src/glpapi16.c
changeset 1 c445c931472f
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     1 /* glpapi16.c (graph and network analysis routines) */
       
     2 
       
     3 /***********************************************************************
       
     4 *  This code is part of GLPK (GNU Linear Programming Kit).
       
     5 *
       
     6 *  Copyright (C) 2000, 2001, 2002, 2003, 2004, 2005, 2006, 2007, 2008,
       
     7 *  2009, 2010 Andrew Makhorin, Department for Applied Informatics,
       
     8 *  Moscow Aviation Institute, Moscow, Russia. All rights reserved.
       
     9 *  E-mail: <mao@gnu.org>.
       
    10 *
       
    11 *  GLPK is free software: you can redistribute it and/or modify it
       
    12 *  under the terms of the GNU General Public License as published by
       
    13 *  the Free Software Foundation, either version 3 of the License, or
       
    14 *  (at your option) any later version.
       
    15 *
       
    16 *  GLPK is distributed in the hope that it will be useful, but WITHOUT
       
    17 *  ANY WARRANTY; without even the implied warranty of MERCHANTABILITY
       
    18 *  or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public
       
    19 *  License for more details.
       
    20 *
       
    21 *  You should have received a copy of the GNU General Public License
       
    22 *  along with GLPK. If not, see <http://www.gnu.org/licenses/>.
       
    23 ***********************************************************************/
       
    24 
       
    25 #include "glpapi.h"
       
    26 #include "glpnet.h"
       
    27 
       
    28 /***********************************************************************
       
    29 *  NAME
       
    30 *
       
    31 *  glp_weak_comp - find all weakly connected components of graph
       
    32 *
       
    33 *  SYNOPSIS
       
    34 *
       
    35 *  int glp_weak_comp(glp_graph *G, int v_num);
       
    36 *
       
    37 *  DESCRIPTION
       
    38 *
       
    39 *  The routine glp_weak_comp finds all weakly connected components of
       
    40 *  the specified graph.
       
    41 *
       
    42 *  The parameter v_num specifies an offset of the field of type int
       
    43 *  in the vertex data block, to which the routine stores the number of
       
    44 *  a (weakly) connected component containing that vertex. If v_num < 0,
       
    45 *  no component numbers are stored.
       
    46 *
       
    47 *  The components are numbered in arbitrary order from 1 to nc, where
       
    48 *  nc is the total number of components found, 0 <= nc <= |V|.
       
    49 *
       
    50 *  RETURNS
       
    51 *
       
    52 *  The routine returns nc, the total number of components found. */
       
    53 
       
    54 int glp_weak_comp(glp_graph *G, int v_num)
       
    55 {     glp_vertex *v;
       
    56       glp_arc *a;
       
    57       int f, i, j, nc, nv, pos1, pos2, *prev, *next, *list;
       
    58       if (v_num >= 0 && v_num > G->v_size - (int)sizeof(int))
       
    59          xerror("glp_weak_comp: v_num = %d; invalid offset\n", v_num);
       
    60       nv = G->nv;
       
    61       if (nv == 0)
       
    62       {  nc = 0;
       
    63          goto done;
       
    64       }
       
    65       /* allocate working arrays */
       
    66       prev = xcalloc(1+nv, sizeof(int));
       
    67       next = xcalloc(1+nv, sizeof(int));
       
    68       list = xcalloc(1+nv, sizeof(int));
       
    69       /* if vertex i is unlabelled, prev[i] is the index of previous
       
    70          unlabelled vertex, and next[i] is the index of next unlabelled
       
    71          vertex; if vertex i is labelled, then prev[i] < 0, and next[i]
       
    72          is the connected component number */
       
    73       /* initially all vertices are unlabelled */
       
    74       f = 1;
       
    75       for (i = 1; i <= nv; i++)
       
    76          prev[i] = i - 1, next[i] = i + 1;
       
    77       next[nv] = 0;
       
    78       /* main loop (until all vertices have been labelled) */
       
    79       nc = 0;
       
    80       while (f != 0)
       
    81       {  /* take an unlabelled vertex */
       
    82          i = f;
       
    83          /* and remove it from the list of unlabelled vertices */
       
    84          f = next[i];
       
    85          if (f != 0) prev[f] = 0;
       
    86          /* label the vertex; it begins a new component */
       
    87          prev[i] = -1, next[i] = ++nc;
       
    88          /* breadth first search */
       
    89          list[1] = i, pos1 = pos2 = 1;
       
    90          while (pos1 <= pos2)
       
    91          {  /* dequeue vertex i */
       
    92             i = list[pos1++];
       
    93             /* consider all arcs incoming to vertex i */
       
    94             for (a = G->v[i]->in; a != NULL; a = a->h_next)
       
    95             {  /* vertex j is adjacent to vertex i */
       
    96                j = a->tail->i;
       
    97                if (prev[j] >= 0)
       
    98                {  /* vertex j is unlabelled */
       
    99                   /* remove it from the list of unlabelled vertices */
       
   100                   if (prev[j] == 0)
       
   101                      f = next[j];
       
   102                   else
       
   103                      next[prev[j]] = next[j];
       
   104                   if (next[j] == 0)
       
   105                      ;
       
   106                   else
       
   107                      prev[next[j]] = prev[j];
       
   108                   /* label the vertex */
       
   109                   prev[j] = -1, next[j] = nc;
       
   110                   /* and enqueue it for further consideration */
       
   111                   list[++pos2] = j;
       
   112                }
       
   113             }
       
   114             /* consider all arcs outgoing from vertex i */
       
   115             for (a = G->v[i]->out; a != NULL; a = a->t_next)
       
   116             {  /* vertex j is adjacent to vertex i */
       
   117                j = a->head->i;
       
   118                if (prev[j] >= 0)
       
   119                {  /* vertex j is unlabelled */
       
   120                   /* remove it from the list of unlabelled vertices */
       
   121                   if (prev[j] == 0)
       
   122                      f = next[j];
       
   123                   else
       
   124                      next[prev[j]] = next[j];
       
   125                   if (next[j] == 0)
       
   126                      ;
       
   127                   else
       
   128                      prev[next[j]] = prev[j];
       
   129                   /* label the vertex */
       
   130                   prev[j] = -1, next[j] = nc;
       
   131                   /* and enqueue it for further consideration */
       
   132                   list[++pos2] = j;
       
   133                }
       
   134             }
       
   135          }
       
   136       }
       
   137       /* store component numbers */
       
   138       if (v_num >= 0)
       
   139       {  for (i = 1; i <= nv; i++)
       
   140          {  v = G->v[i];
       
   141             memcpy((char *)v->data + v_num, &next[i], sizeof(int));
       
   142          }
       
   143       }
       
   144       /* free working arrays */
       
   145       xfree(prev);
       
   146       xfree(next);
       
   147       xfree(list);
       
   148 done: return nc;
       
   149 }
       
   150 
       
   151 /***********************************************************************
       
   152 *  NAME
       
   153 *
       
   154 *  glp_strong_comp - find all strongly connected components of graph
       
   155 *
       
   156 *  SYNOPSIS
       
   157 *
       
   158 *  int glp_strong_comp(glp_graph *G, int v_num);
       
   159 *
       
   160 *  DESCRIPTION
       
   161 *
       
   162 *  The routine glp_strong_comp finds all strongly connected components
       
   163 *  of the specified graph.
       
   164 *
       
   165 *  The parameter v_num specifies an offset of the field of type int
       
   166 *  in the vertex data block, to which the routine stores the number of
       
   167 *  a strongly connected component containing that vertex. If v_num < 0,
       
   168 *  no component numbers are stored.
       
   169 *
       
   170 *  The components are numbered in arbitrary order from 1 to nc, where
       
   171 *  nc is the total number of components found, 0 <= nc <= |V|. However,
       
   172 *  the component numbering has the property that for every arc (i->j)
       
   173 *  in the graph the condition num(i) >= num(j) holds.
       
   174 *
       
   175 *  RETURNS
       
   176 *
       
   177 *  The routine returns nc, the total number of components found. */
       
   178 
       
   179 int glp_strong_comp(glp_graph *G, int v_num)
       
   180 {     glp_vertex *v;
       
   181       glp_arc *a;
       
   182       int i, k, last, n, na, nc, *icn, *ip, *lenr, *ior, *ib, *lowl,
       
   183          *numb, *prev;
       
   184       if (v_num >= 0 && v_num > G->v_size - (int)sizeof(int))
       
   185          xerror("glp_strong_comp: v_num = %d; invalid offset\n",
       
   186             v_num);
       
   187       n = G->nv;
       
   188       if (n == 0)
       
   189       {  nc = 0;
       
   190          goto done;
       
   191       }
       
   192       na = G->na;
       
   193       icn = xcalloc(1+na, sizeof(int));
       
   194       ip = xcalloc(1+n, sizeof(int));
       
   195       lenr = xcalloc(1+n, sizeof(int));
       
   196       ior = xcalloc(1+n, sizeof(int));
       
   197       ib = xcalloc(1+n, sizeof(int));
       
   198       lowl = xcalloc(1+n, sizeof(int));
       
   199       numb = xcalloc(1+n, sizeof(int));
       
   200       prev = xcalloc(1+n, sizeof(int));
       
   201       k = 1;
       
   202       for (i = 1; i <= n; i++)
       
   203       {  v = G->v[i];
       
   204          ip[i] = k;
       
   205          for (a = v->out; a != NULL; a = a->t_next)
       
   206             icn[k++] = a->head->i;
       
   207          lenr[i] = k - ip[i];
       
   208       }
       
   209       xassert(na == k-1);
       
   210       nc = mc13d(n, icn, ip, lenr, ior, ib, lowl, numb, prev);
       
   211       if (v_num >= 0)
       
   212       {  xassert(ib[1] == 1);
       
   213          for (k = 1; k <= nc; k++)
       
   214          {  last = (k < nc ? ib[k+1] : n+1);
       
   215             xassert(ib[k] < last);
       
   216             for (i = ib[k]; i < last; i++)
       
   217             {  v = G->v[ior[i]];
       
   218                memcpy((char *)v->data + v_num, &k, sizeof(int));
       
   219             }
       
   220          }
       
   221       }
       
   222       xfree(icn);
       
   223       xfree(ip);
       
   224       xfree(lenr);
       
   225       xfree(ior);
       
   226       xfree(ib);
       
   227       xfree(lowl);
       
   228       xfree(numb);
       
   229       xfree(prev);
       
   230 done: return nc;
       
   231 }
       
   232 
       
   233 /***********************************************************************
       
   234 *  NAME
       
   235 *
       
   236 *  glp_top_sort - topological sorting of acyclic digraph
       
   237 *
       
   238 *  SYNOPSIS
       
   239 *
       
   240 *  int glp_top_sort(glp_graph *G, int v_num);
       
   241 *
       
   242 *  DESCRIPTION
       
   243 *
       
   244 *  The routine glp_top_sort performs topological sorting of vertices of
       
   245 *  the specified acyclic digraph.
       
   246 *
       
   247 *  The parameter v_num specifies an offset of the field of type int in
       
   248 *  the vertex data block, to which the routine stores the vertex number
       
   249 *  assigned. If v_num < 0, vertex numbers are not stored.
       
   250 *
       
   251 *  The vertices are numbered from 1 to n, where n is the total number
       
   252 *  of vertices in the graph. The vertex numbering has the property that
       
   253 *  for every arc (i->j) in the graph the condition num(i) < num(j)
       
   254 *  holds. Special case num(i) = 0 means that vertex i is not assigned a
       
   255 *  number, because the graph is *not* acyclic.
       
   256 *
       
   257 *  RETURNS
       
   258 *
       
   259 *  If the graph is acyclic and therefore all the vertices have been
       
   260 *  assigned numbers, the routine glp_top_sort returns zero. Otherwise,
       
   261 *  if the graph is not acyclic, the routine returns the number of
       
   262 *  vertices which have not been numbered, i.e. for which num(i) = 0. */
       
   263 
       
   264 static int top_sort(glp_graph *G, int num[])
       
   265 {     glp_arc *a;
       
   266       int i, j, cnt, top, *stack, *indeg;
       
   267       /* allocate working arrays */
       
   268       indeg = xcalloc(1+G->nv, sizeof(int));
       
   269       stack = xcalloc(1+G->nv, sizeof(int));
       
   270       /* determine initial indegree of each vertex; push into the stack
       
   271          the vertices having zero indegree */
       
   272       top = 0;
       
   273       for (i = 1; i <= G->nv; i++)
       
   274       {  num[i] = indeg[i] = 0;
       
   275          for (a = G->v[i]->in; a != NULL; a = a->h_next)
       
   276             indeg[i]++;
       
   277          if (indeg[i] == 0)
       
   278             stack[++top] = i;
       
   279       }
       
   280       /* assign numbers to vertices in the sorted order */
       
   281       cnt = 0;
       
   282       while (top > 0)
       
   283       {  /* pull vertex i from the stack */
       
   284          i = stack[top--];
       
   285          /* it has zero indegree in the current graph */
       
   286          xassert(indeg[i] == 0);
       
   287          /* so assign it a next number */
       
   288          xassert(num[i] == 0);
       
   289          num[i] = ++cnt;
       
   290          /* remove vertex i from the current graph, update indegree of
       
   291             its adjacent vertices, and push into the stack new vertices
       
   292             whose indegree becomes zero */
       
   293          for (a = G->v[i]->out; a != NULL; a = a->t_next)
       
   294          {  j = a->head->i;
       
   295             /* there exists arc (i->j) in the graph */
       
   296             xassert(indeg[j] > 0);
       
   297             indeg[j]--;
       
   298             if (indeg[j] == 0)
       
   299                stack[++top] = j;
       
   300          }
       
   301       }
       
   302       /* free working arrays */
       
   303       xfree(indeg);
       
   304       xfree(stack);
       
   305       return G->nv - cnt;
       
   306 }
       
   307 
       
   308 int glp_top_sort(glp_graph *G, int v_num)
       
   309 {     glp_vertex *v;
       
   310       int i, cnt, *num;
       
   311       if (v_num >= 0 && v_num > G->v_size - (int)sizeof(int))
       
   312          xerror("glp_top_sort: v_num = %d; invalid offset\n", v_num);
       
   313       if (G->nv == 0)
       
   314       {  cnt = 0;
       
   315          goto done;
       
   316       }
       
   317       num = xcalloc(1+G->nv, sizeof(int));
       
   318       cnt = top_sort(G, num);
       
   319       if (v_num >= 0)
       
   320       {  for (i = 1; i <= G->nv; i++)
       
   321          {  v = G->v[i];
       
   322             memcpy((char *)v->data + v_num, &num[i], sizeof(int));
       
   323          }
       
   324       }
       
   325       xfree(num);
       
   326 done: return cnt;
       
   327 }
       
   328 
       
   329 /* eof */