On the Approximation Ratio of the k-Opt and Lin-Kernighan Algorithm

Abstract

The k-Opt and Lin-Kernighan algorithm are two of the most important local search approaches for the Metric TSP. Both start with an arbitrary tour and make local improvements in each step to get a shorter tour. We show that for any fixed k≥ 3 the approximation ratio of the k-Opt algorithm for Metric TSP is O([k]n). Assuming the Erdos girth conjecture, we prove a matching lower bound of ([k]n). Unconditionally, we obtain matching bounds for k=3,4,6 and a lower bound of (n23k-3). Our most general bounds depend on the values of a function from extremal graph theory and are tight up to a factor logarithmic in the number of vertices unconditionally. Moreover, all the upper bounds also apply to a parameterized generalization of the Lin-Kernighan algorithm with appropriate parameters. We also show that the approximation ratio of k-Opt for Graph TSP is ((n)(n)) and O(((n)(n))2(9)+ε) for all ε>0. For the (1,2)-TSP we give a lower bound of 1110 on the approximation ratio of the k-improv and k-Opt algorithm for arbitrary fixed k.