The frequency Kis for symmetrical traveling salesman problem

Abstract

The frequency Kis (i∈[4,n]) are studied for symmetric traveling salesman problem (TSP) to characterize the structure properties of the edges in optimal Hamiltonian cycle (OHC). For a given Ki in the complete graph Kn, the frequency Ki is computed with the set of i2 optimal i-vertex paths with fixed endpoints (optimal i-vertex paths) in the Ki. Given an OHC edge related to Ki, it has certain frequency bigger than 12i2 in the frequency Ki, and that of an ordinary edge not in OHC is smaller than 2(n-3). Moreover, given a frequency Ki containing an OHC edge related to Kn, the frequency of the OHC edge is bigger than 12i2 in the average case. It also found that the probability that an OHC edge is contained in the optimal i-vertex paths increases according to i∈ [4, n] or keeps stable if it decreases from i to i+1≤ n. As the frequency Kis are used to compute the frequency of an edge, each OHC edge reaches its own peak frequency at i=P0 where P0=n2 + 2 for even n or n+12 + 1 for odd n. For each ordinary edge out of OHC, the probability that they are contained in the optimal i-vertex paths decreases according to i, respectively, in the average case. Moreover, the probability of an ordinary edge definitely decreases if i ≥ id where id = O(n47) is the smallest number meeting the inequality (n-2)(n-3) - (id-2)(id-3)(n-2)(n-3) - (id-1)(id-2) ≥ 1 + 2id(id+1). Based on these findings, an algorithm is presented to find OHC in O(n2id42id) time using dynamic programming. The experiments are executed to verify these findings with various TSP instances.

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