Program f12abfe

!     F12ABF Example Program Text

!     Mark 25 Release. NAG Copyright 2014.

!     .. Use Statements ..
      Use nag_library, Only: dgttrf, dgttrs, dnrm2, f12aaf, f12abf, f12acf,    &
                             f12adf, f12aef, nag_wp
!     .. Implicit None Statement ..
      Implicit None
!     .. Parameters ..
      Real (Kind=nag_wp), Parameter    :: one = 1.0_nag_wp
      Real (Kind=nag_wp), Parameter    :: two = 2.0_nag_wp
      Integer, Parameter               :: imon = 0, nin = 5, nout = 6
!     .. Local Scalars ..
      Real (Kind=nag_wp)               :: h, rho, s, s1, s2, s3, sigmai, sigmar
      Integer                          :: i, ifail, ifail1, info, irevcm,      &
                                          lcomm, ldv, licomm, n, nconv, ncv,   &
                                          nev, niter, nshift, nx
!     .. Local Arrays ..
      Real (Kind=nag_wp), Allocatable  :: comm(:), d(:,:), dd(:), dl(:),       &
                                          du(:), du2(:), mx(:), resid(:),      &
                                          v(:,:), x(:)
      Integer, Allocatable             :: icomm(:), ipiv(:)
!     .. Intrinsic Procedures ..
      Intrinsic                        :: real
!     .. Executable Statements ..
      Write (nout,*) 'F12ABF Example Program Results'
      Write (nout,*)
!     Skip heading in data file
      Read (nin,*)
      Read (nin,*) nx, nev, ncv, rho, sigmar, sigmai
      n = nx*nx
      ldv = n
      licomm = 140
      lcomm = 3*n + 3*ncv*ncv + 6*ncv + 60
      Allocate (comm(lcomm),d(ncv,3),dd(n),dl(n),du(n),du2(n),mx(n),resid(n), &
        v(ldv,ncv),x(n),icomm(licomm),ipiv(n))

!     ifail: behaviour on error exit
!             =0 for hard exit, =1 for quiet-soft, =-1 for noisy-soft
      ifail = 0
      Call f12aaf(n,nev,ncv,icomm,licomm,comm,lcomm,ifail)

!     Set the mode.
      ifail = 0
      Call f12adf('SHIFTED INVERSE REAL',icomm,comm,ifail)

!     Construct C = A - SIGMA*I, and factorize using DGTTRF/F07CDF.
      h = one/real(n+1,kind=nag_wp)
      s = rho*h/two
      s1 = -one - s
      s2 = two - sigmar
      s3 = -one + s
      dl(1:n-1) = s1
      dd(1:n-1) = s2
      du(1:n-1) = s3
      dd(n) = s2

!     The NAG name equivalent of dgttrf is f07cdf
      Call dgttrf(n,dl,dd,du,du2,ipiv,info)

      irevcm = 0
      ifail = -1
loop: Do
        Call f12abf(irevcm,resid,v,ldv,x,mx,nshift,comm,icomm,ifail)

        If (irevcm/=5) Then
          If (irevcm==-1 .Or. irevcm==1) Then
!           Perform  x <--- OP*x = inv[A-SIGMA*I]*x.
!           The NAG name equivalent of dgttrs is f07cef
            Call dgttrs('N',n,1,dl,dd,du,du2,ipiv,x,n,info)
          Else If (irevcm==4 .And. imon/=0) Then
!           Output monitoring information
            Call f12aef(niter,nconv,d,d(1,2),d(1,3),icomm,comm)
!           The NAG name equivalent of dnrm2 is f06ejf
            Write (6,99999) niter, nconv, dnrm2(nev,d(1,3),1)
          End If
        Else
          Exit loop
        End If
      End Do loop
      If (ifail==0) Then
!       Post-Process using F12ACF to compute eigenvalues/vectors.
        ifail1 = 0
        Call f12acf(nconv,d,d(1,2),v,ldv,sigmar,sigmai,resid,v,ldv,comm,icomm, &
          ifail1)
!       Print computed eigenvalues.
        Write (nout,99998) nconv
        Do i = 1, nconv
          Write (nout,99997) i, d(i,1), d(i,2)
        End Do
      End If

99999 Format (1X,'Iteration',1X,I3,', No. converged =',1X,I3,', norm o', &
        'f estimates =',E16.8)
99998 Format (1X/' The ',I4,' Ritz values of closest to unity are:'/)
99997 Format (1X,I8,5X,'( ',F12.4,' , ',F12.4,' )')
    End Program f12abfe