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JCO
1998
1998
The Travelling Salesman Problem on Permuted Monge Matrices
We consider traveling salesman problems (TSPs) with a permuted Monge matrix as cost matrix where the associated patching graph has a specially simple structure: a multistar, a multitree or a planar graph. In the case of multistars, we give a complete, concise and simplified presentation of Gaikov’s theory. These results are then used for designing an O(m3 + mn) algorithm in the case of multitrees, where n is the number of cities and m is the number of subtours in an optimal assignment. Moreover we show that for planar patching graphs, the problem of finding an optimal subtour patching remains NP-complete.
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| Added | 22 Dec 2010 |
| Updated | 22 Dec 2010 |
| Type | Journal |
| Year | 1998 |
| Where | JCO |
| Authors | Rainer E. Burkard, Vladimir G. Deineko, Gerhard J. Woeginger |
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