The random link approximation for the Euclidean traveling salesman problem

Abstract

The traveling salesman problem (TSP) consists of finding the length of the shortest closed tour visiting N ``cities''. We consider the Euclidean TSP where the cities are distributed randomly and independently in a d-dimensional unit hypercube. Working with periodic boundary conditions and inspired by a remarkable universality in the kth nearest neighbor distribution, we find for the average optimum tour length <LE> = betaE(d) N1-1/d [1+O(1/N)] with betaE(2) = 0.7120 +- 0.0002 and betaE(3) = 0.6979 +- 0.0002. We then derive analytical predictions for these quantities using the random link approximation, where the lengths between cities are taken as independent random variables. From the ``cavity'' equations developed by Krauth, Mezard and Parisi, we calculate the associated random link values betaRL(d). For d=1,2,3, numerical results show that the random link approximation is a good one, with a discrepancy of less than 2.1% between betaE(d) and betaRL(d). For large d, we argue that the approximation is exact up to O(1/d2) and give a conjecture for betaE(d), in terms of a power series in 1/d, specifying both leading and subleading coefficients.

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