08 >> >> *MSK_DPAR_INTPNT_TOL_DSAFE =1000 >> >> * Controls how close the interior-point optimizer follows the central path. ? >> * A large value of this parameter means the central path is followed very closely. >> * On numerically unstable problems it may be worthwhile to increase this parameter. >> >> MSK_DPAR_INTPNT_TOL_PATH=0.35 >> *Default: 1e-08 >> >> *Controls the initial primal starting point used by the interior-point optimizer. ? >> * If the interior-point optimizer converges slowly and/or the constraint or variable bounds are very large >> * then it may be worthwhile to increase this value. >> * Default: 1 >> >> *MSK_DPAR_INTPNT_TOL_PSAFE =0.05 >> >> >> *MSK_DPAR_INTPNT_TOL_STEP_SIZE = 1 >> >> *MSK_IPAR_INTPNT_SOLVE_FORM= MSK_SOLVE_DUAL >> >> *MSK_IPAR_INTPNT_STARTING_POINT = MSK_STARTING_POINT_GUESS >> >> *MSK_IPAR_LOG_INTPNT=5 >> >> *MSK_IPAR_MIO_CONIC_OUTER_APPROXIMATION = MSK_ON >> >> *MSK_IPAR_OPTIMIZER= MSK_OPTIMIZER_CONIC Finished reading from "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\mosek.opt" Time to extract information on quadratics: 0 Setting up initial basis solution. 210 basis variables are specified but 160 are expected. (405) Problem Name : Objective sense : max Type : CONIC (conic optimization problem) Constraints : 160 Cones : 10 Scalar variables : 180 Matrix variables : 0 Integer variables : 0 Optimizer started. Presolve started. Linear dependency checker started. Linear dependency checker terminated. Eliminator started. Freed constraints in eliminator : 105 Eliminator terminated. Eliminator started. Freed constraints in eliminator : 10 Eliminator terminated. Eliminator - tries : 2 time : 0.00 Lin. dep. - tries : 1 time : 0.00 Lin. dep. - number : 0 Presolve terminated. Time: 0.00 Problem Name : Objective sense : max Type : CONIC (conic optimization problem) Constraints : 160 Cones : 10 Scalar variables : 180 Matrix variables : 0 Integer variables : 0 Optimizer - threads : 1 Optimizer - solved problem : the dual Optimizer - Constraints : 10 Optimizer - Cones : 10 Optimizer - Scalar variables : 50 conic : 30 Optimizer - Semi-definite variables: 0 scalarized : 0 Factor - setup time : 0.00 dense det. time : 0.00 Factor - ML order time : 0.00 GP order time : 0.00 Factor - nonzeros before factor : 10 after factor : 10 Factor - dense dim. : 0 flops : 1.10e+02 ITE PFEAS DFEAS GFEAS PRSTATUS POBJ DOBJ MU TIME 0 1.4e+05 2.1e+01 9.3e+00 0.00e+00 5.341683306e+06 5.341691585e+06 1.0e+00 0.00 1 6.0e+04 9.2e+00 6.1e+00 -1.00e+00 5.341877961e+06 5.341884941e+06 4.4e-01 0.02 2 1.4e+04 2.2e+00 3.0e+00 -1.00e+00 5.343190060e+06 5.343189679e+06 1.0e-01 0.02 3 6.0e+02 9.3e-02 6.1e-01 -9.99e-01 5.382958933e+06 5.382744207e+06 4.4e-03 0.02 4 1.6e+02 2.5e-02 3.1e-01 -9.76e-01 5.515766397e+06 5.514980763e+06 1.2e-03 0.02 5 7.1e+01 1.1e-02 1.9e-01 -8.96e-01 5.876586016e+06 5.875026052e+06 5.2e-04 0.02 6 3.4e+01 5.3e-03 1.1e-01 -7.00e-01 6.773399591e+06 6.771161350e+06 2.5e-04 0.02 7 1.8e+01 2.7e-03 5.2e-02 -2.45e-01 8.151116149e+06 8.149178252e+06 1.3e-04 0.02 8 5.0e+00 7.7e-04 9.7e-03 2.83e-01 1.009038098e+07 1.008956043e+07 3.6e-05 0.02 9 2.2e+00 3.4e-04 3.0e-03 7.48e-01 1.065942118e+07 1.065900898e+07 1.6e-05 0.02 10 6.5e-01 1.0e-04 5.1e-04 8.52e-01 1.102368394e+07 1.102354848e+07 4.7e-06 0.03 11 1.2e-01 1.8e-05 4.1e-05 9.37e-01 1.115793564e+07 1.115790883e+07 8.5e-07 0.03 12 2.6e-02 3.9e-06 4.2e-06 9.85e-01 1.118180399e+07 1.118179801e+07 1.9e-07 0.03 13 3.0e-03 4.7e-07 1.7e-07 9.96e-01 1.118777247e+07 1.118777176e+07 2.2e-08 0.03 14 7.6e-04 1.2e-07 2.2e-08 9.99e-01 1.118837451e+07 1.118837433e+07 5.5e-09 0.03 15 1.1e-05 1.6e-09 3.6e-11 1.00e+00 1.118857221e+07 1.118857220e+07 7.7e-11 0.03 16 9.0e-06 1.4e-09 4.9e-11 -9.02e+00 1.118857043e+07 1.118857043e+07 5.4e-11 0.03 17 2.0e-06 3.1e-10 5.3e-12 6.54e-01 1.118857388e+07 1.118857388e+07 9.8e-12 0.03 18 1.6e-06 2.5e-10 3.9e-12 8.58e-01 1.118857410e+07 1.118857410e+07 7.5e-12 0.03 19 1.5e-06 2.4e-10 3.7e-12 6.92e-01 1.118857413e+07 1.118857413e+07 6.9e-12 0.03 20 1.5e-06 2.4e-10 3.7e-12 -4.30e+01 1.118857413e+07 1.118857413e+07 6.9e-12 0.03 21 1.5e-06 2.4e-10 3.7e-12 -4.30e+01 1.118857413e+07 1.118857413e+07 6.9e-12 0.03 22 1.3e-06 2.0e-10 4.7e-12 -4.72e+00 1.118857360e+07 1.118857359e+07 4.8e-12 0.03 23 9.0e-08 1.4e-11 6.7e-14 9.31e-01 1.118857493e+07 1.118857493e+07 1.9e-13 0.05 24 4.4e-10 7.4e-14 2.6e-16 1.37e+00 1.118857503e+07 1.118857503e+07 1.2e-14 0.05 Optimizer terminated. Time: 0.05 Interior-point solution summary Problem status : PRIMAL_AND_DUAL_FEASIBLE Solution status : OPTIMAL Primal. obj: 1.1188575029e+07 nrm: 2e+07 Viol. con: 5e-10 var: 0e+00 cones: 0e+00 Dual. obj: 1.1188575029e+07 nrm: 8e+04 Viol. con: 0e+00 var: 3e-07 cones: 0e+00 Basic solution summary Problem status : UNKNOWN Solution status : UNKNOWN Primal. obj: 1.1193836808e+07 nrm: 2e+07 Viol. con: 1e+06 var: 0e+00 cones: 0e+00 Dual. obj: 0.0000000000e+00 nrm: 3e+00 Viol. con: 3e+00 var: 3e+03 cones: 0e+00 Return code - 0 [MSK_RES_OK]: No error occurred. --- Reading solution for model ThirdStage --- Executing after solve: elapsed 0:00:08.688 --- NOM_16112022.gms(749) 5 Mb --- GDX File (execute_unload) C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\baseline.gdx --- NOM_16112022.gms(903) 5 Mb --- Generating NLP model FOurthStage --- NOM_16112022.gms(904) 7 Mb --- 161 rows 181 columns 429 non-zeroes --- 100 nl-code 20 nl-non-zeroes --- Range statistics (absolute non-zero finite values) --- RHS [min, max] : [ 1.092E+01, 3.457E+01] - Zero values observed as well --- Bound [min, max] : [ 1.000E+00, 3.420E+02] - Zero values observed as well --- Matrix [min, max] : [ 1.000E-04, 2.640E+07] --- NOM_16112022.gms(904) 5 Mb --- Executing MOSEK (Solvelink=2): elapsed 0:00:08.701 MOSEK 39.1.0 5f04cd76 May 3, 2022 WEI x86 64bit/MS Window M O S E K version 9.3.20 (Build date: 2022-4-27 08:24:47) Copyright (C) MOSEK ApS, Fruebjergvej 3, Box 16 DK-2100 Copenhagen, Denmark https://www.mosek.com Reading parameter(s) from "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\mosek.opt" >> *MSK_IPAR_SIM_DUAL_RESTRICT_SELECTION = 100 >> >> *MSK_IPAR_SIM_REFORMULATION=MSK_SIM_REFORMULATION_ON >> >> *MSK_IPAR_SIM_SWITCH_OPTIMIZER= MSK_ON >> >> *MSK_DPAR_INTPNT_CO_TOL_MU_RED = 1e-08 >> >> *MSK_DPAR_INTPNT_TOL_DSAFE =1000 >> >> * Controls how close the interior-point optimizer follows the central path. ? >> * A large value of this parameter means the central path is followed very closely. >> * On numerically unstable problems it may be worthwhile to increase this parameter. >> >> MSK_DPAR_INTPNT_TOL_PATH=0.35 >> *Default: 1e-08 >> >> *Controls the initial primal starting point used by the interior-point optimizer. ? >> * If the interior-point optimizer converges slowly and/or the constraint or variable bounds are very large >> * then it may be worthwhile to increase this value. >> * Default: 1 >> >> *MSK_DPAR_INTPNT_TOL_PSAFE =0.05 >> >> >> *MSK_DPAR_INTPNT_TOL_STEP_SIZE = 1 >> >> *MSK_IPAR_INTPNT_SOLVE_FORM= MSK_SOLVE_DUAL >> >> *MSK_IPAR_INTPNT_STARTING_POINT = MSK_STARTING_POINT_GUESS >> >> *MSK_IPAR_LOG_INTPNT=5 >> >> *MSK_IPAR_MIO_CONIC_OUTER_APPROXIMATION = MSK_ON >> >> *MSK_IPAR_OPTIMIZER= MSK_OPTIMIZER_CONIC Finished reading from "C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\mosek.opt" Time to extract information on quadratics: 0 Setting up initial basis solution. 0 basis variables are expected but only 160 basis variables are specified. (400) Problem Name : Objective sense : max Type : CONIC (conic optimization problem) Constraints : 160 Cones : 10 Scalar variables : 180 Matrix variables : 0 Integer variables : 0 Optimizer started. Presolve started. Linear dependency checker started. Linear dependency checker terminated. Eliminator started. Freed constraints in eliminator : 105 Eliminator terminated. Eliminator started. Freed constraints in eliminator : 10 Eliminator terminated. Eliminator - tries : 2 time : 0.00 Lin. dep. - tries : 1 time : 0.00 Lin. dep. - number : 0 Presolve terminated. Time: 0.00 Problem Name : Objective sense : max Type : CONIC (conic optimization problem) Constraints : 160 Cones : 10 Scalar variables : 180 Matrix variables : 0 Integer variables : 0 Optimizer - threads : 1 Optimizer - solved problem : the dual Optimizer - Constraints : 10 Optimizer - Cones : 10 Optimizer - Scalar variables : 50 conic : 30 Optimizer - Semi-definite variables: 0 scalarized : 0 Factor - setup time : 0.00 dense det. time : 0.00 Factor - ML order time : 0.00 GP order time : 0.00 Factor - nonzeros before factor : 10 after factor : 10 Factor - dense dim. : 0 flops : 1.10e+02 ITE PFEAS DFEAS GFEAS PRSTATUS POBJ DOBJ MU TIME 0 1.4e+05 2.5e+01 9.3e+00 0.00e+00 1.688022166e-09 8.278383992e+00 1.0e+00 0.01 1 6.0e+04 1.1e+01 6.1e+00 -1.00e+00 2.587095403e+02 2.656901713e+02 4.4e-01 0.03 2 1.4e+04 2.6e+00 3.0e+00 -1.00e+00 1.988241361e+03 1.987866470e+03 1.0e-01 0.03 3 6.3e+02 1.1e-01 6.2e-01 -9.99e-01 5.254876174e+04 5.234173444e+04 4.6e-03 0.03 4 2.4e+02 4.3e-02 3.8e-01 -9.77e-01 1.570388565e+05 1.564949117e+05 1.7e-03 0.03 5 1.0e+02 1.8e-02 2.3e-01 -9.31e-01 4.709498877e+05 4.697691572e+05 7.3e-04 0.03 6 3.0e+01 5.5e-03 1.0e-01 -8.02e-01 1.969511325e+06 1.966897264e+06 2.2e-04 0.03 7 1.4e+01 2.6e-03 4.2e-02 -1.46e-01 4.074463223e+06 4.072567384e+06 1.0e-04 0.03 8 3.0e+00 5.5e-04 4.8e-03 4.17e-01 6.613213455e+06 6.612656071e+06 2.2e-05 0.03 9 2.3e+00 4.3e-04 3.4e-03 7.86e-01 6.776890478e+06 6.776429763e+06 1.7e-05 0.03 10 1.2e+00 2.1e-04 1.2e-03 8.25e-01 7.120014103e+06 7.119768628e+06 8.5e-06 0.03 11 8.5e-02 1.6e-05 2.6e-05 9.12e-01 7.463296882e+06 7.463276962e+06 6.2e-07 0.03 12 1.2e-02 2.2e-06 1.4e-06 9.83e-01 7.487696384e+06 7.487693430e+06 8.7e-08 0.03 13 1.4e-03 2.6e-07 5.7e-08 9.98e-01 7.491251472e+06 7.491251122e+06 1.0e-08 0.03 14 6.7e-05 1.2e-08 5.9e-10 1.00e+00 7.491704984e+06 7.491704967e+06 4.9e-10 0.05 15 5.3e-06 9.5e-10 9.5e-12 1.31e+00 7.491726250e+06 7.491726249e+06 4.6e-11 0.05 16 8.4e-07 1.6e-10 6.0e-13 1.03e+00 7.491727537e+06 7.491727537e+06 5.5e-12 0.05 17 3.4e-09 1.4e-12 5.1e-16 1.23e+00 7.491727770e+06 7.491727770e+06 2.0e-13 0.05 Optimizer terminated. Time: 0.06 Interior-point solution summary Problem status : PRIMAL_AND_DUAL_FEASIBLE Solution status : OPTIMAL Primal. obj: 7.4917277700e+06 nrm: 2e+07 Viol. con: 5e-10 var: 0e+00 cones: 0e+00 Dual. obj: 7.4917277700e+06 nrm: 6e+04 Viol. con: 0e+00 var: 8e-07 cones: 0e+00 Basic solution summary Problem status : UNKNOWN Solution status : UNKNOWN Primal. obj: 7.4917277702e+06 nrm: 2e+07 Viol. con: 3e+06 var: 0e+00 cones: 0e+00 Dual. obj: 5.4568507437e+06 nrm: 8e+04 Viol. con: 8e+04 var: 4e+04 cones: 0e+00 Return code - 0 [MSK_RES_OK]: No error occurred. --- Reading solution for model FOurthStage --- Executing after solve: elapsed 0:00:08.916 --- NOM_16112022.gms(944) 5 Mb --- GDX File (execute_unload) C:\Users\FernandezM\OneDrive - DairyNZ Limited\Documents\HWEN\Model\Results.gdx *** Status: Normal completion --- Job NOM_16112022.gms Stop 11/15/22 11:27:33 elapsed 0:00:08.918