Publication detail

An Improved Insertion Heuristic for the Euclidean Minimum Steiner Tree Problem

ŠEDA, M.

Original Title

An Improved Insertion Heuristic for the Euclidean Minimum Steiner Tree Problem

Type

book chapter

Language

English

Original Abstract

The Euclidean Steiner Tree Problem is to find a shortest network spanning a set of fixed points in the plane, allowing the addition of auxiliary points to the set. The problem being NP-hard, polynomial-time approximations or heuristics are required. There are many rather complex heuristics based, e.g., on enumerating full topologies and consuming long time for computations for large instances. In this paper, we applied to use tools of computational geometry, especially the properties of Delaunay triangulation, a well-known geometric structure, and combine them with insertion heuristics based on the construction of the Euclidean minimum spanning tree. Thus an algorithm could be proposed that is very efficient and fast. Experiments confirmed that computations by this algorithm generate very good results in a reasonable amount of time, even for large instances of the studied problem.

Keywords

Steiner tree, spanning tree, Delaunay triangulation, time complexity, NP-hard problems

Authors

ŠEDA, M.

RIV year

2007

Released

31. 12. 2007

Publisher

DAAAM International

Location

Wien (Austria)

ISBN

3-901509-60-7

Book

Katalinic, B. (ed.): DAAAM International Scientific Book 2007

Edition

DAAAM International Scientific Book

Edition number

1

Pages from

501

Pages to

512

Pages count

12

BibTex

@inbook{BUT55432,
  author="Miloš {Šeda}",
  title="An Improved Insertion Heuristic for the Euclidean Minimum Steiner Tree Problem",
  booktitle="Katalinic, B. (ed.): DAAAM International Scientific Book 2007",
  year="2007",
  publisher="DAAAM International",
  address="Wien (Austria)",
  series="DAAAM International Scientific Book",
  edition="1",
  pages="501--512",
  isbn="3-901509-60-7"
}