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fvn_sparse/UMFPACK/Source/umf_transpose.c 8.77 KB
  /* ========================================================================== */
  /* === UMF_transpose ======================================================== */
  /* ========================================================================== */
  
  /* -------------------------------------------------------------------------- */
  /* UMFPACK Copyright (c) Timothy A. Davis, CISE,                              */
  /* Univ. of Florida.  All Rights Reserved.  See ../Doc/License for License.   */
  /* web: http://www.cise.ufl.edu/research/sparse/umfpack                       */
  /* -------------------------------------------------------------------------- */
  
  /*  Not user-callable.  Computes a permuted transpose, R = (A (P,Q(1:nq)))' in
  	MATLAB notation, where R is in column-form.  A is n_row-by-n_col, the
  	row-form matrix R is n_row-by-nq, where nq <= n_col.  A may be singular.
  	The complex version can do transpose (') or array transpose (.').
  
  	Uses Gustavson's method (Two Fast Algorithms for Sparse Matrices:
  	Multiplication and Permuted Transposition, ACM Trans. on Math. Softw.,
  	vol 4, no 3, pp. 250-269).
  */
  
  #include "umf_internal.h"
  #include "umf_is_permutation.h"
  
  GLOBAL Int UMF_transpose
  (
      Int n_row,			/* A is n_row-by-n_col */
      Int n_col,
      const Int Ap [ ],		/* size n_col+1 */
      const Int Ai [ ],		/* size nz = Ap [n_col] */
      const double Ax [ ],	/* size nz if present */
  
      const Int P [ ],	/* P [k] = i means original row i is kth row in A(P,Q)*/
  			/* P is identity if not present */
  			/* size n_row, if present */
  
      const Int Q [ ],	/* Q [k] = j means original col j is kth col in A(P,Q)*/
  			/* Q is identity if not present */
  			/* size nq, if present */
      Int nq,		/* size of Q, ignored if Q is (Int *) NULL */
  
  			/* output matrix: Rp, Ri, Rx, and Rz: */
      Int Rp [ ],		/* size n_row+1 */
      Int Ri [ ],		/* size nz */
      double Rx [ ],	/* size nz, if present */
  
      Int W [ ],		/* size max (n_row,n_col) workspace */
  
      Int check		/* if true, then check inputs */
  #ifdef COMPLEX
      , const double Az [ ]	/* size nz */
      , double Rz [ ]		/* size nz */
      , Int do_conjugate		/* if true, then do conjugate transpose */
  				/* otherwise, do array transpose */
  #endif
  )
  {
  
      /* ---------------------------------------------------------------------- */
      /* local variables */
      /* ---------------------------------------------------------------------- */
  
      Int i, j, k, p, bp, newj, do_values ;
  #ifdef COMPLEX
      Int split ;
  #endif
  
      /* ---------------------------------------------------------------------- */
      /* check inputs */
      /* ---------------------------------------------------------------------- */
  
  #ifndef NDEBUG
      Int nz ;
      ASSERT (n_col >= 0) ;
      nz = (Ap != (Int *) NULL) ? Ap [n_col] : 0 ;
      DEBUG2 (("UMF_transpose: "ID"-by-"ID" nz "ID"
  ", n_row, n_col, nz)) ;
  #endif
  
      if (check)
      {
  	/* UMFPACK_symbolic skips this check */
  	/* UMFPACK_transpose always does this check */
  	if (!Ai || !Ap || !Ri || !Rp || !W)
  	{
  	    return (UMFPACK_ERROR_argument_missing) ;
  	}
  	if (n_row <= 0 || n_col <= 0)		/* n_row,n_col must be > 0 */
  	{
  	    return (UMFPACK_ERROR_n_nonpositive) ;
  	}
  	if (!UMF_is_permutation (P, W, n_row, n_row) ||
  	    !UMF_is_permutation (Q, W, nq, nq))
  	{
  	    return (UMFPACK_ERROR_invalid_permutation) ;
  	}
  	if (AMD_valid (n_row, n_col, Ap, Ai) != AMD_OK)
  	{
  	    return (UMFPACK_ERROR_invalid_matrix) ;
  	}
      }
  
  #ifndef NDEBUG
      DEBUG2 (("UMF_transpose, input matrix:
  ")) ;
      UMF_dump_col_matrix (Ax,
  #ifdef COMPLEX
  	Az,
  #endif
  	Ai, Ap, n_row, n_col, nz) ;
  #endif
  
      /* ---------------------------------------------------------------------- */
      /* count the entries in each row of A */
      /* ---------------------------------------------------------------------- */
  
      /* use W as workspace for RowCount */
  
      for (i = 0 ; i < n_row ; i++)
      {
  	W [i] = 0 ;
  	Rp [i] = 0 ;
      }
  
      if (Q != (Int *) NULL)
      {
  	for (newj = 0 ; newj < nq ; newj++)
  	{
  	    j = Q [newj] ;
  	    ASSERT (j >= 0 && j < n_col) ;
  	    for (p = Ap [j] ; p < Ap [j+1] ; p++)
  	    {
  		i = Ai [p] ;
  		ASSERT (i >= 0 && i < n_row) ;
  		W [i]++ ;
  	    }
  	}
      }
      else
      {
  	for (j = 0 ; j < n_col ; j++)
  	{
  	    for (p = Ap [j] ; p < Ap [j+1] ; p++)
  	    {
  		i = Ai [p] ;
  		ASSERT (i >= 0 && i < n_row) ;
  		W [i]++ ;
  	    }
  	}
      }
  
      /* ---------------------------------------------------------------------- */
      /* compute the row pointers for R = A (P,Q) */
      /* ---------------------------------------------------------------------- */
  
      if (P != (Int *) NULL)
      {
  	Rp [0] = 0 ;
  	for (k = 0 ; k < n_row ; k++)
  	{
  	    i = P [k] ;
  	    ASSERT (i >= 0 && i < n_row) ;
  	    Rp [k+1] = Rp [k] + W [i] ;
  	}
  	for (k = 0 ; k < n_row ; k++)
  	{
  	    i = P [k] ;
  	    ASSERT (i >= 0 && i < n_row) ;
  	    W [i] = Rp [k] ;
  	}
      }
      else
      {
  	Rp [0] = 0 ;
  	for (i = 0 ; i < n_row ; i++)
  	{
  	    Rp [i+1] = Rp [i] + W [i] ;
  	}
  	for (i = 0 ; i < n_row ; i++)
  	{
  	    W [i] = Rp [i] ;
  	}
      }
      ASSERT (Rp [n_row] <= Ap [n_col]) ;
  
      /* at this point, W holds the permuted row pointers */
  
      /* ---------------------------------------------------------------------- */
      /* construct the row form of B */
      /* ---------------------------------------------------------------------- */
  
      do_values = Ax && Rx ;
  
  #ifdef COMPLEX
      split = SPLIT (Az) && SPLIT (Rz) ;
  
      if (do_conjugate && do_values)
      {
  	if (Q != (Int *) NULL)
  	{
  	    if (split)
  	    {
  		/* R = A (P,Q)' */
  		for (newj = 0 ; newj < nq ; newj++)
  		{
  		    j = Q [newj] ;
  		    ASSERT (j >= 0 && j < n_col) ;
  		    for (p = Ap [j] ; p < Ap [j+1] ; p++)
  		    {
  			bp = W [Ai [p]]++ ;
  			Ri [bp] = newj ;
  			Rx [bp] = Ax [p] ;
  			Rz [bp] = -Az [p] ;
  		    }
  		}
  	    }
  	    else
  	    {
  		/* R = A (P,Q)' (merged complex values) */
  		for (newj = 0 ; newj < nq ; newj++)
  		{
  		    j = Q [newj] ;
  		    ASSERT (j >= 0 && j < n_col) ;
  		    for (p = Ap [j] ; p < Ap [j+1] ; p++)
  		    {
  			bp = W [Ai [p]]++ ;
  			Ri [bp] = newj ;
  			Rx [2*bp] = Ax [2*p] ;
  			Rx [2*bp+1] = -Ax [2*p+1] ;
  		    }
  		}
  	    }
  	}
  	else
  	{
  	    if (split)
  	    {
  		/* R = A (P,:)' */
  		for (j = 0 ; j < n_col ; j++)
  		{
  		    for (p = Ap [j] ; p < Ap [j+1] ; p++)
  		    {
  			bp = W [Ai [p]]++ ;
  			Ri [bp] = j ;
  			Rx [bp] = Ax [p] ;
  			Rz [bp] = -Az [p] ;
  		    }
  		}
  	    }
  	    else
  	    {
  		/* R = A (P,:)' (merged complex values) */
  		for (j = 0 ; j < n_col ; j++)
  		{
  		    for (p = Ap [j] ; p < Ap [j+1] ; p++)
  		    {
  			bp = W [Ai [p]]++ ;
  			Ri [bp] = j ;
  			Rx [2*bp] = Ax [2*p] ;
  			Rx [2*bp+1] = -Ax [2*p+1] ;
  		    }
  		}
  	    }
  	}
      }
      else
  #endif
      {
  	if (Q != (Int *) NULL)
  	{
  	    if (do_values)
  	    {
  #ifdef COMPLEX
  		if (split)
  #endif
  		{
  		    /* R = A (P,Q).' */
  		    for (newj = 0 ; newj < nq ; newj++)
  		    {
  			j = Q [newj] ;
  			ASSERT (j >= 0 && j < n_col) ;
  			for (p = Ap [j] ; p < Ap [j+1] ; p++)
  			{
  			    bp = W [Ai [p]]++ ;
  			    Ri [bp] = newj ;
  			    Rx [bp] = Ax [p] ;
  #ifdef COMPLEX
  			    Rz [bp] = Az [p] ;
  #endif
  			}
  		    }
  		}
  #ifdef COMPLEX
  		else
  		{
  		    /* R = A (P,Q).' (merged complex values) */
  		    for (newj = 0 ; newj < nq ; newj++)
  		    {
  			j = Q [newj] ;
  			ASSERT (j >= 0 && j < n_col) ;
  			for (p = Ap [j] ; p < Ap [j+1] ; p++)
  			{
  			    bp = W [Ai [p]]++ ;
  			    Ri [bp] = newj ;
  			    Rx [2*bp] = Ax [2*p] ;
  			    Rx [2*bp+1] = Ax [2*p+1] ;
  			}
  		    }
  		}
  #endif
  	    }
  	    else
  	    {
  		/* R = pattern of A (P,Q).' */
  		for (newj = 0 ; newj < nq ; newj++)
  		{
  		    j = Q [newj] ;
  		    ASSERT (j >= 0 && j < n_col) ;
  		    for (p = Ap [j] ; p < Ap [j+1] ; p++)
  		    {
  			Ri [W [Ai [p]]++] = newj ;
  		    }
  		}
  	    }
  	}
  	else
  	{
  	    if (do_values)
  	    {
  #ifdef COMPLEX
  		if (split)
  #endif
  		{
  		    /* R = A (P,:).' */
  		    for (j = 0 ; j < n_col ; j++)
  		    {
  			for (p = Ap [j] ; p < Ap [j+1] ; p++)
  			{
  			    bp = W [Ai [p]]++ ;
  			    Ri [bp] = j ;
  			    Rx [bp] = Ax [p] ;
  #ifdef COMPLEX
  			    Rz [bp] = Az [p] ;
  #endif
  			}
  		    }
  		}
  #ifdef COMPLEX
  		else
  		{
  		    /* R = A (P,:).' (merged complex values) */
  		    for (j = 0 ; j < n_col ; j++)
  		    {
  			for (p = Ap [j] ; p < Ap [j+1] ; p++)
  			{
  			    bp = W [Ai [p]]++ ;
  			    Ri [bp] = j ;
  			    Rx [2*bp] = Ax [2*p] ;
  			    Rx [2*bp+1] = Ax [2*p+1] ;
  			}
  		    }
  		}
  #endif
  	    }
  	    else
  	    {
  		/* R = pattern of A (P,:).' */
  		for (j = 0 ; j < n_col ; j++)
  		{
  		    for (p = Ap [j] ; p < Ap [j+1] ; p++)
  		    {
  			Ri [W [Ai [p]]++] = j ;
  		    }
  		}
  	    }
  	}
      }
  
  #ifndef NDEBUG
      for (k = 0 ; k < n_row ; k++)
      {
  	if (P != (Int *) NULL)
  	{
  	    i = P [k] ;
  	}
  	else
  	{
  	    i = k ;
  	}
  	DEBUG3 ((ID":  W[i] "ID" Rp[k+1] "ID"
  ", i, W [i], Rp [k+1])) ;
  	ASSERT (W [i] == Rp [k+1]) ;
      }
      DEBUG2 (("UMF_transpose, output matrix:
  ")) ;
      UMF_dump_col_matrix (Rx,
  #ifdef COMPLEX
  	Rz,
  #endif
  	Ri, Rp, n_col, n_row, Rp [n_row]) ;
      ASSERT (AMD_valid (n_col, n_row, Rp, Ri) == AMD_OK) ;
  #endif
  
      return (UMFPACK_OK) ;
  }