SUBROUTINE TRI3(M, vecA, vecB, vecC, ivecK, vecY1, vecY2, vecY3, TCOS, & ITCOS, vecD, vecW1, vecW2, vecW3) implicit none DOUBLE PRECISION, PARAMETER :: ZERO = 0.0D0, HALF = 0.5D0, & ONE = 1.0D0, TWO = 2.0D0, & FOUR = 4.0D0 !----------------------------------------------- ! D u m m y A r g u m e n t s !----------------------------------------------- INTEGER, INTENT(IN) :: M,ITCOS INTEGER, DIMENSION(4),INTENT(IN) :: ivecK DOUBLE PRECISION, DIMENSION(M), INTENT(IN) :: vecA, vecB, vecC DOUBLE PRECISION, DIMENSION(ITCOS), INTENT(IN) :: TCOS DOUBLE PRECISION, DIMENSION(M), INTENT(INOUT) :: vecY1, vecY2, vecY3, & vecD, vecW1, vecW2, vecW3 !----------------------------------------------- ! L o c a l V a r i a b l e s !----------------------------------------------- INTEGER :: MM1, K1, K2, K3, K4, IF1, IF2, IF3, IF4, K2K3K4, & L1, L2, L3, LINT1, LINT2, LINT3, KINT1, KINT2, KINT3, & N, I, IP DOUBLE PRECISION :: X, Z, XX !----------------------------------------------- ! ! SUBROUTINE TO SOLVE THREE LINEAR SYSTEMS WHOSE COMMON COEFFICIENT ! MATRIX IS A RATIONAL FUNCTION IN THE MATRIX GIVEN BY ! ! TRIDIAGONAL (...,vecA(I),vecB(I),vecC(I),...) ! MM1 = M - 1 K1 = ivecK(1) K2 = ivecK(2) K3 = ivecK(3) K4 = ivecK(4) IF1 = K1 + 1 IF2 = K2 + 1 IF3 = K3 + 1 IF4 = K4 + 1 K2K3K4 = K2 + K3 + K4 IF (K2K3K4 /= 0) THEN L1 = IF1/IF2 L2 = IF1/IF3 L3 = IF1/IF4 LINT1 = 1 LINT2 = 1 LINT3 = 1 KINT1 = K1 KINT2 = KINT1 + K2 KINT3 = KINT2 + K3 ELSE write(*,*) 'warning', & 'tri3: l1,l2,l3,kint1,kint2,kint3 uninitialized' stop 'stop in tri3: l1,l2,l3,kint1,kint2,kint3 uninitialized' ENDIF DO N = 1, K1 X = TCOS(N) IF (K2K3K4 /= 0) THEN IF (N == L1) THEN vecW1(:M) = vecY1(:M) ENDIF IF (N == L2) THEN vecW2(:M) = vecY2(:M) ENDIF IF (N == L3) THEN vecW3(:M) = vecY3(:M) ENDIF ENDIF Z = 1./(vecB(1)-X) vecD(1) = vecC(1)*Z vecY1(1) = vecY1(1)*Z vecY2(1) = vecY2(1)*Z vecY3(1) = vecY3(1)*Z DO I = 2, M Z = 1./(vecB(I)-X-vecA(I)*vecD(I-1)) vecD(I) = vecC(I)*Z vecY1(I) = (vecY1(I)-vecA(I)*vecY1(I-1))*Z vecY2(I) = (vecY2(I)-vecA(I)*vecY2(I-1))*Z vecY3(I) = (vecY3(I)-vecA(I)*vecY3(I-1))*Z END DO DO IP = 1, MM1 vecY1(M-IP) = vecY1(M-IP) - vecD(M-IP)*vecY1(M+1-IP) vecY2(M-IP) = vecY2(M-IP) - vecD(M-IP)*vecY2(M+1-IP) vecY3(M-IP) = vecY3(M-IP) - vecD(M-IP)*vecY3(M+1-IP) END DO IF (K2K3K4 == 0) CYCLE IF (N == L1) THEN I = LINT1 + KINT1 XX = X - TCOS(I) vecY1(:M) = XX*vecY1(:M) + vecW1(:M) LINT1 = LINT1 + 1 L1 = (LINT1*IF1)/IF2 ENDIF IF (N == L2) THEN I = LINT2 + KINT2 XX = X - TCOS(I) vecY2(:M) = XX*vecY2(:M) + vecW2(:M) LINT2 = LINT2 + 1 L2 = (LINT2*IF1)/IF3 ENDIF IF (N /= L3) CYCLE I = LINT3 + KINT3 XX = X - TCOS(I) vecY3(:M) = XX*vecY3(:M) + vecW3(:M) LINT3 = LINT3 + 1 L3 = (LINT3*IF1)/IF4 END DO RETURN ! ! REVISION HISTORY--- ! ! SEPTEMBER 1973 VERSION 1 ! APRIL 1976 VERSION 2 ! JANUARY 1978 VERSION 3 ! DECEMBER 1979 VERSION 3.1 ! OCTOBER 1980 CHANGED SEVERAL DIVIDES OF FLOATING INTEGERS ! TO INTEGER DIVIDES TO ACCOMODATE CRAY-1 ARITHMETIC. ! FEBRUARY 1985 DOCUMENTATION UPGRADE ! NOVEMBER 1988 VERSION 3.2, FORTRAN 77 CHANGES !----------------------------------------------------------------------- END SUBROUTINE TRI3