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The Traveling-Salesman Problem and Minimum Spanning Trees

Michael Held1; Richard M. Karp2

1 IBM Systems Research Institute, New York, New York · 2 University of California, Berkeley, California

Operations Research 1970

This paper explores new approaches to the symmetric traveling-salesman problem in which 1-trees, which are a slight variant of spanning trees, play an essential role. A 1-tree is a tree together with an additional vertex connected to the tree by two edges. We observe that (i) a tour is precisely a 1-tree in which each vertex has degree 2, (ii) a minimum 1-tree is easy to compute, and (iii) the transformation on “intercity distances” cij → Cij + πi + πj leaves the traveling-salesman problem invariant but changes the minimum 1-tree. Using these observations, we define an infinite family of lower bounds w(π) on C*, the cost of an optimum tour. We show that maxπw(π) = C* precisely when a certain well-known linear program has an optimal solution in integers. We give a column-generation method and an ascent method for computing maxπw(π), and construct a branch-and-bound method in which the lower bounds w(π) control the search for an optimum tour.

DOI
10.1287/opre.18.6.1138
Volume
18 (6)
Pages
1138-1162
Language
en
Export
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