Fill in the cost matrix of an assignment problem and click on 'Solve'. The optimal assignment will be determined and a step by step explanation of the hungarian algorithm will be given.
Fill in the cost matrix (random cost matrix):
This is the cost matrix.
| 55 | 85 | 7 | 98 | 69 |
| 68 | 20 | 78 | 66 | 42 |
| 2 | 7 | 91 | 19 | 13 |
| 68 | 66 | 85 | 44 | 96 |
| 80 | 52 | 25 | 4 | 26 |
For each row, the minimum element is subtracted from all elements in that row.
| 48 | 78 | 0 | 91 | 62 | (-7) |
| 48 | 0 | 58 | 46 | 22 | (-20) |
| 0 | 5 | 89 | 17 | 11 | (-2) |
| 24 | 22 | 41 | 0 | 52 | (-44) |
| 76 | 48 | 21 | 0 | 22 | (-4) |
For each column, the minimum element is subtracted from all elements in that column.
| 48 | 78 | 0 | 91 | 51 |
| 48 | 0 | 58 | 46 | 11 |
| 0 | 5 | 89 | 17 | 0 |
| 24 | 22 | 41 | 0 | 41 |
| 76 | 48 | 21 | 0 | 11 |
| (-11) |
A total of 4 lines are required to cover all zeros.
| 48 | 78 | 0 | 91 | 51 | x |
| 48 | 0 | 58 | 46 | 11 | x |
| 0 | 5 | 89 | 17 | 0 | x |
| 24 | 22 | 41 | 0 | 41 | |
| 76 | 48 | 21 | 0 | 11 | |
| x |
The number of lines is smaller than 5. The smallest uncovered element is 11. We subtract this value from all uncovered elements and add it to all elements covered twice.
| 48 | 78 | 0 | 102 | 51 |
| 48 | 0 | 58 | 57 | 11 |
| 0 | 5 | 89 | 28 | 0 |
| 13 | 11 | 30 | 0 | 30 |
| 65 | 37 | 10 | 0 | 0 |
A total of 5 lines are required to cover all zeros.
| 48 | 78 | 0 | 102 | 51 | x |
| 48 | 0 | 58 | 57 | 11 | x |
| 0 | 5 | 89 | 28 | 0 | x |
| 13 | 11 | 30 | 0 | 30 | x |
| 65 | 37 | 10 | 0 | 0 | x |
Because there are 5 lines required, an optimal assignment exists among the zeros.
| 48 | 78 | 0 | 102 | 51 |
| 48 | 0 | 58 | 57 | 11 |
| 0 | 5 | 89 | 28 | 0 |
| 13 | 11 | 30 | 0 | 30 |
| 65 | 37 | 10 | 0 | 0 |
This corresponds to the following optimal assignment in the original cost matrix.
| 55 | 85 | 7 | 98 | 69 |
| 68 | 20 | 78 | 66 | 42 |
| 2 | 7 | 91 | 19 | 13 |
| 68 | 66 | 85 | 44 | 96 |
| 80 | 52 | 25 | 4 | 26 |
The total minimum cost is 99.