/* glplux.h (LU-factorization, bignum arithmetic) */

 /***********************************************************************

 *  This code is part of GLPK (GNU Linear Programming Kit).

 *

 *  Copyright (C) 2000, 2001, 2002, 2003, 2004, 2005, 2006, 2007, 2008,

 *  2009, 2010 Andrew Makhorin, Department for Applied Informatics,

 *  Moscow Aviation Institute, Moscow, Russia. All rights reserved.

 *  E-mail: <mao@gnu.org>.

 *

 *  GLPK is free software: you can redistribute it and/or modify it

 *  under the terms of the GNU General Public License as published by

 *  the Free Software Foundation, either version 3 of the License, or

 *  (at your option) any later version.

 *

 *  GLPK 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 General Public

 *  License for more details.

 *

 *  You should have received a copy of the GNU General Public License

 *  along with GLPK. If not, see <http://www.gnu.org/licenses/>.

 ***********************************************************************/

 #ifndef GLPLUX_H

 #define GLPLUX_H

 #include "glpdmp.h"

 #include "glpgmp.h"

 /*----------------------------------------------------------------------

 // The structure LUX defines LU-factorization of a square matrix A,

 // which is the following quartet:

 //

 //    [A] = (F, V, P, Q),                                            (1)

 //

 // where F and V are such matrices that

 //

 //    A = F * V,                                                     (2)

 //

 // and P and Q are such permutation matrices that the matrix

 //

 //    L = P * F * inv(P)                                             (3)

 //

 // is lower triangular with unity diagonal, and the matrix

 //

 //    U = P * V * Q                                                  (4)

 //

 // is upper triangular. All the matrices have the order n.

 //

 // The matrices F and V are stored in row/column-wise sparse format as

 // row and column linked lists of non-zero elements. Unity elements on

 // the main diagonal of the matrix F are not stored. Pivot elements of

 // the matrix V (that correspond to diagonal elements of the matrix U)

 // are also missing from the row and column lists and stored separately

 // in an ordinary array.

 //

 // The permutation matrices P and Q are stored as ordinary arrays using

 // both row- and column-like formats.

 //

 // The matrices L and U being completely defined by the matrices F, V,

 // P, and Q are not stored explicitly.

 //

 // It is easy to show that the factorization (1)-(3) is some version of

 // LU-factorization. Indeed, from (3) and (4) it follows that:

 //

 //    F = inv(P) * L * P,

 //

 //    V = inv(P) * U * inv(Q),

 //

 // and substitution into (2) gives:

 //

 //    A = F * V = inv(P) * L * U * inv(Q).

 //

 // For more details see the program documentation. */

 typedef struct LUX LUX;

 typedef struct LUXELM LUXELM;

 typedef struct LUXWKA LUXWKA;

 struct LUX

 {     /* LU-factorization of a square matrix */

       int n;

       /* the order of matrices A, F, V, P, Q */

       DMP *pool;

       /* memory pool for elements of matrices F and V */

       LUXELM **F_row; /* LUXELM *F_row[1+n]; */

       /* F_row[0] is not used;

          F_row[i], 1 <= i <= n, is a pointer to the list of elements in

          i-th row of matrix F (diagonal elements are not stored) */

       LUXELM **F_col; /* LUXELM *F_col[1+n]; */

       /* F_col[0] is not used;

          F_col[j], 1 <= j <= n, is a pointer to the list of elements in

          j-th column of matrix F (diagonal elements are not stored) */

       mpq_t *V_piv; /* mpq_t V_piv[1+n]; */

       /* V_piv[0] is not used;

          V_piv[p], 1 <= p <= n, is a pivot element v[p,q] corresponding

          to a diagonal element u[k,k] of matrix U = P*V*Q (used on k-th

          elimination step, k = 1, 2, ..., n) */

       LUXELM **V_row; /* LUXELM *V_row[1+n]; */

       /* V_row[0] is not used;

          V_row[i], 1 <= i <= n, is a pointer to the list of elements in

          i-th row of matrix V (except pivot elements) */

       LUXELM **V_col; /* LUXELM *V_col[1+n]; */

       /* V_col[0] is not used;

          V_col[j], 1 <= j <= n, is a pointer to the list of elements in

          j-th column of matrix V (except pivot elements) */

       int *P_row; /* int P_row[1+n]; */

       /* P_row[0] is not used;

          P_row[i] = j means that p[i,j] = 1, where p[i,j] is an element

          of permutation matrix P */

       int *P_col; /* int P_col[1+n]; */

       /* P_col[0] is not used;

          P_col[j] = i means that p[i,j] = 1, where p[i,j] is an element

          of permutation matrix P */

       /* if i-th row or column of matrix F is i'-th row or column of

          matrix L = P*F*inv(P), or if i-th row of matrix V is i'-th row

          of matrix U = P*V*Q, then P_row[i'] = i and P_col[i] = i' */

       int *Q_row; /* int Q_row[1+n]; */

       /* Q_row[0] is not used;

          Q_row[i] = j means that q[i,j] = 1, where q[i,j] is an element

          of permutation matrix Q */

       int *Q_col; /* int Q_col[1+n]; */

       /* Q_col[0] is not used;

          Q_col[j] = i means that q[i,j] = 1, where q[i,j] is an element

          of permutation matrix Q */

       /* if j-th column of matrix V is j'-th column of matrix U = P*V*Q,

          then Q_row[j] = j' and Q_col[j'] = j */

       int rank;

       /* the (exact) rank of matrices A and V */

 };

 struct LUXELM

 {     /* element of matrix F or V */

       int i;

       /* row index, 1 <= i <= m */

       int j;

       /* column index, 1 <= j <= n */

       mpq_t val;

       /* numeric (non-zero) element value */

       LUXELM *r_prev;

       /* pointer to previous element in the same row */

       LUXELM *r_next;

       /* pointer to next element in the same row */

       LUXELM *c_prev;

       /* pointer to previous element in the same column */

       LUXELM *c_next;

       /* pointer to next element in the same column */

 };

 struct LUXWKA

 {     /* working area (used only during factorization) */

       /* in order to efficiently implement Markowitz strategy and Duff

          search technique there are two families {R[0], R[1], ..., R[n]}

          and {C[0], C[1], ..., C[n]}; member R[k] is a set of active

          rows of matrix V having k non-zeros, and member C[k] is a set

          of active columns of matrix V having k non-zeros (in the active

          submatrix); each set R[k] and C[k] is implemented as a separate

          doubly linked list */

       int *R_len; /* int R_len[1+n]; */

       /* R_len[0] is not used;

          R_len[i], 1 <= i <= n, is the number of non-zero elements in

          i-th row of matrix V (that is the length of i-th row) */

       int *R_head; /* int R_head[1+n]; */

       /* R_head[k], 0 <= k <= n, is the number of a first row, which is

          active and whose length is k */

       int *R_prev; /* int R_prev[1+n]; */

       /* R_prev[0] is not used;

          R_prev[i], 1 <= i <= n, is the number of a previous row, which

          is active and has the same length as i-th row */

       int *R_next; /* int R_next[1+n]; */

       /* R_prev[0] is not used;

          R_prev[i], 1 <= i <= n, is the number of a next row, which is

          active and has the same length as i-th row */

       int *C_len; /* int C_len[1+n]; */

       /* C_len[0] is not used;

          C_len[j], 1 <= j <= n, is the number of non-zero elements in

          j-th column of the active submatrix of matrix V (that is the

          length of j-th column in the active submatrix) */

       int *C_head; /* int C_head[1+n]; */

       /* C_head[k], 0 <= k <= n, is the number of a first column, which

          is active and whose length is k */

       int *C_prev; /* int C_prev[1+n]; */

       /* C_prev[0] is not used;

          C_prev[j], 1 <= j <= n, is the number of a previous column,

          which is active and has the same length as j-th column */

       int *C_next; /* int C_next[1+n]; */

       /* C_next[0] is not used;

          C_next[j], 1 <= j <= n, is the number of a next column, which

          is active and has the same length as j-th column */

 };

 #define lux_create            _glp_lux_create

 #define lux_decomp            _glp_lux_decomp

 #define lux_f_solve           _glp_lux_f_solve

 #define lux_v_solve           _glp_lux_v_solve

 #define lux_solve             _glp_lux_solve

 #define lux_delete            _glp_lux_delete

 LUX *lux_create(int n);

 /* create LU-factorization */

 int lux_decomp(LUX *lux, int (*col)(void *info, int j, int ind[],

       mpq_t val[]), void *info);

 /* compute LU-factorization */

 void lux_f_solve(LUX *lux, int tr, mpq_t x[]);

 /* solve system F*x = b or F'*x = b */

 void lux_v_solve(LUX *lux, int tr, mpq_t x[]);

 /* solve system V*x = b or V'*x = b */

 void lux_solve(LUX *lux, int tr, mpq_t x[]);

 /* solve system A*x = b or A'*x = b */

 void lux_delete(LUX *lux);

 /* delete LU-factorization */

 #endif

 /* eof */