Ignoring 1 objectives. I INITIAL X(I) D(I) 1 .250000E+00 .133E+01 2 .500000E+00 .200E+01 3 .750000E+00 .133E+01 IT NF F RELDF PRELDF RELDX MODEL STPPAR D*STEP NPRELDF 0 1 .556E-01 1 2 .347E-02 .94E+00 .10E+01 .8E-01 G .0E+00 .2E+00 .10E+01 2 3 .268E-05 .10E+01 .10E+01 .1E-01 G .0E+00 .7E-01 .10E+01 3 4 .200E-11 .10E+01 .10E+01 .4E-03 G .0E+00 .2E-02 .10E+01 4 5 .113E-23 .10E+01 .10E+01 .3E-06 G .0E+00 .2E-05 .10E+01 ***** ABSOLUTE FUNCTION CONVERGENCE ***** FUNCTION .113037E-23 RELDX .311E-06 FUNC. EVALS 5 GRAD. EVALS 5 PRELDF .100E+01 NPRELDF .100E+01 I FINAL X(I) D(I) G(I) 1 .146447E+00 .250E+01 -.283E-11 2 .500000E+00 .200E+01 -.222E-15 3 .853553E+00 .250E+01 .284E-11 4 EXTRA FUNC. EVALS FOR COVARIANCE AND DIAGNOSTICS. 4 EXTRA GRAD. EVALS FOR COVARIANCE AND DIAGNOSTICS. RECIPROCAL CONDITION OF F.D. HESSIAN = AT MOST .10E+00 COVARIANCE = SCALE * H**-1 * (J**T * J) * H**-1 WHERE H = F.D. HESSIAN ROW 1 .512E-24 ROW 2 .565E-24 .141E-23 ROW 3 .194E-24 .565E-24 .512E-24 REGRESSION DIAGNOSTIC = SQRT( G(I)**T * H(I)**-1 * G(I) / ABS(F) )... .821E+04 .797E+00 .000E+00