The Traveling Salesman Problem Under Squared Euclidean Distances

Abstract

Let P be a set of points in Rd, and let α 1 be a real number. We define the distance between two points p,q∈ P as |pq|α, where |pq| denotes the standard Euclidean distance between p and q. We denote the traveling salesman problem under this distance function by TSP(d,α). We design a 5-approximation algorithm for TSP(2,2) and generalize this result to obtain an approximation factor of 3α-1+6α/3 for d=2 and all α2. We also study the variant Rev-TSP of the problem where the traveling salesman is allowed to revisit points. We present a polynomial-time approximation scheme for Rev-TSP(2,α) with α2, and we show that Rev-TSP(d, α) is APX-hard if d3 and α>1. The APX-hardness proof carries over to TSP(d, α) for the same parameter ranges.