From Chinese Postman to Salesman and Beyond I: Approximating Shortest Tours δ-Covering All Points on All Edges

Abstract

A well-studied continuous model of graphs, introduced by Dearing and Francis [Transportation Science, 1974], considers each edge as a continuous unit-length interval of points. For δ ≥ 0, we introduce the problem δ-Tour, where the objective is to find the shortest tour that comes within a distance of δ of every point on every edge. It can be observed that 0-Tour is essentially equivalent to the Chinese Postman Problem, which is solvable in polynomial time. In contrast, 1/2-Tour is essentially equivalent to the Graphic Traveling Salesman Problem (TSP), which is NP-hard but admits a constant-factor approximation in polynomial time. We investigate δ-Tour for other values of δ, noting that the problem's behavior and the insights required to understand it differ significantly across various δ regimes. We design polynomial-time approximation algorithms summarized as follows: (1) For every fixed 0 < δ < 3/2, the problem δ-Tour admits a constant-factor approximation. (2) For every fixed δ ≥ 3/2, the problem admits an O(n)-approximation. (3) If δ is considered to be part of the input, then the problem admits an O(3n)-approximation. This is the first of two articles on the δ-Tour problem. In the second one we complement the approximation algorithms presented here with inapproximability results and related to parameterized complexity.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…