/* npp2.c */ /*********************************************************************** * This code is part of GLPK (GNU Linear Programming Kit). * * Copyright (C) 2009-2017 Andrew Makhorin, Department for Applied * Informatics, Moscow Aviation Institute, Moscow, Russia. All rights * reserved. E-mail: . * * 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 . ***********************************************************************/ #include "env.h" #include "npp.h" /*********************************************************************** * NAME * * npp_free_row - process free (unbounded) row * * SYNOPSIS * * #include "glpnpp.h" * void npp_free_row(NPP *npp, NPPROW *p); * * DESCRIPTION * * The routine npp_free_row processes row p, which is free (i.e. has * no finite bounds): * * -inf < sum a[p,j] x[j] < +inf. (1) * j * * PROBLEM TRANSFORMATION * * Constraint (1) cannot be active, so it is redundant and can be * removed from the original problem. * * Removing row p leads to removing a column of multiplier pi[p] for * this row in the dual system. Since row p has no bounds, pi[p] = 0, * so removing the column does not affect the dual solution. * * RECOVERING BASIC SOLUTION * * In solution to the original problem row p is inactive constraint, * so it is assigned status GLP_BS, and multiplier pi[p] is assigned * zero value. * * RECOVERING INTERIOR-POINT SOLUTION * * In solution to the original problem row p is inactive constraint, * so its multiplier pi[p] is assigned zero value. * * RECOVERING MIP SOLUTION * * None needed. */ struct free_row { /* free (unbounded) row */ int p; /* row reference number */ }; static int rcv_free_row(NPP *npp, void *info); void npp_free_row(NPP *npp, NPPROW *p) { /* process free (unbounded) row */ struct free_row *info; /* the row must be free */ xassert(p->lb == -DBL_MAX && p->ub == +DBL_MAX); /* create transformation stack entry */ info = npp_push_tse(npp, rcv_free_row, sizeof(struct free_row)); info->p = p->i; /* remove the row from the problem */ npp_del_row(npp, p); return; } static int rcv_free_row(NPP *npp, void *_info) { /* recover free (unbounded) row */ struct free_row *info = _info; if (npp->sol == GLP_SOL) npp->r_stat[info->p] = GLP_BS; if (npp->sol != GLP_MIP) npp->r_pi[info->p] = 0.0; return 0; } /*********************************************************************** * NAME * * npp_geq_row - process row of 'not less than' type * * SYNOPSIS * * #include "glpnpp.h" * void npp_geq_row(NPP *npp, NPPROW *p); * * DESCRIPTION * * The routine npp_geq_row processes row p, which is 'not less than' * inequality constraint: * * L[p] <= sum a[p,j] x[j] (<= U[p]), (1) * j * * where L[p] < U[p], and upper bound may not exist (U[p] = +oo). * * PROBLEM TRANSFORMATION * * Constraint (1) can be replaced by equality constraint: * * sum a[p,j] x[j] - s = L[p], (2) * j * * where * * 0 <= s (<= U[p] - L[p]) (3) * * is a non-negative surplus variable. * * Since in the primal system there appears column s having the only * non-zero coefficient in row p, in the dual system there appears a * new row: * * (-1) pi[p] + lambda = 0, (4) * * where (-1) is coefficient of column s in row p, pi[p] is multiplier * of row p, lambda is multiplier of column q, 0 is coefficient of * column s in the objective row. * * RECOVERING BASIC SOLUTION * * Status of row p in solution to the original problem is determined * by its status and status of column q in solution to the transformed * problem as follows: * * +--------------------------------------+------------------+ * | Transformed problem | Original problem | * +-----------------+--------------------+------------------+ * | Status of row p | Status of column s | Status of row p | * +-----------------+--------------------+------------------+ * | GLP_BS | GLP_BS | N/A | * | GLP_BS | GLP_NL | GLP_BS | * | GLP_BS | GLP_NU | GLP_BS | * | GLP_NS | GLP_BS | GLP_BS | * | GLP_NS | GLP_NL | GLP_NL | * | GLP_NS | GLP_NU | GLP_NU | * +-----------------+--------------------+------------------+ * * Value of row multiplier pi[p] in solution to the original problem * is the same as in solution to the transformed problem. * * 1. In solution to the transformed problem row p and column q cannot * be basic at the same time; otherwise the basis matrix would have * two linear dependent columns: unity column of auxiliary variable * of row p and unity column of variable s. * * 2. Though in the transformed problem row p is equality constraint, * it may be basic due to primal degenerate solution. * * RECOVERING INTERIOR-POINT SOLUTION * * Value of row multiplier pi[p] in solution to the original problem * is the same as in solution to the transformed problem. * * RECOVERING MIP SOLUTION * * None needed. */ struct ineq_row { /* inequality constraint row */ int p; /* row reference number */ int s; /* column reference number for slack/surplus variable */ }; static int rcv_geq_row(NPP *npp, void *info); void npp_geq_row(NPP *npp, NPPROW *p) { /* process row of 'not less than' type */ struct ineq_row *info; NPPCOL *s; /* the row must have lower bound */ xassert(p->lb != -DBL_MAX); xassert(p->lb < p->ub); /* create column for surplus variable */ s = npp_add_col(npp); s->lb = 0.0; s->ub = (p->ub == +DBL_MAX ? +DBL_MAX : p->ub - p->lb); /* and add it to the transformed problem */ npp_add_aij(npp, p, s, -1.0); /* create transformation stack entry */ info = npp_push_tse(npp, rcv_geq_row, sizeof(struct ineq_row)); info->p = p->i; info->s = s->j; /* replace the row by equality constraint */ p->ub = p->lb; return; } static int rcv_geq_row(NPP *npp, void *_info) { /* recover row of 'not less than' type */ struct ineq_row *info = _info; if (npp->sol == GLP_SOL) { if (npp->r_stat[info->p] == GLP_BS) { if (npp->c_stat[info->s] == GLP_BS) { npp_error(); return 1; } else if (npp->c_stat[info->s] == GLP_NL || npp->c_stat[info->s] == GLP_NU) npp->r_stat[info->p] = GLP_BS; else { npp_error(); return 1; } } else if (npp->r_stat[info->p] == GLP_NS) { if (npp->c_stat[info->s] == GLP_BS) npp->r_stat[info->p] = GLP_BS; else if (npp->c_stat[info->s] == GLP_NL) npp->r_stat[info->p] = GLP_NL; else if (npp->c_stat[info->s] == GLP_NU) npp->r_stat[info->p] = GLP_NU; else { npp_error(); return 1; } } else { npp_error(); return 1; } } return 0; } /*********************************************************************** * NAME * * npp_leq_row - process row of 'not greater than' type * * SYNOPSIS * * #include "glpnpp.h" * void npp_leq_row(NPP *npp, NPPROW *p); * * DESCRIPTION * * The routine npp_leq_row processes row p, which is 'not greater than' * inequality constraint: * * (L[p] <=) sum a[p,j] x[j] <= U[p], (1) * j * * where L[p] < U[p], and lower bound may not exist (L[p] = +oo). * * PROBLEM TRANSFORMATION * * Constraint (1) can be replaced by equality constraint: * * sum a[p,j] x[j] + s = L[p], (2) * j * * where * * 0 <= s (<= U[p] - L[p]) (3) * * is a non-negative slack variable. * * Since in the primal system there appears column s having the only * non-zero coefficient in row p, in the dual system there appears a * new row: * * (+1) pi[p] + lambda = 0, (4) * * where (+1) is coefficient of column s in row p, pi[p] is multiplier * of row p, lambda is multiplier of column q, 0 is coefficient of * column s in the objective row. * * RECOVERING BASIC SOLUTION * * Status of row p in solution to the original problem is determined * by its status and status of column q in solution to the transformed * problem as follows: * * +--------------------------------------+------------------+ * | Transformed problem | Original problem | * +-----------------+--------------------+------------------+ * | Status of row p | Status of column s | Status of row p | * +-----------------+--------------------+------------------+ * | GLP_BS | GLP_BS | N/A | * | GLP_BS | GLP_NL | GLP_BS | * | GLP_BS | GLP_NU | GLP_BS | * | GLP_NS | GLP_BS | GLP_BS | * | GLP_NS | GLP_NL | GLP_NU | * | GLP_NS | GLP_NU | GLP_NL | * +-----------------+--------------------+------------------+ * * Value of row multiplier pi[p] in solution to the original problem * is the same as in solution to the transformed problem. * * 1. In solution to the transformed problem row p and column q cannot * be basic at the same time; otherwise the basis matrix would have * two linear dependent columns: unity column of auxiliary variable * of row p and unity column of variable s. * * 2. Though in the transformed problem row p is equality constraint, * it may be basic due to primal degeneracy. * * RECOVERING INTERIOR-POINT SOLUTION * * Value of row multiplier pi[p] in solution to the original problem * is the same as in solution to the transformed problem. * * RECOVERING MIP SOLUTION * * None needed. */ static int rcv_leq_row(NPP *npp, void *info); void npp_leq_row(NPP *npp, NPPROW *p) { /* process row of 'not greater than' type */ struct ineq_row *info; NPPCOL *s; /* the row must have upper bound */ xassert(p->ub != +DBL_MAX); xassert(p->lb < p->ub); /* create column for slack variable */ s = npp_add_col(npp); s->lb = 0.0; s->ub = (p->lb == -DBL_MAX ? +DBL_MAX : p->ub - p->lb); /* and add it to the transformed problem */ npp_add_aij(npp, p, s, +1.0); /* create transformation stack entry */ info = npp_push_tse(npp, rcv_leq_row, sizeof(struct ineq_row)); info->p = p->i; info->s = s->j; /* replace the row by equality constraint */ p->lb = p->ub; return; } static int rcv_leq_row(NPP *npp, void *_info) { /* recover row of 'not greater than' type */ struct ineq_row *info = _info; if (npp->sol == GLP_SOL) { if (npp->r_stat[info->p] == GLP_BS) { if (npp->c_stat[info->s] == GLP_BS) { npp_error(); return 1; } else if (npp->c_stat[info->s] == GLP_NL || npp->c_stat[info->s] == GLP_NU) npp->r_stat[info->p] = GLP_BS; else { npp_error(); return 1; } } else if (npp->r_stat[info->p] == GLP_NS) { if (npp->c_stat[info->s] == GLP_BS) npp->r_stat[info->p] = GLP_BS; else if (npp->c_stat[info->s] == GLP_NL) npp->r_stat[info->p] = GLP_NU; else if (npp->c_stat[info->s] == GLP_NU) npp->r_stat[info->p] = GLP_NL; else { npp_error(); return 1; } } else { npp_error(); return 1; } } return 0; } /*********************************************************************** * NAME * * npp_free_col - process free (unbounded) column * * SYNOPSIS * * #include "glpnpp.h" * void npp_free_col(NPP *npp, NPPCOL *q); * * DESCRIPTION * * The routine npp_free_col processes column q, which is free (i.e. has * no finite bounds): * * -oo < x[q] < +oo. (1) * * PROBLEM TRANSFORMATION * * Free (unbounded) variable can be replaced by the difference of two * non-negative variables: * * x[q] = s' - s'', s', s'' >= 0. (2) * * Assuming that in the transformed problem x[q] becomes s', * transformation (2) causes new column s'' to appear, which differs * from column s' only in the sign of coefficients in constraint and * objective rows. Thus, if in the dual system the following row * corresponds to column s': * * sum a[i,q] pi[i] + lambda' = c[q], (3) * i * * the row which corresponds to column s'' is the following: * * sum (-a[i,q]) pi[i] + lambda'' = -c[q]. (4) * i * * Then from (3) and (4) it follows that: * * lambda' + lambda'' = 0 => lambda' = lmabda'' = 0, (5) * * where lambda' and lambda'' are multipliers for columns s' and s'', * resp. * * RECOVERING BASIC SOLUTION * * With respect to (5) status of column q in solution to the original * problem is determined by statuses of columns s' and s'' in solution * to the transformed problem as follows: * * +--------------------------------------+------------------+ * | Transformed problem | Original problem | * +------------------+-------------------+------------------+ * | Status of col s' | Status of col s'' | Status of col q | * +------------------+-------------------+------------------+ * | GLP_BS | GLP_BS | N/A | * | GLP_BS | GLP_NL | GLP_BS | * | GLP_NL | GLP_BS | GLP_BS | * | GLP_NL | GLP_NL | GLP_NF | * +------------------+-------------------+------------------+ * * Value of column q is computed with formula (2). * * 1. In solution to the transformed problem columns s' and s'' cannot * be basic at the same time, because they differ only in the sign, * hence, are linear dependent. * * 2. Though column q is free, it can be non-basic due to dual * degeneracy. * * 3. If column q is integral, columns s' and s'' are also integral. * * RECOVERING INTERIOR-POINT SOLUTION * * Value of column q is computed with formula (2). * * RECOVERING MIP SOLUTION * * Value of column q is computed with formula (2). */ struct free_col { /* free (unbounded) column */ int q; /* column reference number for variables x[q] and s' */ int s; /* column reference number for variable s'' */ }; static int rcv_free_col(NPP *npp, void *info); void npp_free_col(NPP *npp, NPPCOL *q) { /* process free (unbounded) column */ struct free_col *info; NPPCOL *s; NPPAIJ *aij; /* the column must be free */ xassert(q->lb == -DBL_MAX && q->ub == +DBL_MAX); /* variable x[q] becomes s' */ q->lb = 0.0, q->ub = +DBL_MAX; /* create variable s'' */ s = npp_add_col(npp); s->is_int = q->is_int; s->lb = 0.0, s->ub = +DBL_MAX; /* duplicate objective coefficient */ s->coef = -q->coef; /* duplicate column of the constraint matrix */ for (aij = q->ptr; aij != NULL; aij = aij->c_next) npp_add_aij(npp, aij->row, s, -aij->val); /* create transformation stack entry */ info = npp_push_tse(npp, rcv_free_col, sizeof(struct free_col)); info->q = q->j; info->s = s->j; return; } static int rcv_free_col(NPP *npp, void *_info) { /* recover free (unbounded) column */ struct free_col *info = _info; if (npp->sol == GLP_SOL) { if (npp->c_stat[info->q] == GLP_BS) { if (npp->c_stat[info->s] == GLP_BS) { npp_error(); return 1; } else if (npp->c_stat[info->s] == GLP_NL) npp->c_stat[info->q] = GLP_BS; else { npp_error(); return -1; } } else if (npp->c_stat[info->q] == GLP_NL) { if (npp->c_stat[info->s] == GLP_BS) npp->c_stat[info->q] = GLP_BS; else if (npp->c_stat[info->s] == GLP_NL) npp->c_stat[info->q] = GLP_NF; else { npp_error(); return -1; } } else { npp_error(); return -1; } } /* compute value of x[q] with formula (2) */ npp->c_value[info->q] -= npp->c_value[info->s]; return 0; } /*********************************************************************** * NAME * * npp_lbnd_col - process column with (non-zero) lower bound * * SYNOPSIS * * #include "glpnpp.h" * void npp_lbnd_col(NPP *npp, NPPCOL *q); * * DESCRIPTION * * The routine npp_lbnd_col processes column q, which has (non-zero) * lower bound: * * l[q] <= x[q] (<= u[q]), (1) * * where l[q] < u[q], and upper bound may not exist (u[q] = +oo). * * PROBLEM TRANSFORMATION * * Column q can be replaced as follows: * * x[q] = l[q] + s, (2) * * where * * 0 <= s (<= u[q] - l[q]) (3) * * is a non-negative variable. * * Substituting x[q] from (2) into the objective row, we have: * * z = sum c[j] x[j] + c0 = * j * * = sum c[j] x[j] + c[q] x[q] + c0 = * j!=q * * = sum c[j] x[j] + c[q] (l[q] + s) + c0 = * j!=q * * = sum c[j] x[j] + c[q] s + c~0, * * where * * c~0 = c0 + c[q] l[q] (4) * * is the constant term of the objective in the transformed problem. * Similarly, substituting x[q] into constraint row i, we have: * * L[i] <= sum a[i,j] x[j] <= U[i] ==> * j * * L[i] <= sum a[i,j] x[j] + a[i,q] x[q] <= U[i] ==> * j!=q * * L[i] <= sum a[i,j] x[j] + a[i,q] (l[q] + s) <= U[i] ==> * j!=q * * L~[i] <= sum a[i,j] x[j] + a[i,q] s <= U~[i], * j!=q * * where * * L~[i] = L[i] - a[i,q] l[q], U~[i] = U[i] - a[i,q] l[q] (5) * * are lower and upper bounds of row i in the transformed problem, * resp. * * Transformation (2) does not affect the dual system. * * RECOVERING BASIC SOLUTION * * Status of column q in solution to the original problem is the same * as in solution to the transformed problem (GLP_BS, GLP_NL or GLP_NU). * Value of column q is computed with formula (2). * * RECOVERING INTERIOR-POINT SOLUTION * * Value of column q is computed with formula (2). * * RECOVERING MIP SOLUTION * * Value of column q is computed with formula (2). */ struct bnd_col { /* bounded column */ int q; /* column reference number for variables x[q] and s */ double bnd; /* lower/upper bound l[q] or u[q] */ }; static int rcv_lbnd_col(NPP *npp, void *info); void npp_lbnd_col(NPP *npp, NPPCOL *q) { /* process column with (non-zero) lower bound */ struct bnd_col *info; NPPROW *i; NPPAIJ *aij; /* the column must have non-zero lower bound */ xassert(q->lb != 0.0); xassert(q->lb != -DBL_MAX); xassert(q->lb < q->ub); /* create transformation stack entry */ info = npp_push_tse(npp, rcv_lbnd_col, sizeof(struct bnd_col)); info->q = q->j; info->bnd = q->lb; /* substitute x[q] into objective row */ npp->c0 += q->coef * q->lb; /* substitute x[q] into constraint rows */ for (aij = q->ptr; aij != NULL; aij = aij->c_next) { i = aij->row; if (i->lb == i->ub) i->ub = (i->lb -= aij->val * q->lb); else { if (i->lb != -DBL_MAX) i->lb -= aij->val * q->lb; if (i->ub != +DBL_MAX) i->ub -= aij->val * q->lb; } } /* column x[q] becomes column s */ if (q->ub != +DBL_MAX) q->ub -= q->lb; q->lb = 0.0; return; } static int rcv_lbnd_col(NPP *npp, void *_info) { /* recover column with (non-zero) lower bound */ struct bnd_col *info = _info; if (npp->sol == GLP_SOL) { if (npp->c_stat[info->q] == GLP_BS || npp->c_stat[info->q] == GLP_NL || npp->c_stat[info->q] == GLP_NU) npp->c_stat[info->q] = npp->c_stat[info->q]; else { npp_error(); return 1; } } /* compute value of x[q] with formula (2) */ npp->c_value[info->q] = info->bnd + npp->c_value[info->q]; return 0; } /*********************************************************************** * NAME * * npp_ubnd_col - process column with upper bound * * SYNOPSIS * * #include "glpnpp.h" * void npp_ubnd_col(NPP *npp, NPPCOL *q); * * DESCRIPTION * * The routine npp_ubnd_col processes column q, which has upper bound: * * (l[q] <=) x[q] <= u[q], (1) * * where l[q] < u[q], and lower bound may not exist (l[q] = -oo). * * PROBLEM TRANSFORMATION * * Column q can be replaced as follows: * * x[q] = u[q] - s, (2) * * where * * 0 <= s (<= u[q] - l[q]) (3) * * is a non-negative variable. * * Substituting x[q] from (2) into the objective row, we have: * * z = sum c[j] x[j] + c0 = * j * * = sum c[j] x[j] + c[q] x[q] + c0 = * j!=q * * = sum c[j] x[j] + c[q] (u[q] - s) + c0 = * j!=q * * = sum c[j] x[j] - c[q] s + c~0, * * where * * c~0 = c0 + c[q] u[q] (4) * * is the constant term of the objective in the transformed problem. * Similarly, substituting x[q] into constraint row i, we have: * * L[i] <= sum a[i,j] x[j] <= U[i] ==> * j * * L[i] <= sum a[i,j] x[j] + a[i,q] x[q] <= U[i] ==> * j!=q * * L[i] <= sum a[i,j] x[j] + a[i,q] (u[q] - s) <= U[i] ==> * j!=q * * L~[i] <= sum a[i,j] x[j] - a[i,q] s <= U~[i], * j!=q * * where * * L~[i] = L[i] - a[i,q] u[q], U~[i] = U[i] - a[i,q] u[q] (5) * * are lower and upper bounds of row i in the transformed problem, * resp. * * Note that in the transformed problem coefficients c[q] and a[i,q] * change their sign. Thus, the row of the dual system corresponding to * column q: * * sum a[i,q] pi[i] + lambda[q] = c[q] (6) * i * * in the transformed problem becomes the following: * * sum (-a[i,q]) pi[i] + lambda[s] = -c[q]. (7) * i * * Therefore: * * lambda[q] = - lambda[s], (8) * * where lambda[q] is multiplier for column q, lambda[s] is multiplier * for column s. * * RECOVERING BASIC SOLUTION * * With respect to (8) status of column q in solution to the original * problem is determined by status of column s in solution to the * transformed problem as follows: * * +-----------------------+--------------------+ * | Status of column s | Status of column q | * | (transformed problem) | (original problem) | * +-----------------------+--------------------+ * | GLP_BS | GLP_BS | * | GLP_NL | GLP_NU | * | GLP_NU | GLP_NL | * +-----------------------+--------------------+ * * Value of column q is computed with formula (2). * * RECOVERING INTERIOR-POINT SOLUTION * * Value of column q is computed with formula (2). * * RECOVERING MIP SOLUTION * * Value of column q is computed with formula (2). */ static int rcv_ubnd_col(NPP *npp, void *info); void npp_ubnd_col(NPP *npp, NPPCOL *q) { /* process column with upper bound */ struct bnd_col *info; NPPROW *i; NPPAIJ *aij; /* the column must have upper bound */ xassert(q->ub != +DBL_MAX); xassert(q->lb < q->ub); /* create transformation stack entry */ info = npp_push_tse(npp, rcv_ubnd_col, sizeof(struct bnd_col)); info->q = q->j; info->bnd = q->ub; /* substitute x[q] into objective row */ npp->c0 += q->coef * q->ub; q->coef = -q->coef; /* substitute x[q] into constraint rows */ for (aij = q->ptr; aij != NULL; aij = aij->c_next) { i = aij->row; if (i->lb == i->ub) i->ub = (i->lb -= aij->val * q->ub); else { if (i->lb != -DBL_MAX) i->lb -= aij->val * q->ub; if (i->ub != +DBL_MAX) i->ub -= aij->val * q->ub; } aij->val = -aij->val; } /* column x[q] becomes column s */ if (q->lb != -DBL_MAX) q->ub -= q->lb; else q->ub = +DBL_MAX; q->lb = 0.0; return; } static int rcv_ubnd_col(NPP *npp, void *_info) { /* recover column with upper bound */ struct bnd_col *info = _info; if (npp->sol == GLP_BS) { if (npp->c_stat[info->q] == GLP_BS) npp->c_stat[info->q] = GLP_BS; else if (npp->c_stat[info->q] == GLP_NL) npp->c_stat[info->q] = GLP_NU; else if (npp->c_stat[info->q] == GLP_NU) npp->c_stat[info->q] = GLP_NL; else { npp_error(); return 1; } } /* compute value of x[q] with formula (2) */ npp->c_value[info->q] = info->bnd - npp->c_value[info->q]; return 0; } /*********************************************************************** * NAME * * npp_dbnd_col - process non-negative column with upper bound * * SYNOPSIS * * #include "glpnpp.h" * void npp_dbnd_col(NPP *npp, NPPCOL *q); * * DESCRIPTION * * The routine npp_dbnd_col processes column q, which is non-negative * and has upper bound: * * 0 <= x[q] <= u[q], (1) * * where u[q] > 0. * * PROBLEM TRANSFORMATION * * Upper bound of column q can be replaced by the following equality * constraint: * * x[q] + s = u[q], (2) * * where s >= 0 is a non-negative complement variable. * * Since in the primal system along with new row (2) there appears a * new column s having the only non-zero coefficient in this row, in * the dual system there appears a new row: * * (+1)pi + lambda[s] = 0, (3) * * where (+1) is coefficient at column s in row (2), pi is multiplier * for row (2), lambda[s] is multiplier for column s, 0 is coefficient * at column s in the objective row. * * RECOVERING BASIC SOLUTION * * Status of column q in solution to the original problem is determined * by its status and status of column s in solution to the transformed * problem as follows: * * +-----------------------------------+------------------+ * | Transformed problem | Original problem | * +-----------------+-----------------+------------------+ * | Status of col q | Status of col s | Status of col q | * +-----------------+-----------------+------------------+ * | GLP_BS | GLP_BS | GLP_BS | * | GLP_BS | GLP_NL | GLP_NU | * | GLP_NL | GLP_BS | GLP_NL | * | GLP_NL | GLP_NL | GLP_NL (*) | * +-----------------+-----------------+------------------+ * * Value of column q in solution to the original problem is the same as * in solution to the transformed problem. * * 1. Formally, in solution to the transformed problem columns q and s * cannot be non-basic at the same time, since the constraint (2) * would be violated. However, if u[q] is close to zero, violation * may be less than a working precision even if both columns q and s * are non-basic. In this degenerate case row (2) can be only basic, * i.e. non-active constraint (otherwise corresponding row of the * basis matrix would be zero). This allows to pivot out auxiliary * variable and pivot in column s, in which case the row becomes * active while column s becomes basic. * * 2. If column q is integral, column s is also integral. * * RECOVERING INTERIOR-POINT SOLUTION * * Value of column q in solution to the original problem is the same as * in solution to the transformed problem. * * RECOVERING MIP SOLUTION * * Value of column q in solution to the original problem is the same as * in solution to the transformed problem. */ struct dbnd_col { /* double-bounded column */ int q; /* column reference number for variable x[q] */ int s; /* column reference number for complement variable s */ }; static int rcv_dbnd_col(NPP *npp, void *info); void npp_dbnd_col(NPP *npp, NPPCOL *q) { /* process non-negative column with upper bound */ struct dbnd_col *info; NPPROW *p; NPPCOL *s; /* the column must be non-negative with upper bound */ xassert(q->lb == 0.0); xassert(q->ub > 0.0); xassert(q->ub != +DBL_MAX); /* create variable s */ s = npp_add_col(npp); s->is_int = q->is_int; s->lb = 0.0, s->ub = +DBL_MAX; /* create equality constraint (2) */ p = npp_add_row(npp); p->lb = p->ub = q->ub; npp_add_aij(npp, p, q, +1.0); npp_add_aij(npp, p, s, +1.0); /* create transformation stack entry */ info = npp_push_tse(npp, rcv_dbnd_col, sizeof(struct dbnd_col)); info->q = q->j; info->s = s->j; /* remove upper bound of x[q] */ q->ub = +DBL_MAX; return; } static int rcv_dbnd_col(NPP *npp, void *_info) { /* recover non-negative column with upper bound */ struct dbnd_col *info = _info; if (npp->sol == GLP_BS) { if (npp->c_stat[info->q] == GLP_BS) { if (npp->c_stat[info->s] == GLP_BS) npp->c_stat[info->q] = GLP_BS; else if (npp->c_stat[info->s] == GLP_NL) npp->c_stat[info->q] = GLP_NU; else { npp_error(); return 1; } } else if (npp->c_stat[info->q] == GLP_NL) { if (npp->c_stat[info->s] == GLP_BS || npp->c_stat[info->s] == GLP_NL) npp->c_stat[info->q] = GLP_NL; else { npp_error(); return 1; } } else { npp_error(); return 1; } } return 0; } /*********************************************************************** * NAME * * npp_fixed_col - process fixed column * * SYNOPSIS * * #include "glpnpp.h" * void npp_fixed_col(NPP *npp, NPPCOL *q); * * DESCRIPTION * * The routine npp_fixed_col processes column q, which is fixed: * * x[q] = s[q], (1) * * where s[q] is a fixed column value. * * PROBLEM TRANSFORMATION * * The value of a fixed column can be substituted into the objective * and constraint rows that allows removing the column from the problem. * * Substituting x[q] = s[q] into the objective row, we have: * * z = sum c[j] x[j] + c0 = * j * * = sum c[j] x[j] + c[q] x[q] + c0 = * j!=q * * = sum c[j] x[j] + c[q] s[q] + c0 = * j!=q * * = sum c[j] x[j] + c~0, * j!=q * * where * * c~0 = c0 + c[q] s[q] (2) * * is the constant term of the objective in the transformed problem. * Similarly, substituting x[q] = s[q] into constraint row i, we have: * * L[i] <= sum a[i,j] x[j] <= U[i] ==> * j * * L[i] <= sum a[i,j] x[j] + a[i,q] x[q] <= U[i] ==> * j!=q * * L[i] <= sum a[i,j] x[j] + a[i,q] s[q] <= U[i] ==> * j!=q * * L~[i] <= sum a[i,j] x[j] + a[i,q] s <= U~[i], * j!=q * * where * * L~[i] = L[i] - a[i,q] s[q], U~[i] = U[i] - a[i,q] s[q] (3) * * are lower and upper bounds of row i in the transformed problem, * resp. * * RECOVERING BASIC SOLUTION * * Column q is assigned status GLP_NS and its value is assigned s[q]. * * RECOVERING INTERIOR-POINT SOLUTION * * Value of column q is assigned s[q]. * * RECOVERING MIP SOLUTION * * Value of column q is assigned s[q]. */ struct fixed_col { /* fixed column */ int q; /* column reference number for variable x[q] */ double s; /* value, at which x[q] is fixed */ }; static int rcv_fixed_col(NPP *npp, void *info); void npp_fixed_col(NPP *npp, NPPCOL *q) { /* process fixed column */ struct fixed_col *info; NPPROW *i; NPPAIJ *aij; /* the column must be fixed */ xassert(q->lb == q->ub); /* create transformation stack entry */ info = npp_push_tse(npp, rcv_fixed_col, sizeof(struct fixed_col)); info->q = q->j; info->s = q->lb; /* substitute x[q] = s[q] into objective row */ npp->c0 += q->coef * q->lb; /* substitute x[q] = s[q] into constraint rows */ for (aij = q->ptr; aij != NULL; aij = aij->c_next) { i = aij->row; if (i->lb == i->ub) i->ub = (i->lb -= aij->val * q->lb); else { if (i->lb != -DBL_MAX) i->lb -= aij->val * q->lb; if (i->ub != +DBL_MAX) i->ub -= aij->val * q->lb; } } /* remove the column from the problem */ npp_del_col(npp, q); return; } static int rcv_fixed_col(NPP *npp, void *_info) { /* recover fixed column */ struct fixed_col *info = _info; if (npp->sol == GLP_SOL) npp->c_stat[info->q] = GLP_NS; npp->c_value[info->q] = info->s; return 0; } /*********************************************************************** * NAME * * npp_make_equality - process row with almost identical bounds * * SYNOPSIS * * #include "glpnpp.h" * int npp_make_equality(NPP *npp, NPPROW *p); * * DESCRIPTION * * The routine npp_make_equality processes row p: * * L[p] <= sum a[p,j] x[j] <= U[p], (1) * j * * where -oo < L[p] < U[p] < +oo, i.e. which is double-sided inequality * constraint. * * RETURNS * * 0 - row bounds have not been changed; * * 1 - row has been replaced by equality constraint. * * PROBLEM TRANSFORMATION * * If bounds of row (1) are very close to each other: * * U[p] - L[p] <= eps, (2) * * where eps is an absolute tolerance for row value, the row can be * replaced by the following almost equivalent equiality constraint: * * sum a[p,j] x[j] = b, (3) * j * * where b = (L[p] + U[p]) / 2. If the right-hand side in (3) happens * to be very close to its nearest integer: * * |b - floor(b + 0.5)| <= eps, (4) * * it is reasonable to use this nearest integer as the right-hand side. * * RECOVERING BASIC SOLUTION * * Status of row p in solution to the original problem is determined * by its status and the sign of its multiplier pi[p] in solution to * the transformed problem as follows: * * +-----------------------+---------+--------------------+ * | Status of row p | Sign of | Status of row p | * | (transformed problem) | pi[p] | (original problem) | * +-----------------------+---------+--------------------+ * | GLP_BS | + / - | GLP_BS | * | GLP_NS | + | GLP_NL | * | GLP_NS | - | GLP_NU | * +-----------------------+---------+--------------------+ * * Value of row multiplier pi[p] in solution to the original problem is * the same as in solution to the transformed problem. * * RECOVERING INTERIOR POINT SOLUTION * * Value of row multiplier pi[p] in solution to the original problem is * the same as in solution to the transformed problem. * * RECOVERING MIP SOLUTION * * None needed. */ struct make_equality { /* row with almost identical bounds */ int p; /* row reference number */ }; static int rcv_make_equality(NPP *npp, void *info); int npp_make_equality(NPP *npp, NPPROW *p) { /* process row with almost identical bounds */ struct make_equality *info; double b, eps, nint; /* the row must be double-sided inequality */ xassert(p->lb != -DBL_MAX); xassert(p->ub != +DBL_MAX); xassert(p->lb < p->ub); /* check row bounds */ eps = 1e-9 + 1e-12 * fabs(p->lb); if (p->ub - p->lb > eps) return 0; /* row bounds are very close to each other */ /* create transformation stack entry */ info = npp_push_tse(npp, rcv_make_equality, sizeof(struct make_equality)); info->p = p->i; /* compute right-hand side */ b = 0.5 * (p->ub + p->lb); nint = floor(b + 0.5); if (fabs(b - nint) <= eps) b = nint; /* replace row p by almost equivalent equality constraint */ p->lb = p->ub = b; return 1; } int rcv_make_equality(NPP *npp, void *_info) { /* recover row with almost identical bounds */ struct make_equality *info = _info; if (npp->sol == GLP_SOL) { if (npp->r_stat[info->p] == GLP_BS) npp->r_stat[info->p] = GLP_BS; else if (npp->r_stat[info->p] == GLP_NS) { if (npp->r_pi[info->p] >= 0.0) npp->r_stat[info->p] = GLP_NL; else npp->r_stat[info->p] = GLP_NU; } else { npp_error(); return 1; } } return 0; } /*********************************************************************** * NAME * * npp_make_fixed - process column with almost identical bounds * * SYNOPSIS * * #include "glpnpp.h" * int npp_make_fixed(NPP *npp, NPPCOL *q); * * DESCRIPTION * * The routine npp_make_fixed processes column q: * * l[q] <= x[q] <= u[q], (1) * * where -oo < l[q] < u[q] < +oo, i.e. which has both lower and upper * bounds. * * RETURNS * * 0 - column bounds have not been changed; * * 1 - column has been fixed. * * PROBLEM TRANSFORMATION * * If bounds of column (1) are very close to each other: * * u[q] - l[q] <= eps, (2) * * where eps is an absolute tolerance for column value, the column can * be fixed: * * x[q] = s[q], (3) * * where s[q] = (l[q] + u[q]) / 2. And if the fixed column value s[q] * happens to be very close to its nearest integer: * * |s[q] - floor(s[q] + 0.5)| <= eps, (4) * * it is reasonable to use this nearest integer as the fixed value. * * RECOVERING BASIC SOLUTION * * In the dual system of the original (as well as transformed) problem * column q corresponds to the following row: * * sum a[i,q] pi[i] + lambda[q] = c[q]. (5) * i * * Since multipliers pi[i] are known for all rows from solution to the * transformed problem, formula (5) allows computing value of multiplier * (reduced cost) for column q: * * lambda[q] = c[q] - sum a[i,q] pi[i]. (6) * i * * Status of column q in solution to the original problem is determined * by its status and the sign of its multiplier lambda[q] in solution to * the transformed problem as follows: * * +-----------------------+-----------+--------------------+ * | Status of column q | Sign of | Status of column q | * | (transformed problem) | lambda[q] | (original problem) | * +-----------------------+-----------+--------------------+ * | GLP_BS | + / - | GLP_BS | * | GLP_NS | + | GLP_NL | * | GLP_NS | - | GLP_NU | * +-----------------------+-----------+--------------------+ * * Value of column q in solution to the original problem is the same as * in solution to the transformed problem. * * RECOVERING INTERIOR POINT SOLUTION * * Value of column q in solution to the original problem is the same as * in solution to the transformed problem. * * RECOVERING MIP SOLUTION * * None needed. */ struct make_fixed { /* column with almost identical bounds */ int q; /* column reference number */ double c; /* objective coefficient at x[q] */ NPPLFE *ptr; /* list of non-zero coefficients a[i,q] */ }; static int rcv_make_fixed(NPP *npp, void *info); int npp_make_fixed(NPP *npp, NPPCOL *q) { /* process column with almost identical bounds */ struct make_fixed *info; NPPAIJ *aij; NPPLFE *lfe; double s, eps, nint; /* the column must be double-bounded */ xassert(q->lb != -DBL_MAX); xassert(q->ub != +DBL_MAX); xassert(q->lb < q->ub); /* check column bounds */ eps = 1e-9 + 1e-12 * fabs(q->lb); if (q->ub - q->lb > eps) return 0; /* column bounds are very close to each other */ /* create transformation stack entry */ info = npp_push_tse(npp, rcv_make_fixed, sizeof(struct make_fixed)); info->q = q->j; info->c = q->coef; info->ptr = NULL; /* save column coefficients a[i,q] (needed for basic solution only) */ if (npp->sol == GLP_SOL) { for (aij = q->ptr; aij != NULL; aij = aij->c_next) { lfe = dmp_get_atom(npp->stack, sizeof(NPPLFE)); lfe->ref = aij->row->i; lfe->val = aij->val; lfe->next = info->ptr; info->ptr = lfe; } } /* compute column fixed value */ s = 0.5 * (q->ub + q->lb); nint = floor(s + 0.5); if (fabs(s - nint) <= eps) s = nint; /* make column q fixed */ q->lb = q->ub = s; return 1; } static int rcv_make_fixed(NPP *npp, void *_info) { /* recover column with almost identical bounds */ struct make_fixed *info = _info; NPPLFE *lfe; double lambda; if (npp->sol == GLP_SOL) { if (npp->c_stat[info->q] == GLP_BS) npp->c_stat[info->q] = GLP_BS; else if (npp->c_stat[info->q] == GLP_NS) { /* compute multiplier for column q with formula (6) */ lambda = info->c; for (lfe = info->ptr; lfe != NULL; lfe = lfe->next) lambda -= lfe->val * npp->r_pi[lfe->ref]; /* assign status to non-basic column */ if (lambda >= 0.0) npp->c_stat[info->q] = GLP_NL; else npp->c_stat[info->q] = GLP_NU; } else { npp_error(); return 1; } } return 0; } /* eof */