# to unbundle, sh this file (in an empty directory) echo smadsen.out 1>&2 sed >smadsen.out <<'//GO.SYSIN DD smadsen.out' 's/^-//' - GLG ON PROBLEM MADSEN... - - I INITIAL X(I) D(I) - - 1 .300000E+01 .707E+01 - 2 .100000E+01 .507E+01 - - IT NF F RELDF PRELDF RELDX MODEL STPPAR D*STEP NPRELDF - - 0 1 .847E+02 - 1 3 .365E+02 .57E+00 .62E+00 .7E-01 G .3E+01 .4E+01 .98E+00 - 2 4 .443E+01 .88E+00 .95E+00 .2E+00 G .0E+00 .6E+01 .95E+00 - 3 6 .128E+01 .71E+00 .67E+00 .3E+00 G-S .0E+00 .5E+01 .67E+00 - 4 7 .593E+00 .54E+00 .59E+00 .1E+01 S .0E+00 .3E+01 .59E+00 - 5 8 .415E+00 .30E+00 .24E+00 .1E+00 S .0E+00 .5E+00 .24E+00 - 6 9 .390E+00 .60E-01 .87E-01 .7E-01 G .0E+00 .3E+00 .87E-01 - 7 10 .387E+00 .89E-02 .89E-02 .4E-01 S .0E+00 .1E+00 .89E-02 - 8 11 .387E+00 .24E-04 .23E-04 .2E-02 S .0E+00 .5E-02 .23E-04 - 9 12 .387E+00 .00E+00 .32E-07 .8E-04 G .0E+00 .2E-03 .32E-07 - - ***** X- AND RELATIVE FUNCTION CONVERGENCE ***** - - FUNCTION .386600E+00 RELDX .815E-04 - FUNC. EVALS 12 GRAD. EVALS 9 - PRELDF .317E-07 NPRELDF .317E-07 - - I FINAL X(I) D(I) G(I) - - 1 -.155462E+00 .138E+01 .511E-04 - 2 .694676E+00 .149E+01 .218E-03 - - 3 EXTRA FUNC. EVALS FOR COVARIANCE AND DIAGNOSTICS. - 3 EXTRA GRAD. EVALS FOR COVARIANCE AND DIAGNOSTICS. - - SQRT(RECIPROCAL CONDITION OF F.D. HESSIAN) = AT MOST .64 - - COVARIANCE = H**-1, WHERE H = FINITE-DIFFERENCE HESSIAN - - ROW 1 .649 - ROW 2 -.264 .575 - REGRESSION DIAGNOSTIC = 0.5 * G(I)**T * H(I)**-1 * H * H(I)**-1 * G(I)... - .733 .565E-01 .119 - GLG NEEDED LIV .GE. ,I3,12H AND LV .GE. 92 - GLG NEEDED LIV .GE. ,I3,12H AND LV .GE. 173 - - GLF ON PROBLEM MADSEN... - - I INITIAL X(I) D(I) - - 1 .300000E+01 .707E+01 - 2 .100000E+01 .507E+01 - - IT NF F RELDF PRELDF RELDX MODEL STPPAR D*STEP NPRELDF - - 0 1 .847E+02 - 1 3 .365E+02 .57E+00 .62E+00 .7E-01 G .3E+01 .4E+01 .98E+00 - 2 4 .442E+01 .88E+00 .95E+00 .2E+00 G .0E+00 .6E+01 .95E+00 - 3 6 .128E+01 .71E+00 .67E+00 .3E+00 G-S .0E+00 .5E+01 .67E+00 - 4 7 .587E+00 .54E+00 .59E+00 .1E+01 S .0E+00 .3E+01 .59E+00 - 5 8 .415E+00 .29E+00 .24E+00 .1E+00 S .0E+00 .5E+00 .24E+00 - 6 9 .390E+00 .59E-01 .86E-01 .7E-01 G .0E+00 .3E+00 .86E-01 - 7 10 .387E+00 .90E-02 .89E-02 .4E-01 S .0E+00 .1E+00 .89E-02 - 8 11 .387E+00 .24E-04 .21E-04 .2E-02 S .0E+00 .4E-02 .21E-04 - 9 12 .387E+00 .15E-06 .30E-07 .8E-04 G .0E+00 .2E-03 .30E-07 - 10 13 .387E+00 .00E+00 .87E-07 .1E-03 G .0E+00 .3E-03 .87E-07 - - ***** X- AND RELATIVE FUNCTION CONVERGENCE ***** - - FUNCTION .386600E+00 RELDX .111E-03 - FUNC. EVALS 13 GRAD. EVALS 22 - PRELDF .873E-07 NPRELDF .873E-07 - - I FINAL X(I) D(I) G(I) - - 1 -.155494E+00 .126E+01 .192E-03 - 2 .694709E+00 .146E+01 .340E-03 - - 6 EXTRA FUNC. EVALS FOR COVARIANCE AND DIAGNOSTICS. - - SQRT(RECIPROCAL CONDITION OF F.D. HESSIAN) = AT MOST .64 - - COVARIANCE = H**-1, WHERE H = FINITE-DIFFERENCE HESSIAN - - ROW 1 .647 - ROW 2 -.261 .572 - REGRESSION DIAGNOSTIC = 0.5 * G(I)**T * H(I)**-1 * H * H(I)**-1 * G(I)... - .723 .557E-01 .118 - - GLF ON PROBLEM MADSEN AGAIN... - - NONDEFAULT VALUES.... - - LMAX0..... V(35) = .1000000E+00 - - I INITIAL X(I) D(I) - - 1 .300000E+01 .707E+01 - 2 .100000E+01 .507E+01 - - IT NF F RELDF PRELDF RELDX MODEL STPPAR D*STEP NPRELDF - - 0 1 .847E+02 - 1 6 .521E+02 .38E+00 .41E+00 .4E-01 G .6E+01 .2E+01 .98E+00 - 2 7 .785E+01 .85E+00 .95E+00 .1E+00 G .3E+00 .6E+01 .97E+00 - 3 9 .217E+01 .72E+00 .78E+00 .5E+00 G-S .0E+00 .9E+01 .78E+00 - 4 10 .100E+01 .54E+00 .96E+00 .5E+00 G .0E+00 .4E+01 .96E+00 - 5 11 .423E+00 .58E+00 .65E+00 .2E+00 G .0E+00 .2E+01 .65E+00 - 6 12 .392E+00 .73E-01 .12E+00 .9E-01 G .0E+00 .4E+00 .12E+00 - 7 13 .387E+00 .14E-01 .14E-01 .5E-01 S .0E+00 .1E+00 .14E-01 - 8 14 .387E+00 .33E-03 .29E-03 .7E-02 S .0E+00 .2E-01 .29E-03 - 9 15 .387E+00 .79E-05 .92E-05 .1E-02 G .0E+00 .3E-02 .92E-05 - - ***** RELATIVE FUNCTION CONVERGENCE ***** - - FUNCTION .386600E+00 RELDX .139E-02 - FUNC. EVALS 15 GRAD. EVALS 20 - PRELDF .915E-05 NPRELDF .915E-05 - - I FINAL X(I) D(I) G(I) - - 1 -.155806E+00 .108E+01 -.822E-03 - 2 .694499E+00 .139E+01 -.434E-03 //GO.SYSIN DD smadsen.out echo smadsenb.out 1>&2 sed >smadsenb.out <<'//GO.SYSIN DD smadsenb.out' 's/^-//' - GLGB ON PROBLEM MADSEN... - - I INITIAL X(I) D(I) - - 1 .300000E+01 .707E+01 - 2 .100000E+01 .507E+01 - - IT NF F RELDF PRELDF RELDX MODEL STPPAR D*STEP NPRELDF - - 0 1 .847E+02 - 1 3 .365E+02 .57E+00 .62E+00 .7E-01 G .3E+01 .4E+01 .98E+00 - 2 4 .579E+01 .84E+00 .10E+01 .2E+00 G .2E+01 .5E+01 .95E+00 - 3 5 .177E+01 .70E+00 .57E+00 .2E+00 S .0E+00 .3E+01 .57E+00 - 4 6 .660E+00 .63E+00 .59E+00 .4E+00 G .0E+00 .2E+01 .59E+00 - 5 7 .509E+00 .23E+00 .21E+00 .6E+00 G .0E+00 .7E+00 .21E+00 - 6 8 .500E+00 .17E-01 .17E-01 .9E+00 G .0E+00 .1E+00 .17E-01 - 7 9 .500E+00 .13E-04 .13E-04 .1E+01 S .0E+00 .4E-02 .13E-04 - 8 10 .500E+00 .00E+00 .50E-12 .1E+01 S .0E+00 .7E-06 .50E-12 - - ***** RELATIVE FUNCTION CONVERGENCE ***** - - FUNCTION .500000E+00 RELDX .100E+01 - FUNC. EVALS 10 GRAD. EVALS 8 - PRELDF .496E-12 NPRELDF .496E-12 - - I FINAL X(I) D(I) G(I) - - 1 -.704546E-06 .100E+01 -.705E-06 - 2 .000000E+00 .314E+00 -.360E-18 - GLGB NEEDED LIV .GE. ,I3,12H AND LV .GE. 92 - GLGB NEEDED LIV .GE. ,I3,12H AND LV .GE. 179 - - GLFB ON PROBLEM MADSEN... - - I INITIAL X(I) D(I) - - 1 .300000E+01 .707E+01 - 2 .100000E+01 .507E+01 - - IT NF F RELDF PRELDF RELDX MODEL STPPAR D*STEP NPRELDF - - 0 1 .847E+02 - 1 3 .365E+02 .57E+00 .62E+00 .7E-01 G .3E+01 .4E+01 .98E+00 - 2 4 .579E+01 .84E+00 .10E+01 .2E+00 G .2E+01 .5E+01 .95E+00 - 3 5 .177E+01 .70E+00 .57E+00 .2E+00 S .0E+00 .3E+01 .57E+00 - 4 6 .660E+00 .63E+00 .59E+00 .4E+00 G .0E+00 .2E+01 .59E+00 - 5 7 .509E+00 .23E+00 .21E+00 .6E+00 G .0E+00 .7E+00 .21E+00 - 6 8 .500E+00 .17E-01 .17E-01 .9E+00 G .0E+00 .1E+00 .17E-01 - 7 9 .410E+00 .18E+00 .16E-03 .1E+01 S .0E+00 .4E+00 .16E-03 - 8 10 .389E+00 .51E-01 .55E-01 .6E-01 S .0E+00 .1E+00 .71E-01 - 9 11 .389E+00 .26E-03 .26E-03 .7E-02 S .0E+00 .1E-01 .26E-03 - 10 12 .389E+00 .23E-06 .32E-06 .3E-03 S .0E+00 .5E-03 .32E-06 - - ***** RELATIVE FUNCTION CONVERGENCE ***** - - FUNCTION .388964E+00 RELDX .257E-03 - FUNC. EVALS 12 GRAD. EVALS 22 - PRELDF .316E-06 NPRELDF .316E-06 - - I FINAL X(I) D(I) G(I) - - 1 -.100000E+00 .141E+01 .853E-01 - 2 .670350E+00 .144E+01 -.134E-04 - - GLFB ON PROBLEM MADSEN AGAIN... - - NONDEFAULT VALUES.... - - LMAX0..... V(35) = .1000000E+00 - - I INITIAL X(I) D(I) - - 1 .300000E+01 .707E+01 - 2 .100000E+01 .507E+01 - - IT NF F RELDF PRELDF RELDX MODEL STPPAR D*STEP NPRELDF - - 0 1 .847E+02 - 1 6 .521E+02 .38E+00 .41E+00 .4E-01 G .6E+01 .2E+01 .98E+00 - 2 7 .753E+01 .86E+00 .10E+01 .2E+00 G .4E+00 .6E+01 .11E+01 - 3 8 .131E+01 .83E+00 .83E+00 .3E+00 G .0E+00 .5E+01 .83E+00 - 4 9 .597E+00 .54E+00 .51E+00 .4E+00 G .0E+00 .2E+01 .51E+00 - 5 10 .503E+00 .16E+00 .14E+00 .7E+00 G .0E+00 .6E+00 .14E+00 - 6 11 .500E+00 .64E-02 .64E-02 .1E+01 G .0E+00 .9E-01 .64E-02 - 7 13 .481E+00 .38E-01 .96E-04 .1E+01 S .3E-02 .1E+00 .10E-02 - 8 15 .404E+00 .16E+00 .26E+00 .5E+00 S .4E+01 .2E+00 .00E+00 - 9 16 .389E+00 .36E-01 .39E-01 .6E-01 G .0E+00 .1E+00 .56E-01 - 10 17 .389E+00 .22E-03 .24E-03 .7E-02 G .0E+00 .1E-01 .24E-03 - 11 18 .389E+00 .25E-05 .25E-05 .7E-03 G .0E+00 .1E-02 .25E-05 - - ***** RELATIVE FUNCTION CONVERGENCE ***** - - FUNCTION .388964E+00 RELDX .742E-03 - FUNC. EVALS 18 GRAD. EVALS 25 - PRELDF .246E-05 NPRELDF .246E-05 - - I FINAL X(I) D(I) G(I) - - 1 -.100000E+00 .140E+01 .852E-01 - 2 .670314E+00 .145E+01 -.141E-03 //GO.SYSIN DD smadsenb.out