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!    This file is part of ELPA.
!
!    The ELPA library was originally created by the ELPA consortium,
!    consisting of the following organizations:
!
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!    - Max Planck Computing and Data Facility (MPCDF), formerly known as
!      Rechenzentrum Garching der Max-Planck-Gesellschaft (RZG),
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!    - Bergische Universität Wuppertal, Lehrstuhl für angewandte
!      Informatik,
!    - Technische Universität München, Lehrstuhl für Informatik mit
!      Schwerpunkt Wissenschaftliches Rechnen ,
!    - Fritz-Haber-Institut, Berlin, Abt. Theorie,
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!    - Max-Plack-Institut für Mathematik in den Naturwissenschaften,
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!      Leipzig, Abt. Komplexe Strukutren in Biologie und Kognition,
!      and
!    - IBM Deutschland GmbH
!
!
!    More information can be found here:
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!    http://elpa.mpcdf.mpg.de/
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!
!    ELPA is free software: you can redistribute it and/or modify
!    it under the terms of the version 3 of the license of the
!    GNU Lesser General Public License as published by the Free
!    Software Foundation.
!
!    ELPA is distributed in the hope that it will be useful,
!    but WITHOUT ANY WARRANTY; without even the implied warranty of
!    MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
!    GNU Lesser General Public License for more details.
!
!    You should have received a copy of the GNU Lesser General Public License
!    along with ELPA.  If not, see <http://www.gnu.org/licenses/>
!
!    ELPA reflects a substantial effort on the part of the original
!    ELPA consortium, and we ask you to respect the spirit of the
!    license that we chose: i.e., please contribute any changes you
!    may have back to the original ELPA library distribution, and keep
!    any derivatives of ELPA under the same license that we chose for
!    the original distribution, the GNU Lesser General Public License.
!
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! Author: Andreas Marek, MCPDF
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#include "config-f90.h"
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  !c> #include <complex.h>
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  !c> /*! \brief C old, deprecated interface, will be deleted. Use "elpa_get_communicators"
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  !c> *
  !c> * \param mpi_comm_word    MPI global communicator (in)
  !c> * \param my_prow          Row coordinate of the calling process in the process grid (in)
  !c> * \param my_pcol          Column coordinate of the calling process in the process grid (in)
  !c> * \param mpi_comm_rows    Communicator for communicating within rows of processes (out)
  !c> * \result int             integer error value of mpi_comm_split function
  !c> */
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  !c> int get_elpa_row_col_comms(int mpi_comm_world, int my_prow, int my_pcol, int *mpi_comm_rows, int *mpi_comm_cols);
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  function get_elpa_row_col_comms_wrapper_c_name1(mpi_comm_world, my_prow, my_pcol, &
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                                          mpi_comm_rows, mpi_comm_cols)     &
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                                          result(mpierr) bind(C,name="get_elpa_row_col_comms")
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    use, intrinsic :: iso_c_binding
    use elpa1, only : get_elpa_row_col_comms

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    implicit none
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    integer(kind=c_int)         :: mpierr
    integer(kind=c_int), value  :: mpi_comm_world, my_prow, my_pcol
    integer(kind=c_int)         :: mpi_comm_rows, mpi_comm_cols

    mpierr = get_elpa_row_col_comms(mpi_comm_world, my_prow, my_pcol, &
                                    mpi_comm_rows, mpi_comm_cols)

  end function
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  !c> #include <complex.h>

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  !c> /*! \brief C old, deprecated interface, will be deleted. Use "elpa_get_communicators"
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  !c> *
  !c> * \param mpi_comm_word    MPI global communicator (in)
  !c> * \param my_prow          Row coordinate of the calling process in the process grid (in)
  !c> * \param my_pcol          Column coordinate of the calling process in the process grid (in)
  !c> * \param mpi_comm_rows    Communicator for communicating within rows of processes (out)
  !c> * \result int             integer error value of mpi_comm_split function
  !c> */
  !c> int get_elpa_communicators(int mpi_comm_world, int my_prow, int my_pcol, int *mpi_comm_rows, int *mpi_comm_cols);
  function get_elpa_row_col_comms_wrapper_c_name2(mpi_comm_world, my_prow, my_pcol, &
                                          mpi_comm_rows, mpi_comm_cols)     &
                                          result(mpierr) bind(C,name="get_elpa_communicators")
    use, intrinsic :: iso_c_binding
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    use elpa1, only : get_elpa_communicators
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    implicit none
    integer(kind=c_int)         :: mpierr
    integer(kind=c_int), value  :: mpi_comm_world, my_prow, my_pcol
    integer(kind=c_int)         :: mpi_comm_rows, mpi_comm_cols

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    mpierr = get_elpa_communicators(mpi_comm_world, my_prow, my_pcol, &
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                                    mpi_comm_rows, mpi_comm_cols)

  end function

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  !c> #include <complex.h>

  !c> /*! \brief C interface to create ELPA communicators
  !c> *
  !c> * \param mpi_comm_word    MPI global communicator (in)
  !c> * \param my_prow          Row coordinate of the calling process in the process grid (in)
  !c> * \param my_pcol          Column coordinate of the calling process in the process grid (in)
  !c> * \param mpi_comm_rows    Communicator for communicating within rows of processes (out)
  !c> * \result int             integer error value of mpi_comm_split function
  !c> */
  !c> int elpa_get_communicators(int mpi_comm_world, int my_prow, int my_pcol, int *mpi_comm_rows, int *mpi_comm_cols);
  function elpa_get_communicators_wrapper_c(mpi_comm_world, my_prow, my_pcol, &
                                          mpi_comm_rows, mpi_comm_cols)     &
                                          result(mpierr) bind(C,name="elpa_get_communicators")
    use, intrinsic :: iso_c_binding
    use elpa1, only : elpa_get_communicators

    implicit none
    integer(kind=c_int)         :: mpierr
    integer(kind=c_int), value  :: mpi_comm_world, my_prow, my_pcol
    integer(kind=c_int)         :: mpi_comm_rows, mpi_comm_cols

    mpierr = elpa_get_communicators(mpi_comm_world, my_prow, my_pcol, &
                                    mpi_comm_rows, mpi_comm_cols)

  end function
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  !c>  /*! \brief C interface to solve the double-precision real eigenvalue problem with 1-stage solver
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  !c>  *
  !c> *  \param  na                   Order of matrix a
  !c> *  \param  nev                  Number of eigenvalues needed.
  !c> *                               The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                    Distributed matrix for which eigenvalues are to be computed.
  !c> *                               Distribution is like in Scalapack.
  !c> *                               The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                   Leading dimension of a
  !c> *  \param ev(na)                On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                     On output: Eigenvectors of a
  !c> *                               Distribution is like in Scalapack.
  !c> *                               Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                               even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                   Leading dimension of q
  !c> *  \param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols           distributed number of matrix columns
  !c> *  \param mpi_comm_rows        MPI-Communicator for rows
  !c> *  \param mpi_comm_cols        MPI-Communicator for columns
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c>*/
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#define DOUBLE_PRECISION_REAL 1
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#ifdef DOUBLE_PRECISION_REAL
  !c> int elpa_solve_evp_real_1stage_double_precision(int na, int nev, double *a, int lda, double *ev, double *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols);
#else
  !c> int elpa_solve_evp_real_1stage_single_precision(int na, int nev, float *a, int lda, float *ev, float *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols);
#endif
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#ifdef DOUBLE_PRECISION_REAL
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  function solve_elpa1_evp_real_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk, &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols)      &
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                                  result(success) bind(C,name="elpa_solve_evp_real_1stage_double_precision")
#else
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  function solve_elpa1_evp_real_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk, &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols)      &
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                                  result(success) bind(C,name="elpa_solve_evp_real_1stage_single_precision")
#endif
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    use, intrinsic :: iso_c_binding
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    use elpa1
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    implicit none
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    integer(kind=c_int)                    :: success
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    integer(kind=c_int), value, intent(in) :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows
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#ifdef DOUBLE_PRECISION_REAL
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    real(kind=c_double)                    :: ev(1:na)
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#ifdef USE_ASSUMED_SIZE
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    real(kind=c_double)                    :: a(lda,*), q(ldq,*)
#else
    real(kind=c_double)                    :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
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#endif

#else /* SINGLE_PRECISION */
    real(kind=c_float)                     :: ev(1:na)

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#ifdef USE_ASSUMED_SIZE
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    real(kind=c_float)                     :: a(lda,*), q(ldq,*)
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#else
    real(kind=c_float)                     :: a(1:lda,1:matrixCols), ev(1:na), q(1:ldq,1:matrixCols)
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#endif

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#endif
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    logical                                :: successFortran

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#ifdef DOUBLE_PRECISION_REAL
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    successFortran = elpa_solve_evp_real_1stage_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols)
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#else
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    successFortran = elpa_solve_evp_real_1stage_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols)
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#endif
    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

#ifdef WANT_SINGLE_PRECISION_REAL
#undef DOUBLE_PRECISION_REAL
  !c>  /*! \brief C interface to solve the single-precision real eigenvalue problem with 1-stage solver
  !c>  *
  !c> *  \param  na                   Order of matrix a
  !c> *  \param  nev                  Number of eigenvalues needed.
  !c> *                               The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                    Distributed matrix for which eigenvalues are to be computed.
  !c> *                               Distribution is like in Scalapack.
  !c> *                               The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                   Leading dimension of a
  !c> *  \param ev(na)                On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                     On output: Eigenvectors of a
  !c> *                               Distribution is like in Scalapack.
  !c> *                               Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                               even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                   Leading dimension of q
  !c> *  \param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols           distributed number of matrix columns
  !c> *  \param mpi_comm_rows        MPI-Communicator for rows
  !c> *  \param mpi_comm_cols        MPI-Communicator for columns
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c>*/
#ifdef DOUBLE_PRECISION_REAL
  !c> int elpa_solve_evp_real_1stage_double_precision(int na, int nev, double *a, int lda, double *ev, double *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols);
#else
  !c> int elpa_solve_evp_real_1stage_single_precision(int na, int nev, float *a, int lda, float *ev, float *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols);
#endif

#ifdef DOUBLE_PRECISION_REAL
  function solve_elpa1_evp_real_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk, &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols)      &
                                  result(success) bind(C,name="elpa_solve_evp_real_1stage_double_precision")
#else
  function solve_elpa1_evp_real_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk, &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols)      &
                                  result(success) bind(C,name="elpa_solve_evp_real_1stage_single_precision")
#endif
    use, intrinsic :: iso_c_binding
    use elpa1

    implicit none
    integer(kind=c_int)                    :: success
    integer(kind=c_int), value, intent(in) :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows
#ifdef DOUBLE_PRECISION_REAL
    real(kind=c_double)                    :: a(1:lda,1:matrixCols), ev(1:na), q(1:ldq,1:matrixCols)
#else
    real(kind=c_float)                     :: a(1:lda,1:matrixCols), ev(1:na), q(1:ldq,1:matrixCols)
#endif
    logical                                :: successFortran
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#ifdef DOUBLE_PRECISION_REAL
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    successFortran = elpa_solve_evp_real_1stage_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols)
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#else
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    successFortran = elpa_solve_evp_real_1stage_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols)
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#endif
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    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function
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#endif /* WANT_SINGLE_PRECISION_REAL */

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  !c> /*! \brief C interface to solve the double-precision complex eigenvalue problem with 1-stage solver
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  !c> *
  !c> *  \param  na                   Order of matrix a
  !c> *  \param  nev                  Number of eigenvalues needed.
  !c> *                               The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                    Distributed matrix for which eigenvalues are to be computed.
  !c> *                               Distribution is like in Scalapack.
  !c> *                               The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                   Leading dimension of a
  !c> *  \param ev(na)                On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                     On output: Eigenvectors of a
  !c> *                               Distribution is like in Scalapack.
  !c> *                               Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                               even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                   Leading dimension of q
  !c> *  \param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols           distributed number of matrix columns
  !c> *  \param mpi_comm_rows        MPI-Communicator for rows
  !c> *  \param mpi_comm_cols        MPI-Communicator for columns
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
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#define DOUBLE_PRECISION_COMPLEX 1
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#ifdef DOUBLE_PRECISION_COMPLEX
  !c> int elpa_solve_evp_complex_1stage_double_precision(int na, int nev, double complex *a, int lda, double *ev, double complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols);
#else
  !c> int elpa_solve_evp_complex_1stage_single_precision(int na, int nev,  complex *a, int lda, float *ev, complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols);
#endif

#ifdef DOUBLE_PRECISION_COMPLEX
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  function solve_evp_real_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk, &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols)      &
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                                  result(success) bind(C,name="elpa_solve_evp_complex_1stage_double_precision")
#else
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  function solve_evp_real_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk, &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols)      &
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                                  result(success) bind(C,name="elpa_solve_evp_complex_1stage_single_precision")
#endif
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    use, intrinsic :: iso_c_binding
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    use elpa1
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    implicit none
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    integer(kind=c_int)                    :: success
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    integer(kind=c_int), value, intent(in) :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows
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#ifdef DOUBLE_PRECISION_COMPLEX
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    real(kind=c_double)                    :: ev(1:na)
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#ifdef USE_ASSUMED_SIZE
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    complex(kind=c_double_complex)         :: a(lda,*), q(ldq,*)
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#else
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    complex(kind=c_double_complex)         :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
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#endif
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#else /* SINGLE_PRECISION */
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    real(kind=c_float)                     :: ev(1:na)
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#ifdef USE_ASSUMED_SIZE
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    complex(kind=c_float_complex)          :: a(lda,*), q(ldq,*)
#else
    complex(kind=c_float_complex)          :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif

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#endif
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    logical                                :: successFortran

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#ifdef DOUBLE_PRECISION_COMPLEX
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    successFortran = elpa_solve_evp_complex_1stage_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, &
                                                          mpi_comm_rows, mpi_comm_cols)
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#else
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    successFortran = elpa_solve_evp_complex_1stage_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, &
                                                          mpi_comm_rows, mpi_comm_cols)
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#endif
    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

#ifdef WANT_SINGLE_PRECISION_COMPLEX

  !c> /*! \brief C interface to solve the single-precision complex eigenvalue problem with 1-stage solver
  !c> *
  !c> *  \param  na                   Order of matrix a
  !c> *  \param  nev                  Number of eigenvalues needed.
  !c> *                               The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                    Distributed matrix for which eigenvalues are to be computed.
  !c> *                               Distribution is like in Scalapack.
  !c> *                               The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                   Leading dimension of a
  !c> *  \param ev(na)                On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                     On output: Eigenvectors of a
  !c> *                               Distribution is like in Scalapack.
  !c> *                               Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                               even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                   Leading dimension of q
  !c> *  \param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols           distributed number of matrix columns
  !c> *  \param mpi_comm_rows        MPI-Communicator for rows
  !c> *  \param mpi_comm_cols        MPI-Communicator for columns
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
#undef DOUBLE_PRECISION_COMPLEX
#ifdef DOUBLE_PRECISION_COMPLEX
  !c> int elpa_solve_evp_complex_1stage_double_precision(int na, int nev, double complex *a, int lda, double *ev, double complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols);
#else
  !c> int elpa_solve_evp_complex_1stage_single_precision(int na, int nev,  complex *a, int lda, float *ev, complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols);
#endif

#ifdef DOUBLE_PRECISION_COMPLEX
  function solve_evp_real_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk, &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols)      &
                                  result(success) bind(C,name="elpa_solve_evp_complex_1stage_double_precision")
#else
  function solve_evp_real_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk, &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols)      &
                                  result(success) bind(C,name="elpa_solve_evp_complex_1stage_single_precision")
#endif
    use, intrinsic :: iso_c_binding
    use elpa1

    implicit none
    integer(kind=c_int)                    :: success
    integer(kind=c_int), value, intent(in) :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows
#ifdef DOUBLE_PRECISION_COMPLEX
    complex(kind=c_double_complex)         :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
    real(kind=c_double)                    :: ev(1:na)
#else
    complex(kind=c_float_complex)          :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
    real(kind=c_float)                     :: ev(1:na)
#endif

    logical                                :: successFortran
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#ifdef DOUBLE_PRECISION_COMPLEX
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    successFortran = elpa_solve_evp_complex_1stage_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, &
                                                          mpi_comm_rows, mpi_comm_cols)
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#else
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    successFortran = elpa_solve_evp_complex_1stage_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, &
                                                          mpi_comm_rows, mpi_comm_cols)
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#endif
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    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function
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#endif /* WANT_SINGLE_PRECISION_COMPLEX */


  !c> /*! \brief C interface to solve the double-precision real eigenvalue problem with 2-stage solver
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  !c> *
  !c> *  \param  na                        Order of matrix a
  !c> *  \param  nev                       Number of eigenvalues needed.
  !c> *                                    The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                         Distributed matrix for which eigenvalues are to be computed.
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                        Leading dimension of a
  !c> *  \param ev(na)                     On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                          On output: Eigenvectors of a
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                                    even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                        Leading dimension of q
  !c> *  \param nblk                       blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols                 distributed number of matrix columns
  !c> *  \param mpi_comm_rows              MPI-Communicator for rows
  !c> *  \param mpi_comm_cols              MPI-Communicator for columns
  !c> *  \param mpi_coll_all               MPI communicator for the total processor set
  !c> *  \param THIS_REAL_ELPA_KERNEL_API  specify used ELPA2 kernel via API
  !c> *  \param use_qr                     use QR decomposition 1 = yes, 0 = no
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
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#define DOUBLE_PRECISION_REAL 1
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#ifdef DOUBLE_PRECISION_REAL
  !c> int elpa_solve_evp_real_2stage_double_precision(int na, int nev, double *a, int lda, double *ev, double *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_REAL_ELPA_KERNEL_API, int useQR);
#else
  !c> int elpa_solve_evp_real_2stage_single_precision(int na, int nev, float *a, int lda, float *ev, float *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_REAL_ELPA_KERNEL_API, int useQR);
#endif

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#ifdef DOUBLE_PRECISION_REAL
  function solve_elpa2_evp_real_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk,    &
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                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all, &
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                                  THIS_REAL_ELPA_KERNEL_API, useQR)           &
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                                  result(success) bind(C,name="elpa_solve_evp_real_2stage_double_precision")
#else
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  function solve_elpa2_evp_real_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all, &
                                  THIS_REAL_ELPA_KERNEL_API, useQR)           &
                                  result(success) bind(C,name="elpa_solve_evp_real_2stage_double_precision")

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                                  result(success) bind(C,name="elpa_solve_evp_real_2stage_single_precision")
#endif
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    use, intrinsic :: iso_c_binding
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    use elpa2
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    implicit none
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    integer(kind=c_int)                    :: success
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    integer(kind=c_int), value, intent(in) :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows, &
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                                              mpi_comm_all
    integer(kind=c_int), value, intent(in) :: THIS_REAL_ELPA_KERNEL_API, useQR
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#ifdef DOUBLE_PRECISION_REAL
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    real(kind=c_double)                    :: ev(1:na)
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#ifdef USE_ASSUMED_SIZE
    real(kind=c_double)                    :: a(lda,*), q(ldq,*)
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#else
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    real(kind=c_double)                    :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif
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#else /* SINGLE_PRECISION */

    real(kind=c_float)                     :: ev(1:na)
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#ifdef USE_ASSUMED_SIZE
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    real(kind=c_float)                     :: a(1:lda,*), q(1:ldq,*)
#else
    real(kind=c_float)                     :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif

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#endif
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    logical                                :: successFortran, useQRFortran

    if (useQR .eq. 0) then
      useQRFortran =.false.
    else
      useQRFortran = .true.
    endif

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#ifdef DOUBLE_PRECISION_REAL
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    successFortran = elpa_solve_evp_real_2stage_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, &
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                                           mpi_comm_cols, mpi_comm_all,                                  &
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                                           THIS_REAL_ELPA_KERNEL_API, useQRFortran)
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#else
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    successFortran = elpa_solve_evp_real_2stage_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, &
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                                           mpi_comm_cols, mpi_comm_all,                                  &
                                           THIS_REAL_ELPA_KERNEL_API, useQRFortran)
#endif
    if (successFortran) then
      success = 1
    else
      success = 0
    endif
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  end function

#ifdef WANT_SINGLE_PRECISION_REAL

  !c> /*! \brief C interface to solve the single-precision real eigenvalue problem with 2-stage solver
  !c> *
  !c> *  \param  na                        Order of matrix a
  !c> *  \param  nev                       Number of eigenvalues needed.
  !c> *                                    The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                         Distributed matrix for which eigenvalues are to be computed.
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                        Leading dimension of a
  !c> *  \param ev(na)                     On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                          On output: Eigenvectors of a
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                                    even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                        Leading dimension of q
  !c> *  \param nblk                       blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols                 distributed number of matrix columns
  !c> *  \param mpi_comm_rows              MPI-Communicator for rows
  !c> *  \param mpi_comm_cols              MPI-Communicator for columns
  !c> *  \param mpi_coll_all               MPI communicator for the total processor set
  !c> *  \param THIS_REAL_ELPA_KERNEL_API  specify used ELPA2 kernel via API
  !c> *  \param use_qr                     use QR decomposition 1 = yes, 0 = no
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
#undef DOUBLE_PRECISION_REAL
#ifdef DOUBLE_PRECISION_REAL
  !c> int elpa_solve_evp_real_2stage_double_precision(int na, int nev, double *a, int lda, double *ev, double *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_REAL_ELPA_KERNEL_API, int useQR);
#else
  !c> int elpa_solve_evp_real_2stage_single_precision(int na, int nev, float *a, int lda, float *ev, float *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_REAL_ELPA_KERNEL_API, int useQR);
#endif

#ifdef DOUBLE_PRECISION_REAL
  function solve_elpa2_evp_real_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all, &
                                  THIS_REAL_ELPA_KERNEL_API, useQR)           &
                                  result(success) bind(C,name="elpa_solve_evp_real_2stage_double_precision")
#else
  function solve_elpa2_evp_real_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all, &
                                  THIS_REAL_ELPA_KERNEL_API, useQR)           &
                                  result(success) bind(C,name="elpa_solve_evp_real_2stage_single_precision")
#endif
    use, intrinsic :: iso_c_binding
    use elpa2

    implicit none
    integer(kind=c_int)                    :: success
    integer(kind=c_int), value, intent(in) :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows, &
                                              mpi_comm_all
    integer(kind=c_int), value, intent(in) :: THIS_REAL_ELPA_KERNEL_API, useQR
#ifdef DOUBLE_PRECISION_REAL
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    real(kind=c_double)                    ::  ev(1:na)
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#ifdef USE_ASSUMED_SIZE
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    real(kind=c_double)                    :: a(1:lda,*), q(1:ldq,*)
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#else
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    real(kind=c_double)                    :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif
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#else /* SINGLE_PRECISION */

    real(kind=c_float)                     :: ev(1:na)
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#ifdef USE_ASSUMED_SIZE
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    real(kind=c_float)                     :: a(1:lda,*), q(1:ldq,*)
#else
    real(kind=c_float)                     :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
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#endif

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#endif
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    logical                                :: successFortran, useQRFortran

    if (useQR .eq. 0) then
      useQRFortran =.false.
    else
      useQRFortran = .true.
    endif

#ifdef DOUBLE_PRECISION_REAL
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    successFortran = elpa_solve_evp_real_2stage_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, &
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                                           mpi_comm_cols, mpi_comm_all,                                  &
                                           THIS_REAL_ELPA_KERNEL_API, useQRFortran)
#else
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    successFortran = elpa_solve_evp_real_2stage_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, &
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                                           mpi_comm_cols, mpi_comm_all,                                  &
                                           THIS_REAL_ELPA_KERNEL_API, useQRFortran)
#endif
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    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

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#endif /* WANT_SINGLE_PRECISION_REAL */
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  !c> /*! \brief C interface to solve the double-precision complex eigenvalue problem with 2-stage solver
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  !c> *
  !c> *  \param  na                        Order of matrix a
  !c> *  \param  nev                       Number of eigenvalues needed.
  !c> *                                    The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                         Distributed matrix for which eigenvalues are to be computed.
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                        Leading dimension of a
  !c> *  \param ev(na)                     On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                          On output: Eigenvectors of a
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                                    even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                        Leading dimension of q
  !c> *  \param nblk                       blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols                 distributed number of matrix columns
  !c> *  \param mpi_comm_rows              MPI-Communicator for rows
  !c> *  \param mpi_comm_cols              MPI-Communicator for columns
  !c> *  \param mpi_coll_all               MPI communicator for the total processor set
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  !c> *  \param THIS_COMPLEX_ELPA_KERNEL_API  specify used ELPA2 kernel via API
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  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
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#define DOUBLE_PRECISION_COMPLEX 1

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#ifdef DOUBLE_PRECISION_COMPLEX
  !c> int elpa_solve_evp_complex_2stage_double_precision(int na, int nev, double complex *a, int lda, double *ev, double complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_COMPLEX_ELPA_KERNEL_API);
#else
  !c> int elpa_solve_evp_complex_2stage_single_precision(int na, int nev, complex *a, int lda, float *ev, complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_COMPLEX_ELPA_KERNEL_API);
#endif
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#ifdef DOUBLE_PRECISION_COMPLEX
  function solve_elpa2_evp_complex_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk,    &
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                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all,    &
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                                  THIS_COMPLEX_ELPA_KERNEL_API)                  &
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                                  result(success) bind(C,name="elpa_solve_evp_complex_2stage_double_precision")
#else
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  function solve_elpa2_evp_complex_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all,    &
                                  THIS_COMPLEX_ELPA_KERNEL_API)                  &
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                                  result(success) bind(C,name="elpa_solve_evp_complex_2stage_single_precision")
#endif
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    use, intrinsic :: iso_c_binding
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    use elpa2
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    implicit none
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    integer(kind=c_int)                    :: success
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    integer(kind=c_int), value, intent(in) :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows, &
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                                              mpi_comm_all
    integer(kind=c_int), value, intent(in) :: THIS_COMPLEX_ELPA_KERNEL_API
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#ifdef DOUBLE_PRECISION_COMPLEX
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    real(kind=c_double)                    :: ev(1:na)
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#ifdef USE_ASSUMED_SIZE
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    complex(kind=c_double_complex)         :: a(lda,*), q(ldq,*)
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#else
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    complex(kind=c_double_complex)         :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
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#endif
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#else /* SINGLE_PRECISION */
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    real(kind=c_float)                     :: ev(1:na)
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#ifdef USE_ASSUMED_SIZE
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    complex(kind=c_float_complex)          ::  a(lda,*), q(ldq,*)
#else
    complex(kind=c_float_complex)          :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif

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#endif
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    logical                                :: successFortran

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#ifdef DOUBLE_PRECISION_COMPLEX
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    successFortran = elpa_solve_evp_complex_2stage_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, &
                                                          mpi_comm_rows, mpi_comm_cols, &
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                                              mpi_comm_all, THIS_COMPLEX_ELPA_KERNEL_API)
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#else
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    successFortran = elpa_solve_evp_complex_2stage_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, &
                                                          mpi_comm_rows, mpi_comm_cols, &
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                                              mpi_comm_all, THIS_COMPLEX_ELPA_KERNEL_API)
#endif
    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

#ifdef WANT_SINGLE_PRECISION_COMPLEX

  !c> /*! \brief C interface to solve the single-precision complex eigenvalue problem with 2-stage solver
  !c> *
  !c> *  \param  na                        Order of matrix a
  !c> *  \param  nev                       Number of eigenvalues needed.
  !c> *                                    The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                         Distributed matrix for which eigenvalues are to be computed.
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                        Leading dimension of a
  !c> *  \param ev(na)                     On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                          On output: Eigenvectors of a
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                                    even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                        Leading dimension of q
  !c> *  \param nblk                       blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols                 distributed number of matrix columns
  !c> *  \param mpi_comm_rows              MPI-Communicator for rows
  !c> *  \param mpi_comm_cols              MPI-Communicator for columns
  !c> *  \param mpi_coll_all               MPI communicator for the total processor set
  !c> *  \param THIS_REAL_ELPA_KERNEL_API  specify used ELPA2 kernel via API
  !c> *  \param use_qr                     use QR decomposition 1 = yes, 0 = no
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
#undef DOUBLE_PRECISION_COMPLEX
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#ifdef DOUBLE_PRECISION_COMPLEX
  !c> int elpa_solve_evp_complex_2stage_double_precision(int na, int nev, double complex *a, int lda, double *ev, double complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_COMPLEX_ELPA_KERNEL_API);
#else
  !c> int elpa_solve_evp_complex_2stage_single_precision(int na, int nev, complex *a, int lda, float *ev, complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_COMPLEX_ELPA_KERNEL_API);
#endif

#ifdef DOUBLE_PRECISION_COMPLEX
  function solve_elpa2_evp_complex_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all,    &
                                  THIS_COMPLEX_ELPA_KERNEL_API)                  &
                                  result(success) bind(C,name="elpa_solve_evp_complex_2stage_double_precision")
#else
  function solve_elpa2_evp_complex_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all,    &
                                  THIS_COMPLEX_ELPA_KERNEL_API)                  &
                                  result(success) bind(C,name="elpa_solve_evp_complex_2stage_single_precision")
#endif

    use, intrinsic :: iso_c_binding
    use elpa2

    implicit none
    integer(kind=c_int)                    :: success
    integer(kind=c_int), value, intent(in) :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows, &
                                              mpi_comm_all
    integer(kind=c_int), value, intent(in) :: THIS_COMPLEX_ELPA_KERNEL_API
#ifdef DOUBLE_PRECISION_COMPLEX
    complex(kind=c_double_complex)         :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
    real(kind=c_double)                    :: ev(1:na)
#else
    complex(kind=c_float_complex)          :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
    real(kind=c_float)                     :: ev(1:na)
#endif
    logical                                :: successFortran

#ifdef DOUBLE_PRECISION_COMPLEX
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    successFortran = elpa_solve_evp_complex_2stage_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, &
                                                          mpi_comm_rows, mpi_comm_cols, &
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                                              mpi_comm_all, THIS_COMPLEX_ELPA_KERNEL_API)
#else
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    successFortran = elpa_solve_evp_complex_2stage_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, &
                                                          mpi_comm_rows, mpi_comm_cols, &
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                                              mpi_comm_all, THIS_COMPLEX_ELPA_KERNEL_API)
#endif
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    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function
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#endif /* WANT_SINGLE_PRECISION_COMPLEX */

  !c> /*! \brief C interface to driver function "elpa_solve_evp_real_double"
  !c> *
  !c> *  \param  na                        Order of matrix a
  !c> *  \param  nev                       Number of eigenvalues needed.
  !c> *                                    The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                         Distributed matrix for which eigenvalues are to be computed.
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                        Leading dimension of a
  !c> *  \param ev(na)                     On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                          On output: Eigenvectors of a
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                                    even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                        Leading dimension of q
  !c> *  \param nblk                       blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols                 distributed number of matrix columns
  !c> *  \param mpi_comm_rows              MPI-Communicator for rows
  !c> *  \param mpi_comm_cols              MPI-Communicator for columns
  !c> *  \param mpi_coll_all               MPI communicator for the total processor set
  !c> *  \param THIS_REAL_ELPA_KERNEL_API  specify used ELPA2 kernel via API
  !c> *  \param use_qr                     use QR decomposition 1 = yes, 0 = no
  !c> *  \param method                      choose whether to use ELPA 1stage or 2stage solver
  !c> *                                     possible values: "1stage" => use ELPA 1stage solver
  !c> *                                                      "2stage" => use ELPA 2stage solver
  !c> *                                                       "auto"   => (at the moment) use ELPA 2stage solver
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
  !c> int elpa_solve_evp_real_double(int na, int nev, double *a, int lda, double *ev, double *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_REAL_ELPA_KERNEL_API, int useQR, char *method);
  function elpa_solve_evp_real_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all, &
                                  THIS_REAL_ELPA_KERNEL_API, useQR, method)           &
                                  result(success) bind(C,name="elpa_solve_evp_real_double")

    use, intrinsic :: iso_c_binding
    use elpa, only : elpa_solve_evp_real_double

    implicit none
    integer(kind=c_int)                      :: success
    integer(kind=c_int), value, intent(in)   :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows, &
                                                mpi_comm_all
    integer(kind=c_int), value, intent(in)   :: THIS_REAL_ELPA_KERNEL_API, useQR
    real(kind=c_double)                      :: ev(1:na)
#ifdef USE_ASSUMED_SIZE
    real(kind=c_double)                      :: a(lda,*), q(ldq,*)
#else
    real(kind=c_double)                      :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif
    logical                                  :: successFortran, useQRFortran
    character(kind=c_char,len=1), intent(in) :: method(*)
    character(len=6)                         :: methodFortran
    integer(kind=c_int)                      :: charCount

    if (useQR .eq. 0) then
      useQRFortran =.false.
    else
      useQRFortran = .true.
    endif

    charCount = 1
    do
      if (method(charCount) == c_null_char) exit
      charCount = charCount + 1
    enddo
    charCount = charCount - 1

    if (charCount .ge. 1)  then
      methodFortran(1:charCount) = transfer(method(1:charCount), methodFortran)

      successFortran = elpa_solve_evp_real_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, &
                                           mpi_comm_cols, mpi_comm_all,                                  &
                                           THIS_REAL_ELPA_KERNEL_API, useQRFortran, methodFortran)
    else
      successFortran = elpa_solve_evp_real_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, &
                                           mpi_comm_cols, mpi_comm_all,                                  &
                                           THIS_REAL_ELPA_KERNEL_API, useQRFortran)
    endif

    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function
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#ifdef WANT_SINGLE_PRECISION_REAL
  !c> /*! \brief C interface to driver function "elpa_solve_evp_real_single"
  !c> *
  !c> *  \param  na                        Order of matrix a
  !c> *  \param  nev                       Number of eigenvalues needed.
  !c> *                                    The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                         Distributed matrix for which eigenvalues are to be computed.
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                        Leading dimension of a
  !c> *  \param ev(na)                     On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                          On output: Eigenvectors of a
  !c> *                                    Distribution is like in Scalapack.
  !c> *                                    Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                                    even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                        Leading dimension of q
  !c> *  \param nblk                       blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols                 distributed number of matrix columns
  !c> *  \param mpi_comm_rows              MPI-Communicator for rows
  !c> *  \param mpi_comm_cols              MPI-Communicator for columns
  !c> *  \param mpi_coll_all               MPI communicator for the total processor set
  !c> *  \param THIS_REAL_ELPA_KERNEL_API  specify used ELPA2 kernel via API
  !c> *  \param use_qr                     use QR decomposition 1 = yes, 0 = no
  !c> *  \param method                      choose whether to use ELPA 1stage or 2stage solver
  !c> *                                     possible values: "1stage" => use ELPA 1stage solver
  !c> *                                                      "2stage" => use ELPA 2stage solver
  !c> *                                                       "auto"   => (at the moment) use ELPA 2stage solver
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
  !c> int elpa_solve_evp_real_single(int na, int nev, float *a, int lda, float *ev, float *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_REAL_ELPA_KERNEL_API, int useQR, char *method);
  function elpa_solve_evp_real_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all, &
                                  THIS_REAL_ELPA_KERNEL_API, useQR, method)           &
                                  result(success) bind(C,name="elpa_solve_evp_real_single")

    use, intrinsic :: iso_c_binding
    use elpa, only : elpa_solve_evp_real_single

    implicit none
    integer(kind=c_int)                      :: success
    integer(kind=c_int), value, intent(in)   :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows, &
                                                mpi_comm_all
    integer(kind=c_int), value, intent(in)   :: THIS_REAL_ELPA_KERNEL_API, useQR
    real(kind=c_float)                       :: ev(1:na)
#ifdef USE_ASSUMED_SIZE
    real(kind=c_float)                       :: a(lda,*), q(ldq,*)
#else
    real(kind=c_float)                       :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif
    logical                                  :: successFortran, useQRFortran
    character(kind=c_char,len=1), intent(in) :: method(*)
    character(len=6)                         :: methodFortran
    integer(kind=c_int)                      :: charCount

    if (useQR .eq. 0) then
      useQRFortran =.false.
    else
      useQRFortran = .true.
    endif

    charCount = 1
    do
      if (method(charCount) == c_null_char) exit
      charCount = charCount + 1
    enddo
    charCount = charCount - 1

    if (charCount .ge. 1)  then
      methodFortran(1:charCount) = transfer(method(1:charCount), methodFortran)

      successFortran = elpa_solve_evp_real_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, &
                                           mpi_comm_cols, mpi_comm_all,                                  &
                                           THIS_REAL_ELPA_KERNEL_API, useQRFortran, methodFortran)
    else
      successFortran = elpa_solve_evp_real_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, &
                                           mpi_comm_cols, mpi_comm_all,                                  &
                                           THIS_REAL_ELPA_KERNEL_API, useQRFortran)
    endif

    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function
#endif /* WANT_SINGLE_PRECISION_REAL */

  !c> /*! \brief C interface to driver function "elpa_solve_evp_complex_double"
  !c> *
  !c> *  \param  na                           Order of matrix a
  !c> *  \param  nev                          Number of eigenvalues needed.
  !c> *                                       The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                            Distributed matrix for which eigenvalues are to be computed.
  !c> *                                       Distribution is like in Scalapack.
  !c> *                                       The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                           Leading dimension of a
  !c> *  \param ev(na)                        On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                             On output: Eigenvectors of a
  !c> *                                       Distribution is like in Scalapack.
  !c> *                                       Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                                       even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                           Leading dimension of q
  !c> *  \param nblk                          blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols                    distributed number of matrix columns
  !c> *  \param mpi_comm_rows                 MPI-Communicator for rows
  !c> *  \param mpi_comm_cols                 MPI-Communicator for columns
  !c> *  \param mpi_coll_all                  MPI communicator for the total processor set
  !c> *  \param THIS_COMPLEX_ELPA_KERNEL_API  specify used ELPA2 kernel via API
  !c> *  \param method                        choose whether to use ELPA 1stage or 2stage solver
  !c> *                                       possible values: "1stage" => use ELPA 1stage solver
  !c> *                                                        "2stage" => use ELPA 2stage solver
  !c> *                                                         "auto"   => (at the moment) use ELPA 2stage solver
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
  !c> int elpa_solve_evp_complex_double(int na, int nev, double complex *a, int lda, double *ev, double complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_COMPLEX_ELPA_KERNEL_API, char *method);
  function elpa_solve_evp_complex_wrapper_double(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all,    &
                                  THIS_COMPLEX_ELPA_KERNEL_API, method)                  &
                                  result(success) bind(C,name="elpa_solve_evp_complex_double")

    use, intrinsic :: iso_c_binding
    use elpa, only : elpa_solve_evp_complex_double

    implicit none
    integer(kind=c_int)                      :: success
    integer(kind=c_int), value, intent(in)   :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows, &
                                                mpi_comm_all
    integer(kind=c_int), value, intent(in)   :: THIS_COMPLEX_ELPA_KERNEL_API
#ifdef USE_ASSUMED_SIZE
    complex(kind=c_double_complex)           :: a(lda,*), q(ldq,*)
#else
    complex(kind=c_double_complex)           :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif
    real(kind=c_double)                      :: ev(1:na)
    character(kind=c_char,len=1), intent(in) :: method(*)
    character(len=6)                         :: methodFortran
    integer(kind=c_int)                      :: charCount

    logical                                  :: successFortran


    charCount = 1
    do
      if (method(charCount) == c_null_char) exit
      charCount = charCount + 1
    enddo
    charCount = charCount - 1

    if (charCount .ge. 1)  then
      methodFortran(1:charCount) = transfer(method(1:charCount), methodFortran)
      successFortran = elpa_solve_evp_complex_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols, &
                                              mpi_comm_all, THIS_COMPLEX_ELPA_KERNEL_API, methodFortran)
    else
      successFortran = elpa_solve_evp_complex_double(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols, &
                                              mpi_comm_all, THIS_COMPLEX_ELPA_KERNEL_API)
    endif

    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

#ifdef WANT_SINGLE_PRECISION_COMPLEX
  !c> /*! \brief C interface to driver function "elpa_solve_evp_complex_single"
  !c> *
  !c> *  \param  na                           Order of matrix a
  !c> *  \param  nev                          Number of eigenvalues needed.
  !c> *                                       The smallest nev eigenvalues/eigenvectors are calculated.
  !c> *  \param  a                            Distributed matrix for which eigenvalues are to be computed.
  !c> *                                       Distribution is like in Scalapack.
  !c> *                                       The full matrix must be set (not only one half like in scalapack).
  !c> *  \param lda                           Leading dimension of a
  !c> *  \param ev(na)                        On output: eigenvalues of a, every processor gets the complete set
  !c> *  \param q                             On output: Eigenvectors of a
  !c> *                                       Distribution is like in Scalapack.
  !c> *                                       Must be always dimensioned to the full size (corresponding to (na,na))
  !c> *                                       even if only a part of the eigenvalues is needed.
  !c> *  \param ldq                           Leading dimension of q
  !c> *  \param nblk                          blocksize of cyclic distribution, must be the same in both directions!
  !c> *  \param matrixCols                    distributed number of matrix columns
  !c> *  \param mpi_comm_rows                 MPI-Communicator for rows
  !c> *  \param mpi_comm_cols                 MPI-Communicator for columns
  !c> *  \param mpi_coll_all                  MPI communicator for the total processor set
  !c> *  \param THIS_COMPLEX_ELPA_KERNEL_API  specify used ELPA2 kernel via API
  !c> *  \param method                        choose whether to use ELPA 1stage or 2stage solver
  !c> *                                       possible values: "1stage" => use ELPA 1stage solver
  !c> *                                                        "2stage" => use ELPA 2stage solver
  !c> *                                                         "auto"   => (at the moment) use ELPA 2stage solver
  !c> *
  !c> *  \result                     int: 1 if error occured, otherwise 0
  !c> */
  !c> int elpa_solve_evp_complex_single(int na, int nev, complex *a, int lda, float *ev, complex *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int mpi_comm_all, int THIS_COMPLEX_ELPA_KERNEL_API, char *method);
  function elpa_solve_evp_complex_wrapper_single(na, nev, a, lda, ev, q, ldq, nblk,    &
                                  matrixCols, mpi_comm_rows, mpi_comm_cols, mpi_comm_all,    &
                                  THIS_COMPLEX_ELPA_KERNEL_API, method)                  &
                                  result(success) bind(C,name="elpa_solve_evp_complex_single")

    use, intrinsic :: iso_c_binding
    use elpa, only : elpa_solve_evp_complex_single

    implicit none
    integer(kind=c_int)                      :: success
    integer(kind=c_int), value, intent(in)   :: na, nev, lda, ldq, nblk, matrixCols, mpi_comm_cols, mpi_comm_rows, &
                                                mpi_comm_all
    integer(kind=c_int), value, intent(in)   :: THIS_COMPLEX_ELPA_KERNEL_API
#ifdef USE_ASSUMED_SIZE
    complex(kind=c_float_complex)            :: a(lda,*), q(ldq,*)
#else
    complex(kind=c_float_complex)            :: a(1:lda,1:matrixCols), q(1:ldq,1:matrixCols)
#endif
    real(kind=c_float)                       :: ev(1:na)
    character(kind=c_char,len=1), intent(in) :: method(*)
    character(len=6)                         :: methodFortran
    integer(kind=c_int)                      :: charCount

    logical                                  :: successFortran


    charCount = 1
    do
      if (method(charCount) == c_null_char) exit
      charCount = charCount + 1
    enddo
    charCount = charCount - 1

    if (charCount .ge. 1)  then
      methodFortran(1:charCount) = transfer(method(1:charCount), methodFortran)
      successFortran = elpa_solve_evp_complex_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols, &
                                              mpi_comm_all, THIS_COMPLEX_ELPA_KERNEL_API, methodFortran)
    else
      successFortran = elpa_solve_evp_complex_single(na, nev, a, lda, ev, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols, &
                                              mpi_comm_all, THIS_COMPLEX_ELPA_KERNEL_API)
    endif

    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function
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#endif /* WANT_SINGLE_PRECISION_COMPLEX */

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  !c> /*
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  !c> \brief  C interface to solve double-precision tridiagonal eigensystem with divide and conquer method
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  !c> \details
  !c>
Andreas Marek's avatar
Andreas Marek committed
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  !c> *\param na                    Matrix dimension
  !c> *\param nev                   number of eigenvalues/vectors to be computed
  !c> *\param d                     array d(na) on input diagonal elements of tridiagonal matrix, on
  !c> *                             output the eigenvalues in ascending order
  !c> *\param e                     array e(na) on input subdiagonal elements of matrix, on exit destroyed
  !c> *\param q                     on exit : matrix q(ldq,matrixCols) contains the eigenvectors
  !c> *\param ldq                   leading dimension of matrix q
  !c> *\param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> *\param matrixCols            columns of matrix q
  !c> *\param mpi_comm_rows         MPI communicator for rows
  !c> *\param mpi_comm_cols         MPI communicator for columns
  !c> *\param wantDebug             give more debug information if 1, else 0
  !c> *\result success              int 1 on success, else 0
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  !c> */
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  !c> int elpa_solve_tridi_double(int na, int nev, double *d, double *e, double *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int wantDebug);
  function elpa_solve_tridi_wrapper_double(na, nev, d, e, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols, wantDebug) &
           result(success) bind(C,name="elpa_solve_tridi_double")
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    use, intrinsic :: iso_c_binding
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    use elpa1_auxiliary, only : elpa_solve_tridi_double
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    implicit none
    integer(kind=c_int)                    :: success
    integer(kind=c_int), value, intent(in) :: na, nev, ldq, nblk, matrixCols,  mpi_comm_cols, mpi_comm_rows
    integer(kind=c_int), value             :: wantDebug
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    real(kind=c_double)                    :: d(1:na), e(1:na)
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#ifdef USE_ASSUMED_SIZE
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    real(kind=c_double)                    :: q(ldq,*)
#else
    real(kind=c_double)                    :: q(1:ldq, 1:matrixCols)
#endif
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    logical                                :: successFortran, wantDebugFortran

    if (wantDebug .ne. 0) then
      wantDebugFortran = .true.
    else
      wantDebugFortran = .false.
    endif

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    successFortran = elpa_solve_tridi_double(na, nev, d, e, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols, &
                      wantDebugFortran)

    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

#ifdef WANT_SINGLE_PRECISION_REAL

  !c> /*
  !c> \brief  C interface to solve single-precision tridiagonal eigensystem with divide and conquer method
  !c> \details
  !c>
  !c> \param na                    Matrix dimension
  !c> \param nev                   number of eigenvalues/vectors to be computed
  !c> \param d                     array d(na) on input diagonal elements of tridiagonal matrix, on
  !c>                              output the eigenvalues in ascending order
  !c> \param e                     array e(na) on input subdiagonal elements of matrix, on exit destroyed
  !c> \param q                     on exit : matrix q(ldq,matrixCols) contains the eigenvectors
  !c> \param ldq                   leading dimension of matrix q
  !c> \param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> \param matrixCols            columns of matrix q
  !c> \param mpi_comm_rows         MPI communicator for rows
  !c> \param mpi_comm_cols         MPI communicator for columns
  !c> \param wantDebug             give more debug information if 1, else 0
  !c> \result success              int 1 on success, else 0
  !c> */
  !c> int elpa_solve_tridi_single(int na, int nev, float *d, float *e, float *q, int ldq, int nblk, int matrixCols, int mpi_comm_rows, int mpi_comm_cols, int wantDebug);
  function elpa_solve_tridi_wrapper_single(na, nev, d, e, q, ldq, nblk, matrixCols, mpi_comm_rows, mpi_comm_cols, wantDebug) &
           result(success) bind(C,name="elpa_solve_tridi_single")

    use, intrinsic :: iso_c_binding
    use elpa1_auxiliary, only : elpa_solve_tridi_single

    implicit none
    integer(kind=c_int)                    :: success
    integer(kind=c_int), value, intent(in) :: na, nev, ldq, nblk, matrixCols,  mpi_comm_cols, mpi_comm_rows
    integer(kind=c_int), value             :: wantDebug
    real(kind=c_float)                     :: d(1:na), e(1:na), q(1:ldq, 1:matrixCols)
    logical                                :: successFortran, wantDebugFortran

    if (wantDebug .ne. 0) then
      wantDebugFortran = .true.
    else
      wantDebugFortran = .false.
    endif

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    successFortran = elpa_solve_tridi_single(na, nev, d, e, q, ldq, nblk, matrixCols, mpi_comm_rows, &
                                             mpi_comm_cols, wantDebugFortran)
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    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

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#endif /* WANT_SINGLE_PRECISION_REAL */

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  !c> /*
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  !c> \brief  C interface for elpa_mult_at_b_real_double: Performs C : = A**T * B for double-precision matrices
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  !c>         where   A is a square matrix (na,na) which is optionally upper or lower triangular
  !c>                 B is a (na,ncb) matrix
  !c>                 C is a (na,ncb) matrix where optionally only the upper or lower
  !c>                   triangle may be computed
  !c> \details
  !c> \param  uplo_a               'U' if A is upper triangular
  !c>                              'L' if A is lower triangular
  !c>                              anything else if A is a full matrix
  !c>                              Please note: This pertains to the original A (as set in the calling program)
  !c>                                           whereas the transpose of A is used for calculations
  !c>                              If uplo_a is 'U' or 'L', the other triangle is not used at all,
  !c>                              i.e. it may contain arbitrary numbers
  !c> \param uplo_c                'U' if only the upper diagonal part of C is needed
  !c>                              'L' if only the upper diagonal part of C is needed
  !c>                              anything else if the full matrix C is needed
  !c>                              Please note: Even when uplo_c is 'U' or 'L', the other triangle may be
  !c>                                            written to a certain extent, i.e. one shouldn't rely on the content there!
  !c> \param na                    Number of rows/columns of A, number of rows of B and C
  !c> \param ncb                   Number of columns  of B and C
  !c> \param a                     matrix a
  !c> \param lda                   leading dimension of matrix a
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  !c> \param ldaCols               columns of matrix a
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  !c> \param b                     matrix b
  !c> \param ldb                   leading dimension of matrix b
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  !c> \param ldbCols               columns of matrix b
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  !c> \param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> \param  mpi_comm_rows        MPI communicator for rows
  !c> \param  mpi_comm_cols        MPI communicator for columns
  !c> \param c                     matrix c
  !c> \param ldc                   leading dimension of matrix c
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  !c> \param ldcCols               columns of matrix c
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  !c> \result success              int report success (1) or failure (0)
  !c> */

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  !c> int elpa_mult_at_b_real_double(char uplo_a, char uplo_c, int na, int ncb, double *a, int lda, int ldaCols, double *b, int ldb, int ldbCols, int nlbk, int mpi_comm_rows, int mpi_comm_cols, double *c, int ldc, int ldcCols);
  function elpa_mult_at_b_real_wrapper_double(uplo_a, uplo_c, na, ncb, a, lda, ldaCols, b, ldb, ldbCols, &
                                              nblk, mpi_comm_rows, mpi_comm_cols, c, ldc, ldcCols) &
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                                              bind(C,name="elpa_mult_at_b_real_double") result(success)
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    use, intrinsic :: iso_c_binding
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    use elpa1_auxiliary, only : elpa_mult_at_b_real_double
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    implicit none

    character(1,C_CHAR), value  :: uplo_a, uplo_c
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    integer(kind=c_int), value  :: na, ncb, lda, ldb, nblk, mpi_comm_rows, mpi_comm_cols, ldc, &
                                   ldaCols, ldbCols, ldcCols
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    integer(kind=c_int)         :: success
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#ifdef USE_ASSUMED_SIZE
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    real(kind=c_double)         :: a(lda,*), b(ldb,*), c(ldc,*)
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#else
    real(kind=c_double)         :: a(lda,ldaCols), b(ldb,ldbCols), c(ldc,ldcCols)
#endif
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    logical                     :: successFortran

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    successFortran = elpa_mult_at_b_real_double(uplo_a, uplo_c, na, ncb, a, lda, ldaCols, b, ldb, ldbCols, &
                                                nblk, mpi_comm_rows, mpi_comm_cols, c, ldc, ldcCols)
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    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

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#ifdef WANT_SINGLE_PRECISION_REAL
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  !c> /*
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  !c> \brief  C interface for elpa_mult_at_b_real_single: Performs C : = A**T * B for single-precision matrices
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  !c>         where   A is a square matrix (na,na) which is optionally upper or lower triangular
  !c>                 B is a (na,ncb) matrix
  !c>                 C is a (na,ncb) matrix where optionally only the upper or lower
  !c>                   triangle may be computed
  !c> \details
  !c> \param  uplo_a               'U' if A is upper triangular
  !c>                              'L' if A is lower triangular
  !c>                              anything else if A is a full matrix
  !c>                              Please note: This pertains to the original A (as set in the calling program)
  !c>                                           whereas the transpose of A is used for calculations
  !c>                              If uplo_a is 'U' or 'L', the other triangle is not used at all,
  !c>                              i.e. it may contain arbitrary numbers
  !c> \param uplo_c                'U' if only the upper diagonal part of C is needed
  !c>                              'L' if only the upper diagonal part of C is needed
  !c>                              anything else if the full matrix C is needed
  !c>                              Please note: Even when uplo_c is 'U' or 'L', the other triangle may be
  !c>                                            written to a certain extent, i.e. one shouldn't rely on the content there!
  !c> \param na                    Number of rows/columns of A, number of rows of B and C
  !c> \param ncb                   Number of columns  of B and C
  !c> \param a                     matrix a
  !c> \param lda                   leading dimension of matrix a
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  !c> \param ldaCols               columns of matrix a
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  !c> \param b                     matrix b
  !c> \param ldb                   leading dimension of matrix b
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  !c> \param ldbCols               columns of matrix b
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  !c> \param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> \param  mpi_comm_rows        MPI communicator for rows
  !c> \param  mpi_comm_cols        MPI communicator for columns
  !c> \param c                     matrix c
  !c> \param ldc                   leading dimension of matrix c
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  !c> \result success              int report success (1) or failure (0)
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  !c> */

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  !c> int elpa_mult_at_b_real_single(char uplo_a, char uplo_c, int na, int ncb, float *a, int lda, int ldaCols, float *b, int ldb, int ldbCols, int nlbk, int mpi_comm_rows, int mpi_comm_cols, float *c, int ldc, int ldcCols);
  function elpa_mult_at_b_real_wrapper_float(uplo_a, uplo_c, na, ncb, a, lda, ldaCols, b, ldb, ldbCols, &
                                             nblk, mpi_comm_rows, mpi_comm_cols, c, ldc, ldcCols) &
    bind(C,name="elpa_mult_at_b_real_float") result(success)
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    use, intrinsic :: iso_c_binding
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    use elpa1_auxiliary, only : elpa_mult_at_b_real_single
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    implicit none

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    character(1,C_CHAR), value  :: uplo_a, uplo_c
    integer(kind=c_int), value  :: na, ncb, lda, ldb, nblk, mpi_comm_rows, mpi_comm_cols, ldc
    integer(kind=c_int)         :: success
    integer(kind=c_int), value  :: ldaCols, ldbCols, ldCcols
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#ifdef USE_ASSUMED_SIZE
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    real(kind=c_float)          :: a(lda,*), b(ldb,*), c(ldc,*)
#else
    real(kind=c_float)          :: a(lda,ldaCols), b(ldb,ldbCols), c(ldc,ldcCols)
#endif
    logical                     :: successFortran

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    successFortran = elpa_mult_at_b_real_single(uplo_a, uplo_c, na, ncb, a, lda, ldaCols, b, ldb, ldbCols, &
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                                               nblk, mpi_comm_rows, mpi_comm_cols, c, ldc, ldcCols)

    if (successFortran) then
      success = 1
    else
      success = 0
    endif

  end function

#endif /* WANT_SINGLE_PRECISION_REAL */

  !c> /*
  !c> \brief C interface for elpa_mult_ah_b_complex_double: Performs C : = A**H * B for double-precision matrices
  !c>         where   A is a square matrix (na,na) which is optionally upper or lower triangular
  !c>                 B is a (na,ncb) matrix
  !c>                 C is a (na,ncb) matrix where optionally only the upper or lower
  !c>                   triangle may be computed
  !c> \details
  !c>
  !c> \param  uplo_a               'U' if A is upper triangular
  !c>                              'L' if A is lower triangular
  !c>                              anything else if A is a full matrix
  !c>                              Please note: This pertains to the original A (as set in the calling program)
  !c>                                           whereas the transpose of A is used for calculations
  !c>                              If uplo_a is 'U' or 'L', the other triangle is not used at all,
  !c>                              i.e. it may contain arbitrary numbers
  !c> \param uplo_c                'U' if only the upper diagonal part of C is needed
  !c>                              'L' if only the upper diagonal part of C is needed
  !c>                              anything else if the full matrix C is needed
  !c>                              Please note: Even when uplo_c is 'U' or 'L', the other triangle may be
  !c>                                            written to a certain extent, i.e. one shouldn't rely on the content there!
  !c> \param na                    Number of rows/columns of A, number of rows of B and C
  !c> \param ncb                   Number of columns  of B and C
  !c> \param a                     matrix a
  !c> \param lda                   leading dimension of matrix a
  !c> \param b                     matrix b
  !c> \param ldb                   leading dimension of matrix b
  !c> \param nblk                  blocksize of cyclic distribution, must be the same in both directions!
  !c> \param  mpi_comm_rows        MPI communicator for rows
  !c> \param  mpi_comm_cols        MPI communicator for columns
  !c> \param c                     matrix c
  !c> \param ldc                   leading dimension of matrix c
  !c> \result success              int reports success (1) or failure (0)