Output from FIND_GLOBAL_MIN on 05/08/2012 at 00:46:57. Version for the system is: March 13, 2009 Codelist file name is: ex6_2_14G.CDL Box data file name is: ex6_2_14.DT1 Initial box: [ 0.100E-06, 0.500 ], [ 0.100E-06, 0.500 ] [ 0.100E-06, 0.500 ], [ 0.100E-06, 0.500 ] BOUND_CONSTRAINT: F F F F F F F F --------------------------------------- CONFIGURATION VALUES: EPS_DOMAIN: 0.1000D-07 MAXITR: 500000 SMALLEST_LIST_BOX_SIZE = 0.0000D+00 A_PRIORI_UPPER_BOUND (on global optimum): 0.180+309 MAX_CPU_SECONDS: 0.720E+04 MAX_LP_PRE: 10000000 ALSO_PRINT_TO_TERMINAL F NO_ABSOLUTE_VALUE_IN_MINIMAX F MAX_PT_SOLVER_ITER 3000 MAX_SMALL_BOXES 2000 MAX_BEFORE_AMALGAMATE 200 DO_INTERVAL_NEWTON: T QUADRATIC: T FULL_SPACE: F VERY_GOOD_INITIAL_GUESS: F USE_SUBSIT: T OUTPUT UNIT: 7 PRINT_LENGTH: 3 USE_INTRINSIC_PRINTING: T PHI_MUST_CONVERGE: T EQ_CNS_MUST_CONVERGE: T INEQ_CNS_MUST_CONVERGE: T ALLOW_EPSILON_APPROXIMATE: F USES_INTERMEDIATE_VARIABLES: F PHI_THICKNESS_FACTOR: 0.500 EQ_CNS_THICKNESS_FACTOR: 0.500 INEQ_CNS_THICKNESS_FACTOR: 0.500 PHI_MUST_CONVERGE: T EQ_CNS_MUST_CONVERGE: T INEQ_CNS_MUST_CONVERGE: T PHI_CONVERGENCE_FACTOR: 0.100E-13 EQ_CNS_CONVERGENCE_FACTOR: 0.100E-13 INEQ_CNS_CONVERGENCE_FACTOR: 0.100E-13 CONTINUITY_ACROSS_BRANCHES: F SINGULAR_EXPANSION_FACTOR: 10.0 HEURISTIC PARAMETER ALPHA: 0.500 APPROX_OPT_BEFORE_BISECTION: F APPROX_OPTIMIZER_TYPE 7 USE_LP: T ITERATE__LP: F EPS_LP_FIT: 1.00000000000000002E-002 USE_EPPERLY_SPLIT: 0 PRINTING_IN_SPLIT 0 USE_REDUCED_SPACE: F REDUCED_IN_BISECTION: T USE_TAYLOR_EQUALITY_CONSTRAINTS F USE_TAYLOR_INEQ_CONSTRAINTS F USE_TAYLOR_OBJECTIVE F USE_TAYLOR_EQ_CNS_GRD F USE_TAYLOR_GRAD F USE_TAYLOR_INEQ_CNS_GRD F USE_TAYLOR_REDUCED_INEWTON F COSY_POLYNOMIAL_ORDER 5 LEAST_SQUARES_FUNCTIONS: F NONLINEAR_SYSTEM: F UNCONSTRAINED_MINIMAX: F NO_ABSOLUTE_VALUE_IN_MINIMAX: F DO_INFEASIBILITY_CHECK: T DO_PIVOTING: T DO_INV_MID: T TRY_C_LP_HEURISTIC: 10000000000.000000 REUSE_PRECONDITIONERS: T ORDERED_LIST_IN_COMPLEMENTATION 1 DO_PROBE: F DO_PROBE_TESTS_3_AND_4: F USE_INEQ_PERTURB_FOR_FEAS: F DO_SPLITS_IN_SUBSIT F PRINTING_IN_VALIDATE_FJ: 0 PRINT_SUBSIT: 0 ALSO_PRINT_TO_TERMINAL F C-LP is used for computing C-LP preconditioners. UNCONSTRAINED_MINIMAX F NO_ABSOLUTE_VALUE_IN_MINIMAX F MINIMAX_FORMULATION_2 T C_LP_DENSE, Manuel Novoa's special routine, was used to compute LP preconditioners. LIST OF SMALL BOXES: Box no.: 1 Box coordinates: [ 0.498 , 0.500 ], [ 0.100E-06, 0.150E-02 ] [ 0.250 , 0.252 ], [ 0.248 , 0.250 ] PHI: [ -0.804 , -0.549 ] Box contains the following approximate root: 0.500 , 0.900E-07, 0.251 , 0.249 OBJECTIVE ENCLOSURE AT APPROXIMATE ROOT: [ -0.695 , -0.695 ] Unknown = T Contains_root = F Fritz John multiplier U0: [ 0.393E-01, 0.393E-01 ] Fritz John multipliers U: [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] [ 0.959 , 0.959 ], [ 0.00 , 1.00 ] [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] Fritz John multipliers V: [ 0.320E-01, 0.320E-01 ], [ 0.318E-01, 0.318E-01 ] INEQ_CERT_FEASIBLE: T T F T T T T T NIN_POSS_BINDING: 1 ------------------------------------------------- Box no.: 2 Box coordinates: [ 0.100E-06, 0.150E-02 ], [ 0.498 , 0.500 ] [ 0.248 , 0.250 ], [ 0.250 , 0.252 ] PHI: [ -0.804 , -0.549 ] Box contains the following approximate root: 0.900E-07, 0.500 , 0.249 , 0.251 OBJECTIVE ENCLOSURE AT APPROXIMATE ROOT: [ -0.695 , -0.695 ] Unknown = T Contains_root = F Fritz John multiplier U0: [ 0.393E-01, 0.393E-01 ] Fritz John multipliers U: [ 0.959 , 0.959 ], [ 0.00 , 1.00 ] [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] Fritz John multipliers V: [ 0.320E-01, 0.320E-01 ], [ 0.318E-01, 0.318E-01 ] INEQ_CERT_FEASIBLE: F T T T T T T T NIN_POSS_BINDING: 1 ------------------------------------------------- LIST OF BOXES CONTAINING VERIFIED FEASIBLE POINTS: Box no.: 1 Box coordinates: [ 0.249 , 0.251 ], [ 0.249 , 0.251 ] [ 0.249 , 0.251 ], [ 0.249 , 0.251 ] PHI: [ 0.208E-01, 0.176 ] Box contains the following approximate root: 0.250 , 0.250 , 0.250 , 0.250 OBJECTIVE ENCLOSURE AT APPROXIMATE ROOT: [ 0.987E-01, 0.987E-01 ] Unknown = T Contains_root = F Fritz John multiplier U0: [ 0.00 , 1.00 ] Fritz John multipliers U: [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] [ 0.00 , 1.00 ], [ 0.00 , 1.00 ] Fritz John multipliers V: [ -1.00 , 1.00 ], [ -1.00 , 1.00 ] INEQ_CERT_FEASIBLE: F F F F F F F F NIN_POSS_BINDING: 8 ------------------------------------------------- ALGORITHM COMPLETED WITH LESS THAN THE MAXIMUM NUMBER, 500000 OF BOXES. Number of bisections: 6520 No. dense interval residual evaluations -- gradient code list: 193435 Number of orig. system inverse midpoint preconditioner rows: 181122 Number of orig. system C-LP preconditioner rows: 57191 Number of solutions for a component in the expanded system: 784617 Total number of forward_substitutions: 704255 Number of Gauss--Seidel steps on the dense system: 263336 Number point dense residual evaluations, gradient codelist: 169961 Number of gradient evaluations from a gradient code list: 50264 Total number of dense slope matrix evaluations: 233118 Total number second-order interval evaluations of the original function: 32778 Total number dense interval constraint evaluations: 2929896 Total number dense interval constraint gradient component evaluations: 6635720 Total number dense point constraint gradient component evaluations: 6723120 Total number dense interval reduced gradient evaluations: 207665 Total number of calls to FRITZ_JOHN_RESIDUALS: 53749 Number of times a box was rejected because the gradient or reduced gradient did not contain zero: 3662 Average number of overall loop iterations in each call to the reduced interval Newton method): 4.33 Number of times a box was rejected in the interval Newton method due to an empty intersection: 2224 Number of times the interval Newton method made a coordinate interval smaller: 82153 Number of times a pivoting preconditioner made a coordinate interval smaller or rejected a coordinate: 38574 Number of times a pivoting preconditioner was successful after the first sweep: 23633 Number of times a midpoint matrix was factored: 24224 Total number of times the reduced interval Newton method was tried: 12408 Number of times an inverse midpoint preconditioner led to improvement or rejection: 33497 Number of times a C LP preconditioner led to improvement or rejection: 12288 Number of times computing a C_LP failed 1000 Number of possible splits as detected by the pivoting preconditioner: 50082 Total time spent in the LP filter (creating and solving the LP): 72.0 Total time spent in subsit (constraint propagation): 2.56 Total time spent in reduced_interval_Newton (iteration to reduce the box): 56.9 Total time spent searching for "D" in the LP filter: 0.608 Total time spent actually solving the linear relaxations: 55.2 Total time spent doing linear algebra (preconditioners and solution processes): 6.51 Total time spent running the approximate optimizer: 1.44 LIST_BOOKKEEPING_TIME: 2.74 FUNCTION_EVALUATION_TIME (in forward_substitution): 106. Time spent setting up pivoting preconditioners: 0.976 Time spent computing pivoting preconditioners: 0.980 Time spent computing LP preconditioners: 1.17 Time spent computing inverse midpoint preconditioners: 0.484 Number of times MAXIT was exceeded in C_LP_DENSE: 516 Number of unbounded problems found in C_LP_DENSE: 1000 Number of times the approximate solver was called: 5763 Number Fritz-John matrix evaluations: 50085 Number of times SUBSIT decreased one or more coordinate widths: 762 Number times a box was rejected due infeasible inequality constraints: 5763 Total number of boxes processed in loop: 12408 N_FINDOPT_SUCCESS = 5762 BEST_ESTIMATE: 0.987E-01 Overall CPU time: 422. CPU time in PEEL_BOUNDARY: 0.00 CPU time in REDUCED_INTERVAL_NEWTON: 56.9 =================================================== =================================================== Number of boxes in the list with proven feasible points: 1 Number of boxes in the list of other small boxes: 2 Number of unfathomed boxes: 0 Interval hull of the boxes verified to contain feasible points or critical points: [ 0.249 , 0.251 ], [ 0.249 , 0.251 ] [ 0.249 , 0.251 ], [ 0.249 , 0.251 ] Interval hull of the small unverified boxes: [ 0.100E-06, 0.500 ], [ 0.100E-06, 0.500 ] [ 0.248 , 0.252 ], [ 0.248 , 0.252 ] Rigorously verified bounds on the optimum, provided an optimum exists: [ -0.804 , 0.987E-01 ]