An ETH-Tight Exact Algorithm for Euclidean TSP

Abstract

We study exact algorithms for Euclidean TSP in Rd. In the early 1990s algorithms with nO(n) running time were presented for the planar case, and some years later an algorithm with nO(n1-1/d) running time was presented for any d≥ 2. Despite significant interest in subexponential exact algorithms over the past decade, there has been no progress on Euclidean TSP, except for a lower bound stating that the problem admits no 2O(n1-1/d-ε) algorithm unless ETH fails. Up to constant factors in the exponent, we settle the complexity of Euclidean TSP by giving a 2O(n1-1/d) algorithm and by showing that a 2o(n1-1/d) algorithm does not exist unless ETH fails.