Output from FIND_GLOBAL_MIN on  05/04/2012  at  17:44:00.
 Version for the system is: March 13, 2009

 Codelist file name is: ex7_3_3G.CDL
 Box data file name is: ex7_3_3.DT1                   


 Initial box:
[  -0.100E+05,   0.100E+05 ], [  -0.100E+05,   0.100E+05 ]
[    0.00    ,    10.0     ], [  -0.100E+05,   0.100E+05 ]
[  -0.100E+05,   0.100E+05 ]


 BOUND_CONSTRAINT:
   F F   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.

 THERE WERE NO BOXES IN THE LIST OF SMALL BOXES.

 LIST OF BOXES CONTAINING VERIFIED FEASIBLE POINTS:

 Box no.:           1
 Box coordinates:
[    2.45    ,    2.46     ], [    1.91    ,    1.91     ]
[    1.35    ,    1.35     ], [    2.72    ,    2.73     ]
[   0.817    ,   0.819     ]

PHI:
[   0.817    ,   0.819     ]
 Box contains the following approximate root:
   2.45    ,    1.91    ,    1.35    ,    2.73    ,   0.818    

 OBJECTIVE ENCLOSURE AT APPROXIMATE ROOT:
[   0.818    ,   0.818     ]
 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:            6
 No. dense interval residual evaluations -- gradient code list:          338
 Number of orig. system inverse midpoint preconditioner rows:          505
 Number of orig. system C-LP preconditioner rows:          173
 Number of solutions for a component in the expanded system:        10617
 Total number of forward_substitutions:         1271
 Number of Gauss--Seidel steps on the dense system:          809
 Number point dense residual evaluations, gradient codelist:           73
 Number of gradient evaluations from a gradient code list:           67
 Total number of dense slope matrix evaluations:          816
 Total number second-order interval evaluations of the
       original function:           36
 Total number dense interval constraint evaluations:         7554
 Total number dense interval constraint gradient component
       evaluations:        26750
 Total number dense point constraint gradient component
       evaluations:         3350
 Total number dense interval reduced gradient evaluations:          612
 Total number of calls to FRITZ_JOHN_RESIDUALS:          156
 Average number of overall loop iterations in each
       call to the reduced interval Newton method):     8.47    
 Number of times a box was rejected in the interval Newton
       method due to an empty intersection:           11
 Number of times the interval Newton method made a coordinate
       interval smaller:          422
 Number of times a pivoting preconditioner made a coordinate
       interval smaller or rejected a coordinate:          159
 Number of times a pivoting preconditioner was
       successful after the first sweep:          132
 Number of times a midpoint matrix was factored:          42
 Total number of times the reduced interval Newton method
       was tried:           17
 Number of times an inverse midpoint preconditioner led
       to improvement or rejection:          121
 Number of times a C LP preconditioner led
       to improvement or rejection:           44
 N_C_LP_INFEASIBLE =           10
 N_LPF_INF_OR_UNB =           10
 Number of possible splits as detected
       by the pivoting preconditioner:          144
 Total time spent in the LP filter (creating and
       solving the LP):    0.520E-01
 Total time spent in subsit
       (constraint propagation):    0.400E-02
 Total time spent in reduced_interval_Newton
       (iteration to reduce the box):    0.520E-01
 Total time spent actually solving the linear relaxations:    0.520E-01
 Total time spent doing linear algebra (preconditioners
       and solution processes):    0.400E-01
 FUNCTION_EVALUATION_TIME (in forward_substitution):   0.400E-02
 Time spent setting up pivoting preconditioners:    0.120E-01
 Time spent computing pivoting preconditioners:    0.120E-01
 Number Fritz-John matrix evaluations:          156
 Number of times SUBSIT decreased one or more 
       coordinate widths:           11
 Number of times SUBSIT rejected a box:            4
 Total number of boxes processed in loop:           21
 N_FINDOPT_SUCCESS =            4
 BEST_ESTIMATE:   0.818    
 Overall CPU time:   0.200    
 CPU time in PEEL_BOUNDARY:    0.00    
 CPU time in REDUCED_INTERVAL_NEWTON:   0.520E-01

 ===================================================
 ===================================================

 Number of boxes in the list with proven feasible points:           1
 Number of boxes in the list of other small boxes:           0
 Number of unfathomed boxes:           0
 Interval hull of the boxes verified to contain
 feasible points or critical points:
[    2.45    ,    2.46     ], [    1.91    ,    1.91     ]
[    1.35    ,    1.35     ], [    2.72    ,    2.73     ]
[   0.817    ,   0.819     ]

 Rigorously verified bounds on the optimum,
 provided an optimum exists:
[   0.817    ,   0.818     ]