Program f12jjfe
! F12JJF Example Program Text
! Mark 28.5 Release. NAG Copyright 2022.
! .. Use Statements ..
Use, Intrinsic :: iso_c_binding, Only: c_ptr
Use nag_library, Only: dsymm, f12jaf, f12jbf, f12jef, f12jjf, f12jzf, &
nag_wp, x04caf, zsytrf, zsytrs
! .. Implicit None Statement ..
Implicit None
! .. Parameters ..
Integer, Parameter :: nin = 5, nout = 6
! .. Local Scalars ..
Type (c_ptr) :: handle
Complex (Kind=nag_wp) :: ze
Real (Kind=nag_wp) :: emax, emin, eps
Integer :: i, ifail, irevcm, iter, lda, ldx, &
ldy, ldz, lwork, m0, n, nconv
! .. Local Arrays ..
Complex (Kind=nag_wp), Allocatable :: az(:,:), work(:), y(:,:)
Real (Kind=nag_wp), Allocatable :: a(:,:), d(:), resid(:), x(:,:), &
z(:,:)
Integer, Allocatable :: ipiv(:)
! .. Intrinsic Procedures ..
Intrinsic :: cmplx
! .. Executable Statements ..
Write (nout,*) 'F12JJF Example Program Results'
Write (nout,*)
! Skip heading in data file
Read (nin,*)
Read (nin,*) n
lda = n
m0 = n
ldx = n
ldy = n
ldz = n
lwork = 64*n
Allocate (x(ldx,m0),y(ldy,m0),z(ldz,m0),resid(m0),d(m0),a(lda,n), &
az(n,n),ipiv(n),work(lwork))
! Read the upper triangular part of the matrix A from data file
Read (nin,*)(a(i,i:n),i=1,n)
! Initialize the data handle
ifail = 0
Call f12jaf(handle=handle,ifail=ifail)
! Set the number of contour points to use
Call f12jbf(handle=handle,str='Contour Points Hermitian = 12', &
ifail=ifail)
emin = -3.0_nag_wp
emax = 3.0_nag_wp
! Generate the contour
Call f12jef(handle=handle,emin=emin,emax=emax,ifail=ifail)
irevcm = 0
revcomm: Do
Call f12jjf(handle=handle,irevcm=irevcm,ze=ze,n=n,x=x,ldx=ldx,y=y, &
ldy=ldy,m0=m0,nconv=nconv,d=d,z=z,ldz=ldz,eps=eps,iter=iter, &
resid=resid,ifail=ifail)
Select Case (irevcm)
Case (1)
! Form the matrix ze I - A
Do i = 1, n
az(i,i:n) = cmplx(-a(i,i:n),kind=nag_wp)
az(i,i) = ze + az(i,i)
End Do
! Compute a Bunch-Kaufman factorization of ze I -A
! The NAG name equivalent of zsytrf is f07nrf
Call zsytrf('Upper',n,az,n,ipiv,work,lwork,ifail)
If (ifail/=0) Then
Exit revcomm
End If
Cycle revcomm
Case (2)
! Solve the linear system (ze I -A)w = y, overwriting y with w
! The NAG name equivalent of zsytrs is f07nsf
Call zsytrs('Upper',n,m0,az,n,ipiv,y,ldy,ifail)
If (ifail/=0) Then
Exit revcomm
End If
Cycle revcomm
Case (3)
! Compute x <- Az
! The NAG name equivalent of dsymm is f06ycf
Call dsymm('Left','Upper',n,m0,1.0_nag_wp,a,lda,z,ldz,0.0_nag_wp,x, &
ldx)
Cycle revcomm
Case (4)
! Since we are not solving a generalized eigenvalue problem set x = z
x(1:n,1:m0) = z(1:n,1:m0)
Cycle revcomm
Case Default
Exit revcomm
End Select
End Do revcomm
If (ifail==0) Then
! Print solution
Write (nout,*) 'Eigenvalues'
Write (nout,99999) d(1:nconv)
Flush (nout)
! Normalize the eigenvectors: first element positive
Do i = 1, nconv
If ((z(1,i)<0.0_nag_wp)) Then
z(1:n,i) = -z(1:n,i)
End If
End Do
Call x04caf('General',' ',n,nconv,z,ldz,'Eigenvectors',ifail)
Else
Write (nout,99998) 'Failure in f12jjf IFAIL =', ifail
End If
! Destroy the data handle
Call f12jzf(handle=handle,ifail=ifail)
99999 Format (3X,(8F8.4))
99998 Format (1X,A,I4)
End Program f12jjfe