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197 lines
6.7 KiB
Fortran
197 lines
6.7 KiB
Fortran
*DECK DCOEF
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SUBROUTINE DCOEF (YH, YP, NCOMP, NROWB, NFC, NIC, B, BETA, COEF,
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+ INHOMO, RE, AE, BY, CVEC, WORK, IWORK, IFLAG, NFCC)
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C***BEGIN PROLOGUE DCOEF
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C***SUBSIDIARY
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C***PURPOSE Subsidiary to DBVSUP
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C***LIBRARY SLATEC
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C***TYPE DOUBLE PRECISION (SCOEF-S, DCOEF-D)
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C***AUTHOR Watts, H. A., (SNLA)
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C***DESCRIPTION
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C
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C **********************************************************************
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C INPUT to DCOEF
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C **********************************************************************
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C
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C YH = matrix of homogeneous solutions.
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C YP = vector containing particular solution.
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C NCOMP = number of components per solution vector.
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C NROWB = first dimension of B in calling program.
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C NFC = number of base solution vectors.
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C NFCC = 2*NFC for the special treatment of COMPLEX*16 valued
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C equations. Otherwise, NFCC=NFC.
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C NIC = number of specified initial conditions.
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C B = boundary condition matrix at X = XFINAL.
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C BETA = vector of nonhomogeneous boundary conditions at X = XFINAL.
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C 1 - nonzero particular solution
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C INHOMO = 2 - zero particular solution
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C 3 - eigenvalue problem
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C RE = relative error tolerance.
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C AE = absolute error tolerance.
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C BY = storage space for the matrix B*YH
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C CVEC = storage space for the vector BETA-B*YP
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C WORK = double precision array of internal storage. Dimension must
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C be GE
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C NFCC*(NFCC+4)
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C IWORK = integer array of internal storage. Dimension must be GE
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C 3+NFCC
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C
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C **********************************************************************
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C OUTPUT from DCOEF
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C **********************************************************************
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C
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C COEF = array containing superposition constants.
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C IFLAG = indicator of success from DSUDS in solving the
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C boundary equations.
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C = 0 boundary equations are solved.
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C = 1 boundary equations appear to have many solutions.
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C = 2 boundary equations appear to be inconsistent.
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C = 3 for this value of an eigenparameter, the boundary
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C equations have only the zero solution.
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C
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C **********************************************************************
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C
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C Subroutine DCOEF solves for the superposition constants from the
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C linear equations defined by the boundary conditions at X = XFINAL.
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C
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C B*YP + B*YH*COEF = BETA
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C
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C **********************************************************************
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C
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C***SEE ALSO DBVSUP
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C***ROUTINES CALLED DDOT, DSUDS, XGETF, XSETF
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C***COMMON BLOCKS DML5MC
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C***REVISION HISTORY (YYMMDD)
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C 750601 DATE WRITTEN
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C 890531 Changed all specific intrinsics to generic. (WRB)
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C 890831 Modified array declarations. (WRB)
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C 890921 Realigned order of variables in certain COMMON blocks.
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C (WRB)
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C 890921 REVISION DATE from Version 3.2
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C 891214 Prologue converted to Version 4.0 format. (BAB)
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C 900328 Added TYPE section. (WRB)
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C 910722 Updated AUTHOR section. (ALS)
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C***END PROLOGUE DCOEF
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C
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DOUBLE PRECISION DDOT
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INTEGER I, IFLAG, INHOMO, IWORK(*), J, K, KFLAG, KI, L, LPAR,
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1 MLSO, NCOMP, NCOMP2, NF, NFC, NFCC, NFCCM1, NIC,
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2 NROWB
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DOUBLE PRECISION AE, B(NROWB,*), BBN, BETA(*), BN, BRN,
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1 BY(NFCC,*), BYKL, BYS, COEF(*), CONS, CVEC(*), EPS,
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2 FOURU, GAM, RE, SQOVFL, SRU, TWOU, UN, URO, WORK(*),
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3 YH(NCOMP,*), YP(*), YPN
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C
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COMMON /DML5MC/ URO,SRU,EPS,SQOVFL,TWOU,FOURU,LPAR
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C***FIRST EXECUTABLE STATEMENT DCOEF
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C
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C SET UP MATRIX B*YH AND VECTOR BETA - B*YP
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C
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NCOMP2 = NCOMP/2
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DO 80 K = 1, NFCC
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DO 10 J = 1, NFC
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L = J
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IF (NFC .NE. NFCC) L = 2*J - 1
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BY(K,L) = DDOT(NCOMP,B(K,1),NROWB,YH(1,J),1)
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10 CONTINUE
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IF (NFC .EQ. NFCC) GO TO 30
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DO 20 J = 1, NFC
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L = 2*J
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BYKL = DDOT(NCOMP2,B(K,1),NROWB,YH(NCOMP2+1,J),1)
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BY(K,L) = DDOT(NCOMP2,B(K,NCOMP2+1),NROWB,YH(1,J),1)
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1 - BYKL
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20 CONTINUE
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30 CONTINUE
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GO TO (40,50,60), INHOMO
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C CASE 1
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40 CONTINUE
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CVEC(K) = BETA(K) - DDOT(NCOMP,B(K,1),NROWB,YP,1)
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GO TO 70
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C CASE 2
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50 CONTINUE
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CVEC(K) = BETA(K)
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GO TO 70
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C CASE 3
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60 CONTINUE
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CVEC(K) = 0.0D0
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70 CONTINUE
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80 CONTINUE
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CONS = ABS(CVEC(1))
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BYS = ABS(BY(1,1))
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C
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C ******************************************************************
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C SOLVE LINEAR SYSTEM
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C
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IFLAG = 0
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MLSO = 0
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IF (INHOMO .EQ. 3) MLSO = 1
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KFLAG = 0.5D0 * LOG10(EPS)
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CALL XGETF(NF)
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CALL XSETF(0)
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90 CONTINUE
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CALL DSUDS(BY,COEF,CVEC,NFCC,NFCC,NFCC,KFLAG,MLSO,WORK,IWORK)
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IF (KFLAG .NE. 3) GO TO 100
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KFLAG = 1
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IFLAG = 1
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GO TO 90
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100 CONTINUE
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IF (KFLAG .EQ. 4) IFLAG = 2
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CALL XSETF(NF)
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IF (NFCC .EQ. 1) GO TO 180
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IF (INHOMO .NE. 3) GO TO 170
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IF (IWORK(1) .LT. NFCC) GO TO 140
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IFLAG = 3
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DO 110 K = 1, NFCC
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COEF(K) = 0.0D0
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110 CONTINUE
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COEF(NFCC) = 1.0D0
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NFCCM1 = NFCC - 1
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DO 130 K = 1, NFCCM1
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J = NFCC - K
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L = NFCC - J + 1
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GAM = DDOT(L,BY(J,J),NFCC,COEF(J),1)/(WORK(J)*BY(J,J))
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DO 120 I = J, NFCC
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COEF(I) = COEF(I) + GAM*BY(J,I)
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120 CONTINUE
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130 CONTINUE
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GO TO 160
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140 CONTINUE
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DO 150 K = 1, NFCC
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KI = 4*NFCC + K
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COEF(K) = WORK(KI)
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150 CONTINUE
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160 CONTINUE
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170 CONTINUE
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GO TO 220
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180 CONTINUE
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C
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C ***************************************************************
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C TESTING FOR EXISTENCE AND UNIQUENESS OF BOUNDARY-VALUE
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C PROBLEM SOLUTION IN A SCALAR CASE
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C
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BN = 0.0D0
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UN = 0.0D0
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YPN = 0.0D0
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DO 190 K = 1, NCOMP
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UN = MAX(UN,ABS(YH(K,1)))
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YPN = MAX(YPN,ABS(YP(K)))
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BN = MAX(BN,ABS(B(1,K)))
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190 CONTINUE
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BBN = MAX(BN,ABS(BETA(1)))
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IF (BYS .GT. 10.0D0*(RE*UN + AE)*BN) GO TO 200
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BRN = BBN/BN*BYS
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IF (CONS .GE. 0.1D0*BRN .AND. CONS .LE. 10.0D0*BRN)
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1 IFLAG = 1
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IF (CONS .GT. 10.0D0*BRN) IFLAG = 2
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IF (CONS .LE. RE*ABS(BETA(1)) + AE + (RE*YPN + AE)*BN)
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1 IFLAG = 1
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IF (INHOMO .EQ. 3) COEF(1) = 1.0D0
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GO TO 210
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200 CONTINUE
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IF (INHOMO .NE. 3) GO TO 210
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IFLAG = 3
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COEF(1) = 1.0D0
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210 CONTINUE
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220 CONTINUE
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RETURN
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END
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