double precision FUNCTION PRAXIS ( T0, MACHEP, H0, N, PRIN, X, & F, FMIN ) c*********************************************************************72 C C PRAXIS RETURNS THE MINIMUM OF THE FUNCTION F(X,N) OF N VARIABLES C USING THE PRINCIPAL AXIS METHOD. THE GRADIENT OF THE FUNCTION IS C NOT REQUIRED. C C FOR A DESCRIPTION OF THE ALGORITHM, SEE CHAPTER SEVEN OF C "ALGORITHMS FOR FINDING ZEROS AND EXTREMA OF FUNCTIONS WITHOUT C CALCULATING DERIVATIVES" BY RICHARD P BRENT. C C THE PARAMETERS ARE: C T0 IS A TOLERANCE. PRAXIS ATTEMPTS TO RETURN PRAXIS=F(X) C SUCH THAT IF X0 IS THE TRUE LOCAL MINIMUM NEAR X, THEN C NORM(X-X0) < T0 + SQUAREROOT(MACHEP)*NORM(X). C MACHEP IS THE MACHINE PRECISION, THE SMALLEST NUMBER SUCH THAT C 1 + MACHEP > 1. MACHEP SHOULD BE 16.**-13 (ABOUT C 2.22D-16) FOR double precision ARITHMETIC ON THE IBM 360. C H0 IS THE MAXIMUM STEP SIZE. H0 SHOULD BE SET TO ABOUT THE C MAXIMUM DISTANCE FROM THE INITIAL GUESS TO THE MINIMUM. C (IF H0 IS SET TOO LARGE OR TOO SMALL, THE INITIAL RATE OF C CONVERGENCE MAY BE SLOW.) C N (AT LEAST TWO) IS THE NUMBER OF VARIABLES UPON WHICH C THE FUNCTION DEPENDS. C PRIN CONTROLS THE PRINTING OF INTERMEDIATE RESULTS. C IF PRIN=0, NOTHING IS PRINTED. C IF PRIN=1, F IS PRINTED AFTER EVERY N+1 OR N+2 LINEAR C MINIMIZATIONS. FINAL X IS PRINTED, BUT INTERMEDIATE X IS C PRINTED ONLY IF N IS AT MOST 4. C IF PRIN=2, THE SCALE FACTORS AND THE PRINCIPAL VALUES OF C THE APPROXIMATING QUADRATIC FORM ARE ALSO PRINTED. C IF PRIN=3, X IS ALSO PRINTED AFTER EVERY FEW LINEAR C MINIMIZATIONS. C IF PRIN=4, THE PRINCIPAL VECTORS OF THE APPROXIMATING C QUADRATIC FORM ARE ALSO PRINTED. C X IS AN ARRAY CONTAINING ON ENTRY A GUESS OF THE POINT OF C MINIMUM, ON RETURN THE ESTIMATED POINT OF MINIMUM. C F(X,N) IS THE FUNCTION TO BE MINIMIZED. F SHOULD BE A double precision C FUNCTION DECLARED EXTERNAL IN THE CALLING PROGRAM. C FMIN IS AN ESTIMATE OF THE MINIMUM, USED ONLY IN PRINTING C INTERMEDIATE RESULTS. C THE APPROXIMATING QUADRATIC FORM IS C Q(X') = F(X,N) + (1/2) * (X'-X)-TRANSPOSE * A * (X'-X) C WHERE X IS THE BEST ESTIMATE OF THE MINIMUM AND A IS C INVERSE(V-TRANSPOSE) * D * INVERSE(V) C (V(*,*) IS THE MATRIX OF SEARCH DIRECTIONS; D(*) IS THE ARRAY C OF SECOND DIFFERENCES). IF F HAS CONTINUOUS SECOND DERIVATIVES C NEAR X0, A WILL TEND TO THE HESSIAN OF F AT X0 AS X APPROACHES X0. C C IT IS ASSUMED THAT ON FLOATING-POINT UNDERFLOW THE RESULT IS SET C TO ZERO. C THE USER SHOULD OBSERVE THE COMMENT ON HEURISTIC NUMBERS AFTER C THE INITIALIZATION OF MACHINE DEPENDENT NUMBERS. C double precision T0,MACHEP,H0,X(N),F,FMIN EXTERNAL F INTEGER PRIN LOGICAL ILLC INTEGER NL,NF,KL,KT,KTM double precision S,SL,DN,DMIN,FX,F1,LDS,LDT double precision T,H,SF,DF,QF1,QD0,QD1,QA,QB,QC double precision M2,M4,SMALL,VSMALL,LARGE double precision VLARGE,SCBD,LDFAC,T2,DNI,VALUE double precision RANDOM,DSQRT,DABS C C.....IF N>20 OR IF N<20 AND YOU NEED MORE SPACE, CHANGE '20' TO THE C LARGEST VALUE OF N IN THE NEXT CARD, AND C IN THE DIMENSION STATEMENTS IN SUBROUTINES MINFIT,MIN,FLIN,QUAD. C double precision D(20),Y(20),Z(20),Q0(20),Q1(20),V(20,20) COMMON /GLOBAL/ FX,LDT,DMIN,NF,NL common /Q/ V,Q0,Q1,QA,QB,QC,QD0,QD1,QF1 C C.....INITIALIZATION..... C MACHINE DEPENDENT NUMBERS: C SMALL=MACHEP*MACHEP VSMALL=SMALL*SMALL LARGE=1.D0/SMALL VLARGE=1.D0/VSMALL M2=DSQRT(MACHEP) M4=DSQRT(M2) C C HEURISTIC NUMBERS: C IF THE AXES MAY BE BADLY SCALED (WHICH IS TO BE AVOIDED IF C POSSIBLE), THEN SET SCBD=10. OTHERWISE SET SCBD=1. C IF THE PROBLEM IS KNOWN TO BE ILL-CONDITIONED, SET ILLC=TRUE. C OTHERWISE SET ILLC=FALSE. C KTM IS THE NUMBER OF ITERATIONS WITHOUT IMPROVEMENT BEFORE THE C ALGORITHM TERMINATES. KTM=4 IS VERY CAUTIOUS; USUALLY KTM=1 C IS SATISFACTORY. C SCBD=1.D0 ILLC=.FALSE. KTM=1 C LDFAC=0.01D0 IF (ILLC) LDFAC=0.1D0 KT=0 NL=0 NF=1 FX=F(X,N) QF1=FX T=SMALL+DABS(T0) T2=T DMIN=SMALL H=H0 IF (H.LT.100*T) H=100*T LDT=H c C.....THE FIRST SET OF SEARCH DIRECTIONS V IS THE IDENTITY MATRIX. c DO 20 I=1,N DO 10 J=1,N 10 V(I,J)=0.0D0 20 V(I,I)=1.D0 D(1)=0.D0 QD0=0.D0 DO 30 I=1,N Q0(I)=X(I) 30 Q1(I)=X(I) IF (PRIN.GT.0) CALL PRINT(N,X,PRIN,FMIN) C C.....THE MAIN LOOP STARTS HERE..... 40 SF=D(1) D(1)=0.D0 S=0.D0 C C.....MINIMIZE ALONG THE FIRST DIRECTION V(*,1). C FX MUST BE PASSED TO MIN BY VALUE. c VALUE=FX CALL minny(N,1,2,D(1),S,VALUE,.FALSE.,F,X,T,MACHEP,H) IF (S.GT.0.D0) GO TO 50 DO 45 I=1,N 45 V(I,1)=-V(I,1) 50 IF (SF.GT.0.9D0*D(1).AND.0.9D0*SF.LT.D(1)) GO TO 70 DO I=2,N D(I)=0.D0 end do C C.....THE INNER LOOP STARTS HERE..... 70 DO 170 K=2,N DO 75 I=1,N 75 Y(I)=X(I) SF=FX IF (KT.GT.0) ILLC=.TRUE. 80 KL=K DF=0.D0 C C.....A RANDOM STEP FOLLOWS (TO AVOID RESOLUTION VALLEYS). C PRAXIS ASSUMES THAT RANDOM RETURNS A RANDOM NUMBER UNIFORMLY C DISTRIBUTED IN (0,1). C IF(.NOT.ILLC) GO TO 95 DO 90 I=1,N S=(0.1D0*LDT+T2*(10**KT))*(RANDOM(N)-0.5D0) Z(I)=S DO 85 J=1,N 85 X(J)=X(J)+S*V(J,I) 90 CONTINUE FX=F(X,N) NF=NF+1 C C.....MINIMIZE ALONG THE "NON-CONJUGATE" DIRECTIONS V(*,K),...,V(*,N) C 95 DO 105 K2=K,N SL=FX S=0.D0 VALUE=FX CALL minny(N,K2,2,D(K2),S,VALUE,.FALSE.,F,X,T,MACHEP,H) IF (ILLC) GO TO 97 S=SL-FX GO TO 99 97 S=D(K2)*((S+Z(K2))**2) 99 IF (DF.GT.S) GO TO 105 DF=S KL=K2 105 CONTINUE IF (ILLC.OR.(DF.GE.DABS((100*MACHEP)*FX))) GO TO 110 C C.....IF THERE WAS NOT MUCH IMPROVEMENT ON THE FIRST TRY, SET C ILLC=TRUE AND START THE INNER LOOP AGAIN..... C ILLC=.TRUE. GO TO 80 110 IF (K.EQ.2.AND.PRIN.GT.1) CALL VCPRNT(1,D,N) C C.....MINIMIZE ALONG THE "CONJUGATE" DIRECTIONS V(*,1),...,V(*,K-1) C KM1=K-1 DO 120 K2=1,KM1 S=0 VALUE=FX CALL minny(N,K2,2,D(K2),S,VALUE,.FALSE.,F,X,T,MACHEP,H) 120 CONTINUE F1=FX FX=SF LDS=0 DO 130 I=1,N SL=X(I) X(I)=Y(I) SL=SL-Y(I) Y(I)=SL 130 LDS=LDS+SL*SL LDS=DSQRT(LDS) IF (LDS.LE.SMALL) GO TO 160 C C.....DISCARD DIRECTION V(*,KL). C IF NO RANDOM STEP WAS TAKEN, V(*,KL) IS THE "NON-CONJUGATE" C DIRECTION ALONG WHICH THE GREATEST IMPROVEMENT WAS MADE..... C KLMK=KL-K IF (KLMK.LT.1) GO TO 141 DO 140 II=1,KLMK I=KL-II DO 135 J=1,N 135 V(J,I+1)=V(J,I) 140 D(I+1)=D(I) 141 D(K)=0 DO 145 I=1,N 145 V(I,K)=Y(I)/LDS C C.....MINIMIZE ALONG THE NEW "CONJUGATE" DIRECTION V(*,K), WHICH IS C THE NORMALIZED VECTOR: (NEW X) - (0LD X)..... C VALUE=F1 CALL minny(N,K,4,D(K),LDS,VALUE,.TRUE.,F,X,T,MACHEP,H) IF (LDS.GT.0.D0) GO TO 160 LDS=-LDS DO 150 I=1,N 150 V(I,K)=-V(I,K) 160 LDT=LDFAC*LDT IF (LDT.LT.LDS) LDT=LDS IF (PRIN.GT.0) CALL PRINT(N,X,PRIN,FMIN) T2=0.D0 DO 165 I=1,N 165 T2=T2+X(I)**2 T2=M2*DSQRT(T2)+T C C.....SEE WHETHER THE LENGTH OF THE STEP TAKEN SINCE STARTING THE C INNER LOOP EXCEEDS HALF THE TOLERANCE..... C IF (LDT.GT.(0.5*T2)) KT=-1 KT=KT+1 IF (KT.GT.KTM) GO TO 400 170 CONTINUE C.....THE INNER LOOP ENDS HERE. C C TRY QUADRATIC EXTRAPOLATION IN CASE WE ARE IN A CURVED VALLEY. C CALL QUAD(N,F,X,T,MACHEP,H) DN=0.D0 DO I=1,N D(I)=1.D0/DSQRT(D(I)) IF (DN.LT.D(I)) DN=D(I) end do IF (PRIN.GT.3) CALL MAPRNT(1,V,N,N) DO 180 J=1,N S=D(J)/DN DO 180 I=1,N 180 V(I,J)=S*V(I,J) C C.....SCALE THE AXES TO TRY TO REDUCE THE CONDITION NUMBER..... C IF (SCBD.LE.1.D0) GO TO 200 S=VLARGE DO 185 I=1,N SL=0.D0 DO J=1,N SL=SL+V(I,J)*V(I,J) end do Z(I)=DSQRT(SL) IF (Z(I).LT.M4) Z(I)=M4 IF (S.GT.Z(I)) S=Z(I) 185 CONTINUE DO 195 I=1,N SL=S/Z(I) Z(I)=1.D0/SL IF (Z(I).LE.SCBD) GO TO 189 SL=1.D0/SCBD Z(I)=SCBD 189 DO 190 J=1,N 190 V(I,J)=SL*V(I,J) 195 CONTINUE C C.....CALCULATE A NEW SET OF ORTHOGONAL DIRECTIONS BEFORE REPEATING C THE MAIN LOOP. C FIRST TRANSPOSE V FOR MINFIT: C 200 continue DO 220 I=2,N IM1=I-1 DO J=1,IM1 S=V(I,J) V(I,J)=V(J,I) V(J,I)=S end do 220 CONTINUE C C.....CALL MINFIT TO FIND THE SINGULAR VALUE DECOMPOSITION OF V. C THIS GIVES THE PRINCIPAL VALUES AND PRINCIPAL DIRECTIONS OF THE C APPROXIMATING QUADRATIC FORM WITHOUT SQUARING THE CONDITION C NUMBER..... C CALL MINFIT(N,MACHEP,VSMALL,V,D) C C.....UNSCALE THE AXES..... C IF (SCBD.LE.1.D0) GO TO 250 DO I=1,N S=Z(I) DO J=1,N V(I,J)=S*V(I,J) end do end do DO 245 I=1,N S=0.D0 DO J=1,N S=S+V(J,I)**2 end do S=DSQRT(S) D(I)=S*D(I) S=1/S DO J=1,N V(J,I)=S*V(J,I) end do 245 CONTINUE 250 DO 270 I=1,N DNI=DN*D(I) IF (DNI.GT.LARGE) GO TO 265 IF (DNI.LT.SMALL) GO TO 260 D(I)=1/(DNI*DNI) GO TO 270 260 D(I)=VLARGE GO TO 270 265 D(I)=VSMALL 270 CONTINUE C C.....SORT THE EIGENVALUES AND EIGENVECTORS..... C CALL SORT(N,N,D,V) DMIN=D(N) IF (DMIN.LT.SMALL) DMIN=SMALL ILLC=.FALSE. IF (M2*D(1).GT.DMIN) ILLC=.TRUE. IF (PRIN.GT.1.AND.SCBD.GT.1.D0) CALL VCPRNT(2,Z,N) IF (PRIN.GT.1) CALL VCPRNT(3,D,N) IF (PRIN.GT.3) CALL MAPRNT(2,V,N,N) C.....THE MAIN LOOP ENDS HERE..... C GO TO 40 C C.....RETURN..... C 400 IF (PRIN.GT.0) CALL VCPRNT(4,X,N) PRAXIS=FX RETURN END double precision FUNCTION FLIN (N,J,L,F,X,NF) c*********************************************************************72 IMPLICIT double precision (A-H,O-Z) double precision L,X(N) DIMENSION V(20,20),Q0(20),Q1(20) C...FLIN IS THE FUNCTION OF ONE REAL VARIABLE L THAT IS MINIMIZED C BY THE SUBROUTINE minny... COMMON /Q/ V,Q0,Q1,QA,QB,QC,QD0,QD1,QF1 DIMENSION T(20) IF (J .EQ. 0) GO TO 2 C...THE SEARCH IS LINEAR... DO 1 I=1,N 1 T(I) = X(I) + L*V(I,J) GO TO 4 C...THE SEARCH IS ALONG A PARABOLIC SPACE CURVE... 2 QA = (L*(L - QD1))/(QD0*(QD0 + QD1)) QB = ((L + QD0)*(QD1 - L))/(QD0*QD1) QC = (L*(L + QD0))/(QD1*(QD0 + QD1)) DO I=1,N T(I) = (QA*Q0(I) + QB*X(I)) + QC*Q1(I) end do C...THE FUNCTION EVALUATION COUNTER NF IS INCREMENTED... 4 NF = NF + 1 FLIN = F(T,N) RETURN END SUBROUTINE MAPRNT(OPTION,V,M,N) c*********************************************************************72 double precision V(M,N) INTEGER OPTION,LOW,UPP C...THE SUBROUTINE MAPRNT PRINTS THE COLUMNS OF THE NXN MATRIX V C WITH A HEADING AS SPECIFIED BY OPTION. C M IS THE ROW DIMENSION OF V AS DECLARED IN THE CALLING PROGRAM... LOW = 1 UPP = 5 GO TO (1,2),OPTION 1 WRITE (6,101) 101 FORMAT (/' THE NEW DIRECTIONS ARE:') GO TO 3 2 WRITE (6,102) 102 FORMAT (' AND THE PRINCIPAL AXES:') 3 IF (N.LT.UPP) UPP = N DO I=1,N WRITE (6,104) (V(I,J),J=LOW,UPP) end do LOW = LOW + 5 IF (N.LT.LOW) RETURN UPP = UPP + 5 WRITE (6,103) GO TO 3 103 FORMAT (' ') 104 FORMAT (E32.14,4E25.14) END SUBROUTINE minny(N,J,NITS,D2,X1,F1,FK,F,X,T,MACHEP,H) c*********************************************************************72 c C...minny() MINIMIZES F FROM X IN THE DIRECTION V(*,J) UNLESS C J IS LESS THAN 1, WHEN A QUADRATIC SEARCH IS MADE IN THE PLANE C DEFINED BY Q0,Q1,X. C D2 IS EITHER ZERO OR AN APPROXIMATION TO HALF F". C ON ENTRY, X1 IS AN ESTIMATE OF THE DISTANCE FROM X TO THE MINIMUM C ALONG V(*,J) (OR, IF J=0, A CURVE). ON RETURN, X1 IS THE DISTANCE C FOUND. C IF FK=.TRUE., THEN F1 IS FLIN(X1). OTHERWISE X1 AND F1 ARE IGNORED C ON ENTRY UNLESS FINAL FX IS GREATER THAN F1. C NITS CONTROLS THE NUMBER OF TIMES AN ATTEMPT WILL BE MADE TO HALVE C THE INTERVAL. c IMPLICIT double precision (A-H,O-Z) EXTERNAL F LOGICAL FK double precision MACHEP,X(N),LDT DIMENSION V(20,20),Q0(20),Q1(20) COMMON /GLOBAL/ FX,LDT,DMIN,NF,NL . /Q/ V,Q0,Q1,QA,QB,QC,QD0,QD1,QF1 LOGICAL DZ double precision M2,M4 SMALL = MACHEP**2 M2 = DSQRT(MACHEP) M4 = DSQRT(M2) SF1 = F1 SX1 = X1 K = 0 XM = 0.D0 FM = FX F0 = FX DZ = D2.LT.MACHEP C...FIND THE STEP SIZE... S = 0.D0 DO I=1,N S = S + X(I)**2 end do S = DSQRT(S) TEMP = D2 IF (DZ) TEMP = DMIN T2 = M4*DSQRT(DABS(FX)/TEMP + S*LDT) + M2*LDT S = M4*S + T IF (DZ.AND.T2.GT.S) T2 = S T2 = DMAX1(T2,SMALL) T2 = DMIN1(T2,.01D0*H) IF (.NOT.FK.OR.F1.GT.FM) GO TO 2 XM = X1 FM = F1 2 IF (FK.AND.DABS(X1).GE.T2) GO TO 3 TEMP=1.D0 IF (X1.LT.0.D0) TEMP=-1.D0 X1=TEMP*T2 F1 = FLIN(N,J,X1,F,X,NF) 3 IF (F1.GT.FM) GO TO 4 XM = X1 FM = F1 4 IF (.NOT.DZ) GO TO 6 C...EVALUATE FLIN AT ANOTHER POINT AND ESTIMATE THE SECOND DERIVATIVE... X2 = -X1 IF (F0.GE.F1) X2 = 2.D0*X1 F2 = FLIN(N,J,X2,F,X,NF) IF (F2.GT.FM) GO TO 5 XM = X2 FM = F2 5 D2 = (X2*(F1 - F0)-X1*(F2 - F0))/((X1*X2)*(X1 - X2)) C...ESTIMATE THE FIRST DERIVATIVE AT 0... 6 D1 = (F1 - F0)/X1 - X1*D2 DZ = .TRUE. C...PREDICT THE MINIMUM... IF (D2.GT.SMALL) GO TO 7 X2 = H IF (D1.GE.0.D0) X2 = -X2 GO TO 8 7 X2 = (-.5D0*D1)/D2 8 IF (DABS(X2).LE.H) GO TO 11 IF (X2) 9,9,10 9 X2 = -H GO TO 11 10 X2 = H C...EVALUATE F AT THE PREDICTED MINIMUM... 11 F2 = FLIN(N,J,X2,F,X,NF) IF (K.GE.NITS.OR.F2.LE.F0) GO TO 12 C...NO SUCCESS, SO TRY AGAIN... K = K + 1 IF (F0.LT.F1.AND.(X1*X2).GT.0.D0) GO TO 4 X2 = 0.5D0*X2 GO TO 11 C...INCREMENT THE ONE-DIMENSIONAL SEARCH COUNTER... 12 NL = NL + 1 IF (F2.LE.FM) GO TO 13 X2 = XM GO TO 14 13 FM = F2 C...GET A NEW ESTIMATE OF THE SECOND DERIVATIVE... 14 IF (DABS(X2*(X2 - X1)).LE.SMALL) GO TO 15 D2 = (X2*(F1-F0) - X1*(FM-F0))/((X1*X2)*(X1 - X2)) GO TO 16 15 IF (K.GT.0) D2 = 0.D0 16 IF (D2.LE.SMALL) D2 = SMALL X1 = X2 FX = FM IF (SF1.GE.FX) GO TO 17 FX = SF1 X1 = SX1 C...UPDATE X FOR LINEAR BUT NOT PARABOLIC SEARCH... 17 IF (J.EQ.0) RETURN DO I=1,N X(I) = X(I) + X1*V(I,J) end do RETURN END SUBROUTINE MINFIT ( N, MACHEP, TOL, AB, Q ) c*********************************************************************72 c cc minfit()... c IMPLICIT double precision (A-H,O-Z) double precision MACHEP DIMENSION AB(N,N),Q(N) c C...AN IMPROVED VERSION OF MINFIT (SEE GOLUB AND REINSCH, 1969) C RESTRICTED TO M=N,P=0. C THE SINGULAR VALUES OF THE ARRAY AB ARE RETURNED IN Q AND AB IS C OVERWRITTEN WITH THE ORTHOGONAL MATRIX V SUCH THAT U.DIAG(Q) = AB.V, C WHERE U IS ANOTHER ORTHOGONAL MATRIX. DIMENSION E(20) C...HOUSEHOLDER'S REDUCTION TO BIDIAGONAL FORM... IF (N.EQ.1) GO TO 200 EPS = MACHEP G = 0.D0 X = 0.D0 DO I=1,N E(I) = G S = 0.D0 L = I + 1 DO J=I,N S = S + AB(J,I)**2 end do G = 0.D0 IF (S.LT.TOL) GO TO 4 F = AB(I,I) G = DSQRT(S) IF (F.GE.0.D0) G = -G H = F*G - S AB(I,I)=F-G DO J=L,N F = 0.D0 DO K=I,N F = F + AB(K,I)*AB(K,J) end do F = F/H DO K=I,N AB(K,J) = AB(K,J) + F*AB(K,I) end do end do 4 Q(I) = G S = 0.D0 IF (I.EQ.N) GO TO 6 DO J=L,N S = S + AB(I,J)*AB(I,J) end do 6 G = 0.D0 IF (S.LT.TOL) GO TO 10 IF (I.EQ.N) GO TO 16 F = AB(I,I+1) 16 G = DSQRT(S) IF (F.GE.0.D0) G = -G H = F*G - S IF (I.EQ.N) GO TO 10 AB(I,I+1) = F - G DO J=L,N E(J) = AB(I,J)/H end do DO J=L,N S = 0.D0 DO K=L,N S = S + AB(J,K)*AB(I,K) end do DO K=L,N AB(J,K) = AB(J,K) + S*E(K) end do end do 10 Y = DABS(Q(I)) + DABS(E(I)) IF (Y.GT.X) X = Y end do C...ACCUMULATION OF RIGHT-HAND TRANSFORMATIONS... AB(N,N) = 1.D0 G = E(N) L = N DO II=2,N I = N - II + 1 IF (G.EQ.0.D0) GO TO 23 H = AB(I,I+1)*G DO J=L,N AB(J,I) = AB(I,J)/H end do DO J=L,N S = 0.D0 DO K=L,N S = S + AB(I,K)*AB(K,J) end do DO K=L,N AB(K,J) = AB(K,J) + S*AB(K,I) end do end do 23 DO J=L,N AB(I,J) = 0.D0 AB(J,I) = 0.D0 end do AB(I,I) = 1.D0 G = E(I) L = I end do C...DIAGONALIZATION OF THE BIDIAGONAL FORM... EPS = EPS*X DO 150 KK=1,N K = N - KK + 1 KT = 0 101 KT = KT + 1 IF (KT.LE.30) GO TO 102 E(K) = 0.D0 WRITE (6,1000) 1000 FORMAT (' QR FAILED') 102 DO 103 LL2=1,K L2 = K - LL2 + 1 L = L2 IF (DABS(E(L)).LE.EPS) GO TO 120 IF (L.EQ.1) GO TO 103 IF (DABS(Q(L-1)).LE.EPS) GO TO 110 103 CONTINUE C...CANCELLATION OF E(L) IF L>1... 110 C = 0.D0 S = 1.D0 DO I=L,K F = S*E(I) E(I) = C*E(I) IF (DABS(F).LE.EPS) GO TO 120 G = Q(I) C...Q(I) = H = DSQRT(G*G + F*F)... IF (DABS(F).LT.DABS(G)) GO TO 113 IF (F) 112,111,112 111 H = 0.D0 GO TO 114 112 H = DABS(F)*DSQRT(1 + (G/F)**2) GO TO 114 113 H = DABS(G)*DSQRT(1 + (F/G)**2) 114 Q(I) = H IF (H.NE.0.D0) GO TO 115 G = 1.D0 H = 1.D0 115 C = G/H S = -F/H end do C...TEST FOR CONVERGENCE... 120 Z = Q(K) IF (L.EQ.K) GO TO 140 C...SHIFT FROM BOTTOM 2*2 MINOR... X = Q(L) Y = Q(K-1) G = E(K-1) H = E(K) F = ((Y - Z)*(Y + Z) + (G - H)*(G + H))/(2*H*Y) G = DSQRT(F*F + 1.0D0) TEMP = F - G IF (F.GE.0.D0) TEMP = F + G F = ((X - Z)*(X + Z) + H*(Y/TEMP - H))/X C...NEXT QR TRANSFORMATION... C = 1.D0 S = 1.D0 LP1 = L + 1 DO I=LP1,K G = E(I) Y = Q(I) H = S*G G = G*C IF (DABS(F).LT.DABS(H)) GO TO 123 IF (F) 122,121,122 121 Z = 0.D0 GO TO 124 122 Z = DABS(F)*DSQRT(1 + (H/F)**2) GO TO 124 123 Z = DABS(H)*DSQRT(1 + (F/H)**2) 124 E(I-1) = Z IF (Z.NE.0.D0) GO TO 125 F = 1.D0 Z = 1.D0 125 C = F/Z S = H/Z F = X*C + G*S G = -X*S + G*C H = Y*S Y = Y*C DO J=1,N X = AB(J,I-1) Z = AB(J,I) AB(J,I-1) = X*C + Z*S AB(J,I) = -X*S + Z*C end do IF (DABS(F).LT.DABS(H)) GO TO 129 IF (F) 128,127,128 127 Z = 0.D0 GO TO 130 128 Z = DABS(F)*DSQRT(1 + (H/F)**2) GO TO 130 129 Z = DABS(H)*DSQRT(1 + (F/H)**2) 130 Q(I-1) = Z IF (Z.NE.0.D0) GO TO 131 F = 1.D0 Z = 1.D0 131 C = F/Z S = H/Z F = C*G + S*Y X = -S*G + C*Y end do E(L) = 0.D0 E(K) = F Q(K) = X GO TO 101 C...CONVERGENCE: Q(K) IS MADE NON-NEGATIVE... 140 IF (Z.GE.0.D0) GO TO 150 Q(K) = -Z DO J=1,N AB(J,K) = -AB(J,K) end do 150 CONTINUE RETURN 200 Q(1) = AB(1,1) AB(1,1) = 1.D0 RETURN END SUBROUTINE PRINT(N,X,PRIN,FMIN) c*********************************************************************72 IMPLICIT double precision (A-H,O-Z) INTEGER PRIN double precision X(N),LN,LDT COMMON /GLOBAL/ FX,LDT,DMIN,NF,NL WRITE (6,101) NL,NF,FX IF (FX.LE.FMIN) GO TO 1 LN = DLOG10(FX-FMIN) WRITE (6,102) FMIN,LN GO TO 2 1 WRITE (6,103) FMIN 2 IF (N.GT.4.AND.PRIN.LE.2) RETURN WRITE (6,104) (X(I),I=1,N) RETURN 101 FORMAT (/' AFTER',I6, . ' LINEAR SEARCHES, THE FUNCTION HAS BEEN EVALUATED',I6, . ' TIMES. THE SMALLEST VALUE FOUND IS F(X) = ',E21.14) 102 FORMAT (' LOG (F(X)-',E21.14,') = ',E21.14) 103 FORMAT (' LOG (F(X)-',E21.14,') IS UNDEFINED.') 104 FORMAT (' X IS:',E26.14/(E32.14)) END SUBROUTINE QUAD(N,F,X,T,MACHEP,H) c*********************************************************************72 IMPLICIT double precision (A-H,O-Z) EXTERNAL F C...QUAD LOOKS FOR THE MINIMUM OF F ALONG A CURVE DEFINED BY Q0,Q1,X... double precision X(N),MACHEP,LDT,L DIMENSION V(20,20),Q0(20),Q1(20) COMMON /GLOBAL/ FX,LDT,DMIN,NF,NL . /Q/ V,Q0,Q1,QA,QB,QC,QD0,QD1,QF1 S = FX FX = QF1 QF1 = S QD1 = 0.D0 DO I=1,N S = X(I) L = Q1(I) X(I) = L Q1(I) = S QD1 = QD1 + (S-L)**2 end do QD1 = DSQRT(QD1) L = QD1 S = 0.D0 IF (QD0. LE. 0.D0 .OR. QD1 .LE. 0.D0 .OR. NL .LT. 3*N*N) GO TO 2 VALUE=QF1 CALL minny(N,0,2,S,L,VALUE,.TRUE.,F,X,T,MACHEP,H) QA = (L*(L-QD1))/(QD0*(QD0+QD1)) QB = ((L+QD0)*(QD1-L))/(QD0*QD1) QC = (L*(L+QD0))/(QD1*(QD0+QD1)) GO TO 3 2 FX = QF1 QA = 0.D0 QB = QA QC = 1.D0 3 QD0 = QD1 DO I=1,N S = Q0(I) Q0(I) = X(I) X(I) = (QA*S + QB*X(I)) + QC*Q1(I) end do RETURN END function random ( naught ) c*********************************************************************72 c cc random() is a random number generator. c implicit none real*8 half integer i logical init integer j integer naught integer q integer r double precision ran1 integer ran2 double precision ran3(127) double precision random save init save ran2 save ran3 data init /.false./ if ( .not. init) then r = mod(naught,8190) + 1 ran2 = 128 do i=1,127 ran2 = ran2 - 1 ran1 = -2.d0**55 do j=1,7 r = mod(1756*r,8191) q = r/32 ran1 = (ran1 + q)*(1.0d0/256) end do ran3(ran2) = ran1 end do init = .true. end if if (ran2.eq.1) then ran2 = 128 end if ran2 = ran2 - 1 ran1 = ran1 + ran3(ran2) half = .5d0 if (ran1.ge.0.d0) then half = -half end if ran1 = ran1 + half ran3(ran2) = ran1 random = ran1 + .5d0 return end SUBROUTINE SORT(M,N,D,V) c*********************************************************************72 double precision D(N),V(M,N) C...SORTS THE ELEMENTS OF D(N) INTO DESCENDING ORDER AND MOVES THE C CORRESPONDING COLUMNS OF V(N,N). C M IS THE ROW DIMENSION OF V AS DECLARED IN THE CALLING PROGRAM. double precision S IF (N.EQ.1) RETURN NM1 = N - 1 DO 3 I = 1,NM1 K=I S = D(I) IP1 = I + 1 DO 1 J = IP1,N IF (D(J) .LE. S) GO TO 1 K = J S = D(J) 1 CONTINUE IF (K .LE. I) GO TO 3 D(K) = D(I) D(I) = S DO J = 1,N S = V(J,I) V(J,I) = V(J,K) V(J,K) = S end do 3 CONTINUE RETURN END SUBROUTINE VCPRNT(OPTION,V,N) c*********************************************************************72 c cc vcprnt() ... c double precision V(N) INTEGER OPTION GO TO (1,2,3,4),OPTION 1 WRITE (6,101) (V(I),I=1,N) RETURN 2 WRITE (6,102) (V(I),I=1,N) RETURN 3 WRITE (6,103) (V(I),I=1,N) RETURN 4 WRITE (6,104) (V(I),I=1,N) RETURN 101 FORMAT (/' THE SECOND DIFFERENCE ARRAY D(*) IS:'/ . (E32.14,4E25.14)) 102 FORMAT (/' THE SCALE FACTORS ARE:'/(E32.14,4E25.14)) 103 FORMAT (/' THE APPROXIMATING QUADRATIC FORM HAS THE PRINCIPAL VALU .ES:'/(E32.14,4E25.14)) 104 FORMAT (/' X IS:',E26.14/(E32.14)) END