examples/mvcp.mod
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     1 /* MVCP, Minimum Vertex Cover Problem */
       
     2 
       
     3 /* Written in GNU MathProg by Andrew Makhorin <mao@gnu.org> */
       
     4 
       
     5 /* The Minimum Vertex Cover Problem in a network G = (V, E), where V
       
     6    is a set of nodes, E is a set of arcs, is to find a subset V' within
       
     7    V such that each edge (i,j) in E has at least one its endpoint in V'
       
     8    and which minimizes the sum of node weights w(i) over V'.
       
     9 
       
    10    Reference:
       
    11    Garey, M.R., and Johnson, D.S. (1979), Computers and Intractability:
       
    12    A guide to the theory of NP-completeness [Graph Theory, Covering and
       
    13    Partitioning, Minimum Vertex Cover, GT1]. */
       
    14 
       
    15 set E, dimen 2;
       
    16 /* set of edges */
       
    17 
       
    18 set V := (setof{(i,j) in E} i) union (setof{(i,j) in E} j);
       
    19 /* set of nodes */
       
    20 
       
    21 param w{i in V}, >= 0, default 1;
       
    22 /* w[i] is weight of vertex i */
       
    23 
       
    24 var x{i in V}, binary;
       
    25 /* x[i] = 1 means that node i is included into V' */
       
    26 
       
    27 s.t. cov{(i,j) in E}: x[i] + x[j] >= 1;
       
    28 /* each edge (i,j) must have node i or j (or both) in V' */
       
    29 
       
    30 minimize z: sum{i in V} w[i] * x[i];
       
    31 /* we need to minimize the sum of node weights over V' */
       
    32 
       
    33 data;
       
    34 
       
    35 /* These data correspond to an example from [Papadimitriou]. */
       
    36 
       
    37 /* Optimal solution is 6 (greedy heuristic gives 13) */
       
    38 
       
    39 set E := a1 b1, b1 c1, a1 b2, b2 c2, a2 b3, b3 c3, a2 b4, b4 c4, a3 b5,
       
    40          b5 c5, a3 b6, b6 c6, a4 b1, a4 b2, a4 b3, a5 b4, a5 b5, a5 b6,
       
    41          a6 b1, a6 b2, a6 b3, a6 b4, a7 b2, a7 b3, a7 b4, a7 b5, a7 b6;
       
    42 
       
    43 end;