DONLP2: intakt=1 outlev=1 silent=0 tau0=1e4 /tmp/at5847 N= 4 NH= 1 NG= 4 EPSX=0.1000D-04 SIGSM=0.1490D-07 STARTVALUE 0.00000000D+00 0.00000000D+00 0.00000000D+00 0.00000000D+00 EPS= 0.222D-15 TOL= 0.198-322 DEL0= 0.100D+01 DELM= 0.100D-05 TAU0= 0.100D+05 TAU= 0.100D+00 SD= 0.100D+00 SW= 0.367D-10 RHO= 0.100D-05 RHO1= 0.100D-09 SCFM= 0.100D+05 C1D= 0.100D-01 EPDI= 0.100D-07 NRE= 4 ANAL= T TERMINATION REASON: KT-CONDITIONS (RELAXED) SATISFIED, SINGULAR POINT EVALUATIONS OF F 1 EVALUATIONS OF GRAD F 1 EVALUATIONS OF CONSTRAINTS 5 EVALUATIONS OF GRADS OF CONSTRAINTS 1 FINAL SCALING OF OBJECTIVE 0.1000000D+01 NORM OF GRAD(F) 0.2645755D+01 LAGRANGIAN VIOLATION 0.4000000D-05 FEASIBILITY VIOLATION 0.2000000D-05 DUAL FEASIBILITY VIOLATION 0.0000000D+00 OPTIMIZER RUNTIME SEC'S 0.0000000E+00 OPTIMAL VALUE OF F = 0.350001000000800D+01 OPTIMAL SOLUTION X = 0.100000200000000D+01 0.100000200000000D+01 0.100000200000000D+01 0.200000200000000D+01 MULTIPLIERS ARE RELATIV TO SCF=1 NR. CONSTRAINT NORMGRAD (OR 1) MULTIPLIER 1 -0.20000000D-05 0.17320508D+01 -0.10000000D+01 2 0.20000000D-05 0.10000000D+01 0.00000000D+00 3 0.20000000D-05 0.10000000D+01 0.00000000D+00 4 0.20000000D-05 0.10000000D+01 0.10000000D+01 5 0.20000000D-05 0.10000000D+01 0.30000000D+01 EVALUATIONS OF RESTRICTIONS AND THEIR GRADIENTS ( 1, 1) ( 1, 0) ( 1, 0) ( 1, 0) ( 1, 0) LAST ESTIMATE OF COND.NR. OF ACTIVE GRADIENTS 0.2121E+01 LAST ESTIMATE OF COND.NR. OF APPROX. HESSIAN 0.1000E+01 ITERATIVE STEPS TOTAL 1 # OF RESTARTS 0 # OF FULL REGULAR UPDATES 0 # OF UPDATES 0 # OF REGULARIZED FULL SQP-STEPS 1 DONLP2: relaxed KKT conditions satisfied: singular point F = 3.50001 1 iters; 1 function, 1 gradient evals 5 component constraint, 1 grad evals final objective scaling = 1 norm(grad(f)) = 2.64576, Lagrangian violation = 4e-06 feas. violation = 2e-06, dual feas. violation = 0