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614 lines
17 KiB
FortranFixed

MODULE SVD
IMPLICIT NONE
INTEGER, PARAMETER :: dp = SELECTED_REAL_KIND(12, 60)
! Based upon routines from the NSWC (Naval Surface Warfare Center),
! which were based upon LAPACK routines.
! Code converted using TO_F90 by Alan Miller
! Date: 2003-11-11 Time: 17:50:44
! Revised pab 2007
! Converted to fixed form
CONTAINS
SUBROUTINE drotg(da, db, dc, ds)
! DESIGNED BY C.L.LAWSON, JPL, 1977 SEPT 08
!
! CONSTRUCT THE GIVENS TRANSFORMATION
!
! ( DC DS )
! G = ( ) , DC**2 + DS**2 = 1 ,
! (-DS DC )
!
! WHICH ZEROS THE SECOND ENTRY OF THE 2-VECTOR (DA,DB)**T .
!
! THE QUANTITY R = (+/-)SQRT(DA**2 + DB**2) OVERWRITES DA IN
! STORAGE. THE VALUE OF DB IS OVERWRITTEN BY A VALUE Z WHICH
! ALLOWS DC AND DS TO BE RECOVERED BY THE FOLLOWING ALGORITHM:
! IF Z=1 SET DC=0.D0 AND DS=1.D0
! IF DABS(Z) < 1 SET DC=SQRT(1-Z**2) AND DS=Z
! IF DABS(Z) > 1 SET DC=1/Z AND DS=SQRT(1-DC**2)
!
! NORMALLY, THE SUBPROGRAM DROT(N,DX,INCX,DY,INCY,DC,DS) WILL
! NEXT BE CALLED TO APPLY THE TRANSFORMATION TO A 2 BY N MATRIX.
!
! ------------------------------------------------------------------
REAL (dp), INTENT(IN OUT) :: da
REAL (dp), INTENT(IN OUT) :: db
REAL (dp), INTENT(OUT) :: dc
REAL (dp), INTENT(OUT) :: ds
REAL (dp) :: u, v, r
IF (ABS(da) <= ABS(db)) GO TO 10
! *** HERE ABS(DA) > ABS(DB) ***
u = da + da
v = db / u
! NOTE THAT U AND R HAVE THE SIGN OF DA
r = SQRT(.25D0 + v**2) * u
! NOTE THAT DC IS POSITIVE
dc = da / r
ds = v * (dc + dc)
db = ds
da = r
RETURN
! *** HERE ABS(DA) <= ABS(DB) ***
10 IF (db == 0.d0) GO TO 20
u = db + db
v = da / u
! NOTE THAT U AND R HAVE THE SIGN OF DB
! (R IS IMMEDIATELY STORED IN DA)
da = SQRT(.25D0 + v**2) * u
! NOTE THAT DS IS POSITIVE
ds = db / da
dc = v * (ds + ds)
IF (dc == 0.d0) GO TO 15
db = 1.d0 / dc
RETURN
15 db = 1.d0
RETURN
! *** HERE DA = DB = 0.D0 ***
20 dc = 1.d0
ds = 0.d0
RETURN
END SUBROUTINE drotg
SUBROUTINE dswap1 (n, dx, dy)
! INTERCHANGES TWO VECTORS.
! USES UNROLLED LOOPS FOR INCREMENTS EQUAL ONE.
! JACK DONGARRA, LINPACK, 3/11/78.
! This version is for increments = 1.
INTEGER, INTENT(IN) :: n
REAL (dp), INTENT(IN OUT) :: dx(*)
REAL (dp), INTENT(IN OUT) :: dy(*)
REAL (dp) :: dtemp
INTEGER :: i, m, mp1
IF(n <= 0) RETURN
! CODE FOR BOTH INCREMENTS EQUAL TO 1
!
! CLEAN-UP LOOP
m = MOD(n,3)
IF( m == 0 ) GO TO 40
DO i = 1,m
dtemp = dx(i)
dx(i) = dy(i)
dy(i) = dtemp
END DO
IF( n < 3 ) RETURN
40 mp1 = m + 1
DO i = mp1,n,3
dtemp = dx(i)
dx(i) = dy(i)
dy(i) = dtemp
dtemp = dx(i + 1)
dx(i + 1) = dy(i + 1)
dy(i + 1) = dtemp
dtemp = dx(i + 2)
dx(i + 2) = dy(i + 2)
dy(i + 2) = dtemp
END DO
RETURN
END SUBROUTINE dswap1
SUBROUTINE drot1 (n, dx, dy, c, s)
! APPLIES A PLANE ROTATION.
! JACK DONGARRA, LINPACK, 3/11/78.
! This version is for increments = 1.
INTEGER, INTENT(IN) :: n
REAL (dp), INTENT(IN OUT) :: dx(*)
REAL (dp), INTENT(IN OUT) :: dy(*)
REAL (dp), INTENT(IN) :: c
REAL (dp), INTENT(IN) :: s
REAL (dp) :: dtemp
INTEGER :: i
IF(n <= 0) RETURN
! CODE FOR BOTH INCREMENTS EQUAL TO 1
DO i = 1,n
dtemp = c*dx(i) + s*dy(i)
dy(i) = c*dy(i) - s*dx(i)
dx(i) = dtemp
END DO
RETURN
END SUBROUTINE drot1
SUBROUTINE dsvdc(x, n, p, s, e, u, v, job, info)
INTEGER, INTENT(IN) :: n
INTEGER, INTENT(IN) :: p
REAL (dp), INTENT(IN OUT) :: x(:,:)
REAL (dp), INTENT(OUT) :: s(:)
REAL (dp), INTENT(OUT) :: e(:)
REAL (dp), INTENT(OUT) :: u(:,:)
REAL (dp), INTENT(OUT) :: v(:,:)
INTEGER, INTENT(IN) :: job
INTEGER, INTENT(OUT) :: info
! DSVDC IS A SUBROUTINE TO REDUCE A DOUBLE PRECISION NXP MATRIX X
! BY ORTHOGONAL TRANSFORMATIONS U AND V TO DIAGONAL FORM. THE
! DIAGONAL ELEMENTS S(I) ARE THE SINGULAR VALUES OF X. THE
! COLUMNS OF U ARE THE CORRESPONDING LEFT SINGULAR VECTORS,
! AND THE COLUMNS OF V THE RIGHT SINGULAR VECTORS.
!
! ON ENTRY
!
! X DOUBLE PRECISION(LDX,P), WHERE LDX.GE.N.
! X CONTAINS THE MATRIX WHOSE SINGULAR VALUE
! DECOMPOSITION IS TO BE COMPUTED. X IS
! DESTROYED BY DSVDC.
!
! LDX INTEGER.
! LDX IS THE LEADING DIMENSION OF THE ARRAY X.
!
! N INTEGER.
! N IS THE NUMBER OF ROWS OF THE MATRIX X.
!
! P INTEGER.
! P IS THE NUMBER OF COLUMNS OF THE MATRIX X.
!
! LDU INTEGER.
! LDU IS THE LEADING DIMENSION OF THE ARRAY U.
! (SEE BELOW).
!
! LDV INTEGER.
! LDV IS THE LEADING DIMENSION OF THE ARRAY V.
! (SEE BELOW).
!
! JOB INTEGER.
! JOB CONTROLS THE COMPUTATION OF THE SINGULAR
! VECTORS. IT HAS THE DECIMAL EXPANSION AB
! WITH THE FOLLOWING MEANING
!
! A.EQ.0 DO NOT COMPUTE THE LEFT SINGULAR VECTORS.
! A.EQ.1 RETURN THE N LEFT SINGULAR VECTORS IN U.
! A.GE.2 RETURN THE FIRST MIN(N,P) SINGULAR
! VECTORS IN U.
! B.EQ.0 DO NOT COMPUTE THE RIGHT SINGULAR VECTORS.
! B.EQ.1 RETURN THE RIGHT SINGULAR VECTORS IN V.
!
! ON RETURN
!
! S DOUBLE PRECISION(MM), WHERE MM=MIN(N+1,P).
! THE FIRST MIN(N,P) ENTRIES OF S CONTAIN THE SINGULAR
! VALUES OF X ARRANGED IN DESCENDING ORDER OF MAGNITUDE.
!
! E DOUBLE PRECISION(P).
! E ORDINARILY CONTAINS ZEROS. HOWEVER SEE THE
! DISCUSSION OF INFO FOR EXCEPTIONS.
!
! U DOUBLE PRECISION(LDU,K), WHERE LDU.GE.N. IF
! JOBA.EQ.1 THEN K.EQ.N, IF JOBA.GE.2
! THEN K.EQ.MIN(N,P).
! U CONTAINS THE MATRIX OF LEFT SINGULAR VECTORS.
! U IS NOT REFERENCED IF JOBA.EQ.0. IF N.LE.P
! OR IF JOBA.EQ.2, THEN U MAY BE IDENTIFIED WITH X
! IN THE SUBROUTINE CALL.
!
! V DOUBLE PRECISION(LDV,P), WHERE LDV.GE.P.
! V CONTAINS THE MATRIX OF RIGHT SINGULAR VECTORS.
! V IS NOT REFERENCED IF JOB.EQ.0. IF P.LE.N,
! THEN V MAY BE IDENTIFIED WITH X IN THE
! SUBROUTINE CALL.
!
! INFO INTEGER.
! THE SINGULAR VALUES (AND THEIR CORRESPONDING SINGULAR
! VECTORS) S(INFO+1),S(INFO+2),...,S(M) ARE CORRECT
! (HERE M=MIN(N,P)). THUS IF INFO.EQ.0, ALL THE
! SINGULAR VALUES AND THEIR VECTORS ARE CORRECT.
! IN ANY EVENT, THE MATRIX B = TRANS(U)*X*V IS THE
! BIDIAGONAL MATRIX WITH THE ELEMENTS OF S ON ITS DIAGONAL
! AND THE ELEMENTS OF E ON ITS SUPER-DIAGONAL (TRANS(U)
! IS THE TRANSPOSE OF U). THUS THE SINGULAR VALUES
! OF X AND B ARE THE SAME.
!
! LINPACK. THIS VERSION DATED 03/19/79 .
! G.W. STEWART, UNIVERSITY OF MARYLAND, ARGONNE NATIONAL LAB.
!
! DSVDC USES THE FOLLOWING FUNCTIONS AND SUBPROGRAMS.
!
! EXTERNAL DROT
! BLAS DAXPY,DDOT,DSCAL,DSWAP,DNRM2,DROTG
! FORTRAN DABS,DMAX1,MAX0,MIN0,MOD,DSQRT
! INTERNAL VARIABLES
INTEGER :: iter, j, jobu, k, kase, kk, l, ll, lls, lm1, lp1, ls,
& lu, m, maxit,mm, mm1, mp1, nct, nctp1, ncu, nrt, nrtp1
REAL (dp) :: t, work(n)
REAL (dp) :: b, c, cs, el, emm1, f, g, scale, shift, sl, sm, sn,
& smm1, t1, test, ztest
LOGICAL :: wantu, wantv
! SET THE MAXIMUM NUMBER OF ITERATIONS.
maxit = 30
! DETERMINE WHAT IS TO BE COMPUTED.
wantu = .false.
wantv = .false.
jobu = MOD(job,100)/10
ncu = n
IF (jobu > 1) ncu = MIN(n,p)
IF (jobu /= 0) wantu = .true.
IF (MOD(job,10) /= 0) wantv = .true.
! REDUCE X TO BIDIAGONAL FORM, STORING THE DIAGONAL ELEMENTS
! IN S AND THE SUPER-DIAGONAL ELEMENTS IN E.
info = 0
nct = MIN(n-1, p)
s(1:nct+1) = 0.0_dp
nrt = MAX(0, MIN(p-2,n))
lu = MAX(nct,nrt)
IF (lu < 1) GO TO 170
DO l = 1, lu
lp1 = l + 1
IF (l > nct) GO TO 20
! COMPUTE THE TRANSFORMATION FOR THE L-TH COLUMN AND
! PLACE THE L-TH DIAGONAL IN S(L).
s(l) = SQRT( SUM( x(l:n,l)**2 ) )
IF (s(l) == 0.0D0) GO TO 10
IF (x(l,l) /= 0.0D0) s(l) = SIGN(s(l), x(l,l))
x(l:n,l) = x(l:n,l) / s(l)
x(l,l) = 1.0D0 + x(l,l)
10 s(l) = -s(l)
20 IF (p < lp1) GO TO 50
DO j = lp1, p
IF (l > nct) GO TO 30
IF (s(l) == 0.0D0) GO TO 30
! APPLY THE TRANSFORMATION.
t = -DOT_PRODUCT(x(l:n,l), x(l:n,j)) / x(l,l)
x(l:n,j) = x(l:n,j) + t * x(l:n,l)
! PLACE THE L-TH ROW OF X INTO E FOR THE
! SUBSEQUENT CALCULATION OF THE ROW TRANSFORMATION.
30 e(j) = x(l,j)
END DO
50 IF (.NOT.wantu .OR. l > nct) GO TO 70
! PLACE THE TRANSFORMATION IN U FOR SUBSEQUENT BACK MULTIPLICATION.
u(l:n,l) = x(l:n,l)
70 IF (l > nrt) CYCLE
! COMPUTE THE L-TH ROW TRANSFORMATION AND PLACE THE
! L-TH SUPER-DIAGONAL IN E(L).
e(l) = SQRT( SUM( e(lp1:p)**2 ) )
IF (e(l) == 0.0D0) GO TO 80
IF (e(lp1) /= 0.0D0) e(l) = SIGN(e(l), e(lp1))
e(lp1:lp1+p-l-1) = e(lp1:p) / e(l)
e(lp1) = 1.0D0 + e(lp1)
80 e(l) = -e(l)
IF (lp1 > n .OR. e(l) == 0.0D0) GO TO 120
! APPLY THE TRANSFORMATION.
work(lp1:n) = 0.0D0
DO j = lp1, p
work(lp1:lp1+n-l-1) = work(lp1:lp1+n-l-1) + e(j) *
& x(lp1:lp1+n-l-1,j)
END DO
DO j = lp1, p
x(lp1:lp1+n-l-1,j) = x(lp1:lp1+n-l-1,j) - (e(j)/e(lp1)) *
& work(lp1:lp1+n-l-1)
END DO
120 IF (.NOT.wantv) CYCLE
! PLACE THE TRANSFORMATION IN V FOR SUBSEQUENT
! BACK MULTIPLICATION.
v(lp1:p,l) = e(lp1:p)
END DO
! SET UP THE FINAL BIDIAGONAL MATRIX OF ORDER M.
170 m = MIN(p,n+1)
nctp1 = nct + 1
nrtp1 = nrt + 1
IF (nct < p) s(nctp1) = x(nctp1,nctp1)
IF (n < m) s(m) = 0.0D0
IF (nrtp1 < m) e(nrtp1) = x(nrtp1,m)
e(m) = 0.0D0
! IF REQUIRED, GENERATE U.
IF (.NOT.wantu) GO TO 300
IF (ncu < nctp1) GO TO 200
DO j = nctp1, ncu
u(1:n,j) = 0.0_dp
u(j,j) = 1.0_dp
END DO
200 DO ll = 1, nct
l = nct - ll + 1
IF (s(l) == 0.0D0) GO TO 250
lp1 = l + 1
IF (ncu < lp1) GO TO 220
DO j = lp1, ncu
t = -DOT_PRODUCT(u(l:n,l), u(l:n,j)) / u(l,l)
u(l:n,j) = u(l:n,j) + t * u(l:n,l)
END DO
220 u(l:n,l) = -u(l:n,l)
u(l,l) = 1.0D0 + u(l,l)
lm1 = l - 1
IF (lm1 < 1) CYCLE
u(1:lm1,l) = 0.0_dp
CYCLE
250 u(1:n,l) = 0.0_dp
u(l,l) = 1.0_dp
END DO
! IF IT IS REQUIRED, GENERATE V.
300 IF (.NOT.wantv) GO TO 350
DO ll = 1, p
l = p - ll + 1
lp1 = l + 1
IF (l > nrt) GO TO 320
IF (e(l) == 0.0D0) GO TO 320
DO j = lp1, p
t = -DOT_PRODUCT(v(lp1:lp1+p-l-1,l),
& v(lp1:lp1+p-l-1,j)) / v(lp1,l)
v(lp1:lp1+p-l-1,j) = v(lp1:lp1+p-l-1,j) + t * v(lp1:lp1+p-l-1,l)
END DO
320 v(1:p,l) = 0.0D0
v(l,l) = 1.0D0
END DO
! MAIN ITERATION LOOP FOR THE SINGULAR VALUES.
350 mm = m
iter = 0
! QUIT IF ALL THE SINGULAR VALUES HAVE BEEN FOUND.
! ...EXIT
360 IF (m == 0) GO TO 620
! IF TOO MANY ITERATIONS HAVE BEEN PERFORMED, SET FLAG AND RETURN.
IF (iter < maxit) GO TO 370
info = m
! ......EXIT
GO TO 620
! THIS SECTION OF THE PROGRAM INSPECTS FOR NEGLIGIBLE ELEMENTS
! IN THE S AND E ARRAYS. ON COMPLETION
! THE VARIABLES KASE AND L ARE SET AS FOLLOWS.
!
! KASE = 1 IF S(M) AND E(L-1) ARE NEGLIGIBLE AND L < M
! KASE = 2 IF S(L) IS NEGLIGIBLE AND L < M
! KASE = 3 IF E(L-1) IS NEGLIGIBLE, L < M, AND
! S(L), ..., S(M) ARE NOT NEGLIGIBLE (QR STEP).
! KASE = 4 IF E(M-1) IS NEGLIGIBLE (CONVERGENCE).
370 DO ll = 1, m
l = m - ll
! ...EXIT
IF (l == 0) EXIT
test = ABS(s(l)) + ABS(s(l+1))
ztest = test + ABS(e(l))
IF (ztest /= test) CYCLE
e(l) = 0.0D0
! ......EXIT
EXIT
END DO
IF (l /= m - 1) GO TO 410
kase = 4
GO TO 480
410 lp1 = l + 1
mp1 = m + 1
DO lls = lp1, mp1
ls = m - lls + lp1
! ...EXIT
IF (ls == l) EXIT
test = 0.0D0
IF (ls /= m) test = test + ABS(e(ls))
IF (ls /= l + 1) test = test + ABS(e(ls-1))
ztest = test + ABS(s(ls))
IF (ztest /= test) CYCLE
s(ls) = 0.0D0
! ......EXIT
EXIT
END DO
IF (ls /= l) GO TO 450
kase = 3
GO TO 480
450 IF (ls /= m) GO TO 460
kase = 1
GO TO 480
460 kase = 2
l = ls
480 l = l + 1
! PERFORM THE TASK INDICATED BY KASE.
SELECT CASE ( kase )
CASE ( 1)
GO TO 490
CASE ( 2)
GO TO 520
CASE ( 3)
GO TO 540
CASE ( 4)
GO TO 570
END SELECT
! DEFLATE NEGLIGIBLE S(M).
490 mm1 = m - 1
f = e(m-1)
e(m-1) = 0.0D0
DO kk = l, mm1
k = mm1 - kk + l
t1 = s(k)
CALL drotg(t1, f, cs, sn)
s(k) = t1
IF (k == l) GO TO 500
f = -sn*e(k-1)
e(k-1) = cs*e(k-1)
500 IF (wantv) CALL drot1(p, v(1:,k), v(1:,m), cs, sn)
END DO
GO TO 610
! SPLIT AT NEGLIGIBLE S(L).
520 f = e(l-1)
e(l-1) = 0.0D0
DO k = l, m
t1 = s(k)
CALL drotg(t1, f, cs, sn)
s(k) = t1
f = -sn*e(k)
e(k) = cs*e(k)
IF (wantu) CALL drot1(n, u(1:,k), u(1:,l-1), cs, sn)
END DO
GO TO 610
! PERFORM ONE QR STEP.
!
! CALCULATE THE SHIFT.
540 scale = MAX(ABS(s(m)),ABS(s(m-1)),ABS(e(m-1)),ABS(s(l)),ABS(e(l)))
sm = s(m)/scale
smm1 = s(m-1)/scale
emm1 = e(m-1)/scale
sl = s(l)/scale
el = e(l)/scale
b = ((smm1 + sm)*(smm1 - sm) + emm1**2)/2.0D0
c = (sm*emm1)**2
shift = 0.0D0
IF (b == 0.0D0 .AND. c == 0.0D0) GO TO 550
shift = SQRT(b**2+c)
IF (b < 0.0D0) shift = -shift
shift = c/(b + shift)
550 f = (sl + sm)*(sl - sm) - shift
g = sl*el
! CHASE ZEROS.
mm1 = m - 1
DO k = l, mm1
CALL drotg(f, g, cs, sn)
IF (k /= l) e(k-1) = f
f = cs*s(k) + sn*e(k)
e(k) = cs*e(k) - sn*s(k)
g = sn*s(k+1)
s(k+1) = cs*s(k+1)
IF (wantv) CALL drot1(p, v(1:,k), v(1:,k+1), cs, sn)
CALL drotg(f, g, cs, sn)
s(k) = f
f = cs*e(k) + sn*s(k+1)
s(k+1) = -sn*e(k) + cs*s(k+1)
g = sn*e(k+1)
e(k+1) = cs*e(k+1)
IF (wantu .AND. k < n) CALL drot1(n, u(1:,k), u(1:,k+1), cs, sn)
END DO
e(m-1) = f
iter = iter + 1
GO TO 610
! CONVERGENCE.
! MAKE THE SINGULAR VALUE POSITIVE.
570 IF (s(l) >= 0.0D0) GO TO 590
s(l) = -s(l)
IF (wantv) v(1:p,l) = -v(1:p,l)
! ORDER THE SINGULAR VALUE.
590 IF (l == mm) GO TO 600
! ...EXIT
IF (s(l) >= s(l+1)) GO TO 600
t = s(l)
s(l) = s(l+1)
s(l+1) = t
IF (wantv .AND. l < p) CALL dswap1(p, v(1:,l), v(1:,l+1))
IF (wantu .AND. l < n) CALL dswap1(n, u(1:,l), u(1:,l+1))
l = l + 1
GO TO 590
600 iter = 0
m = m - 1
610 GO TO 360
620 RETURN
END SUBROUTINE dsvdc
END MODULE SVD