The Approximation Ratio of the k-Opt Heuristic for the Euclidean Traveling Salesman Problem

Abstract

The k-Opt heuristic is a simple improvement heuristic for the Traveling Salesman Problem. It starts with an arbitrary tour and then repeatedly replaces k edges of the tour by k other edges, as long as this yields a shorter tour. We will prove that for 2-dimensional Euclidean Traveling Salesman Problems with n cities the approximation ratio of the k-Opt heuristic is ( n / n). This improves the upper bound of O( n) given by Chandra, Karloff, and Tovey in 1999 and provides for the first time a non-trivial lower bound for the case k 3. Our results not only hold for the Euclidean norm but extend to arbitrary p-norms with 1 p < ∞.