Approximate TSP (The Traveling-Salesman Problem)
Revision as of 10:22, 15 February 2023 by Admin (talk | contribs) (Created page with "{{DISPLAYTITLE:Approximate TSP (The Traveling-Salesman Problem)}} == Description == Approximate TSP is the problem of finding an approximate answer to Minimum TSP. In Minimum TSP, you are given a set $C$ of cities and distances between each distinct pair of cities. The goal is to find an ordering or tour of the cities, such that you visit each city exactly once and return to the origin city, that minimizes the length of the tour. This is the typical variation of TSP....")
Description
Approximate TSP is the problem of finding an approximate answer to Minimum TSP.
In Minimum TSP, you are given a set $C$ of cities and distances between each distinct pair of cities. The goal is to find an ordering or tour of the cities, such that you visit each city exactly once and return to the origin city, that minimizes the length of the tour. This is the typical variation of TSP.
Related Problems
Related: Minimum TSP, Maximum TSP
Parameters
V: number of cities (nodes) E: number of roads (edges)
Table of Algorithms
| Name | Year | Time | Space | Approximation Factor | Model | Reference |
|---|---|---|---|---|---|---|
| Applegate et al. | 2006 | $O(V^{2} E)$ | Deterministic | Time | ||
| Johnson; D. S.; McGeoch; L. A. | 1997 | $O({2}^{(p(n)$}) | Deterministic | Time | ||
| Gutina; Gregory; Yeob; Anders; Zverovich; Alexey | 2002 | - | Deterministic | Time | ||
| Rosenkrantz; D. J.; Stearns; R. E.; Lewis; P. M. | 1974 | $O(V^{2})$ | $O({1})$ | 1/2\log n + 1/2 | Deterministic | Time |
| Lin–Kernighan | 1981 | $O(V^{2})$ | $O(V)$ | Deterministic | Time & Space | |
| Christofides algorithm | 1976 | $O(V^{3})$ | $O(V^{2})$??? | 1.5 | Deterministic | Time |