[9] | 1 | /* SPP, Shortest Path Problem */ |
---|
| 2 | |
---|
| 3 | /* Written in GNU MathProg by Andrew Makhorin <mao@gnu.org> */ |
---|
| 4 | |
---|
| 5 | /* Given a directed graph G = (V,E), its edge lengths c(i,j) for all |
---|
| 6 | (i,j) in E, and two nodes s, t in V, the Shortest Path Problem (SPP) |
---|
| 7 | is to find a directed path from s to t whose length is minimal. */ |
---|
| 8 | |
---|
| 9 | param n, integer, > 0; |
---|
| 10 | /* number of nodes */ |
---|
| 11 | |
---|
| 12 | set E, within {i in 1..n, j in 1..n}; |
---|
| 13 | /* set of edges */ |
---|
| 14 | |
---|
| 15 | param c{(i,j) in E}; |
---|
| 16 | /* c[i,j] is length of edge (i,j); note that edge lengths are allowed |
---|
| 17 | to be of any sign (positive, negative, or zero) */ |
---|
| 18 | |
---|
| 19 | param s, in {1..n}; |
---|
| 20 | /* source node */ |
---|
| 21 | |
---|
| 22 | param t, in {1..n}; |
---|
| 23 | /* target node */ |
---|
| 24 | |
---|
| 25 | var x{(i,j) in E}, >= 0; |
---|
| 26 | /* x[i,j] = 1 means that edge (i,j) belong to shortest path; |
---|
| 27 | x[i,j] = 0 means that edge (i,j) does not belong to shortest path; |
---|
| 28 | note that variables x[i,j] are binary, however, there is no need to |
---|
| 29 | declare them so due to the totally unimodular constraint matrix */ |
---|
| 30 | |
---|
| 31 | s.t. r{i in 1..n}: sum{(j,i) in E} x[j,i] + (if i = s then 1) = |
---|
| 32 | sum{(i,j) in E} x[i,j] + (if i = t then 1); |
---|
| 33 | /* conservation conditions for unity flow from s to t; every feasible |
---|
| 34 | solution is a path from s to t */ |
---|
| 35 | |
---|
| 36 | minimize Z: sum{(i,j) in E} c[i,j] * x[i,j]; |
---|
| 37 | /* objective function is the path length to be minimized */ |
---|
| 38 | |
---|
| 39 | data; |
---|
| 40 | |
---|
| 41 | /* Optimal solution is 20 that corresponds to the following shortest |
---|
| 42 | path: s = 1 -> 2 -> 4 -> 8 -> 6 = t */ |
---|
| 43 | |
---|
| 44 | param n := 8; |
---|
| 45 | |
---|
| 46 | param s := 1; |
---|
| 47 | |
---|
| 48 | param t := 6; |
---|
| 49 | |
---|
| 50 | param : E : c := |
---|
| 51 | 1 2 1 |
---|
| 52 | 1 4 8 |
---|
| 53 | 1 7 6 |
---|
| 54 | 2 4 2 |
---|
| 55 | 3 2 14 |
---|
| 56 | 3 4 10 |
---|
| 57 | 3 5 6 |
---|
| 58 | 3 6 19 |
---|
| 59 | 4 5 8 |
---|
| 60 | 4 8 13 |
---|
| 61 | 5 8 12 |
---|
| 62 | 6 5 7 |
---|
| 63 | 7 4 5 |
---|
| 64 | 8 6 4 |
---|
| 65 | 8 7 10; |
---|
| 66 | |
---|
| 67 | end; |
---|