Balanced TSP partitioning
Abstract
The traveling salesman problem (TSP) famously asks for a shortest tour that a salesperson can take to visit a given set of cities in any order. In this paper, we ask how much faster k 2 salespeople can visit the cities if they divide the task among themselves. We show that, in the two-dimensional Euclidean setting, two salespeople can always achieve a speedup of at least 12 + 1π ≈ 0.818, for any given input, and there are inputs where they cannot do better. We also give (non-matching) upper and lower bounds for k ≥ 3.
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