/*
       This routine was converted by f2c from Linpack source
             linpack. this version dated 08/14/78
      cleve moler, university of new mexico, argonne national lab.

        Does an LU factorization with partial pivoting of a dense
     n by n matrix.

       Used by the sparse factorization routines in
     src/mat/impls/baij/seq

*/
#include <petsc/private/kernels/blockinvert.h>

PetscErrorCode PetscLINPACKgefa(MatScalar *a, PetscInt n, PetscInt *ipvt, PetscBool allowzeropivot, PetscBool *zeropivotdetected)
{
  PetscInt  i__2, i__3, kp1, nm1, j, k, l, ll, kn, knp1, jn1;
  MatScalar t, *ax, *ay, *aa;
  MatReal   tmp, max;

  PetscFunctionBegin;
  if (zeropivotdetected) *zeropivotdetected = PETSC_FALSE;

  /* Parameter adjustments */
  --ipvt;
  a -= n + 1;

  /* Function Body */
  nm1 = n - 1;
  for (k = 1; k <= nm1; ++k) {
    kp1  = k + 1;
    kn   = k * n;
    knp1 = k * n + k;

    /* find l = pivot index */

    i__2 = n - k + 1;
    aa   = &a[knp1];
    max  = PetscAbsScalar(aa[0]);
    l    = 1;
    for (ll = 1; ll < i__2; ll++) {
      tmp = PetscAbsScalar(aa[ll]);
      if (tmp > max) {
        max = tmp;
        l   = ll + 1;
      }
    }
    l += k - 1;
    ipvt[k] = l;

    if (a[l + kn] == 0.0) {
      PetscCheck(allowzeropivot, PETSC_COMM_SELF, PETSC_ERR_MAT_LU_ZRPVT, "Zero pivot, row %" PetscInt_FMT, k - 1);
      PetscCall(PetscInfo(NULL, "Zero pivot, row %" PetscInt_FMT "\n", k - 1));
      if (zeropivotdetected) *zeropivotdetected = PETSC_TRUE;
    }

    /* interchange if necessary */
    if (l != k) {
      t         = a[l + kn];
      a[l + kn] = a[knp1];
      a[knp1]   = t;
    }

    /* compute multipliers */
    t    = -1. / a[knp1];
    i__2 = n - k;
    aa   = &a[1 + knp1];
    for (ll = 0; ll < i__2; ll++) aa[ll] *= t;

    /* row elimination with column indexing */
    ax = aa;
    for (j = kp1; j <= n; ++j) {
      jn1 = j * n;
      t   = a[l + jn1];
      if (l != k) {
        a[l + jn1] = a[k + jn1];
        a[k + jn1] = t;
      }

      i__3 = n - k;
      ay   = &a[1 + k + jn1];
      for (ll = 0; ll < i__3; ll++) ay[ll] += t * ax[ll];
    }
  }
  ipvt[n] = n;
  if (a[n + n * n] == 0.0) {
    PetscCheck(allowzeropivot, PETSC_COMM_SELF, PETSC_ERR_MAT_LU_ZRPVT, "Zero pivot, row %" PetscInt_FMT, n - 1);
    PetscCall(PetscInfo(NULL, "Zero pivot, row %" PetscInt_FMT "\n", n - 1));
    if (zeropivotdetected) *zeropivotdetected = PETSC_TRUE;
  }
  PetscFunctionReturn(PETSC_SUCCESS);
}