Minimal NetworksThe Steiner Problem and Its Generalizations
Title | Minimal NetworksThe Steiner Problem and Its Generalizations PDF eBook |
Author | Alexander O. Ivanov |
Publisher | CRC Press |
Pages | 440 |
Release | 1994-03-16 |
Genre | Mathematics |
ISBN | 9780849386428 |
This book focuses on the classic Steiner Problem and illustrates how results of the problem's development have generated the Theory of Minimal Networks, that is systems of "rubber" branching threads of minimal length. This theory demonstrates a brilliant interconnection among differential and computational geometry, topology, variational calculus, and graph theory. All necessary preliminary information is included, and the book's simplified format and nearly 150 illustrations and tables will help readers develop a concrete understanding of the material. All nontrivial statements are proved, and plenty of exercises are included.
Steiner Tree Problems in Computer Communication Networks
Title | Steiner Tree Problems in Computer Communication Networks PDF eBook |
Author | Dingzhu Du |
Publisher | World Scientific |
Pages | 373 |
Release | 2008-01-01 |
Genre | Mathematics |
ISBN | 9812791450 |
The Steiner tree problem is one of the most important combinatorial optimization problems. It has a long history that can be traced back to the famous mathematician Fermat (1601-1665). This book studies three significant breakthroughs on the Steiner tree problem that were achieved in the 1990s, and some important applications of Steiner tree problems in computer communication networks researched in the past fifteen years. It not only covers some of the most recent developments in Steiner tree problems, but also discusses various combinatorial optimization methods, thus providing a balance between theory and practice. Sample Chapter(s). Chapter 1: Minimax Approach and Steiner Ratio (372 KB). Contents: Minimax Approach and Steiner Ratio; k -Steiner Ratios and Better Approximation Algorithms; Geometric Partitions and Polynomial Time Approximation Schemes; Grade of Service Steiner Tree Problem; Steiner Tree Problem for Minimal Steiner Points; Bottleneck Steiner Tree Problem; Steiner k -Tree and k -Path Routing Problems; Steiner Tree Coloring Problem; Steiner Tree Scheduling Problem; Survivable Steiner Network Problem. Readership: Researchers and graduate students of computer science and engineering as well as operations research.
Steiner Minimal Trees
Title | Steiner Minimal Trees PDF eBook |
Author | Dietmar Cieslik |
Publisher | Springer Science & Business Media |
Pages | 327 |
Release | 2013-03-09 |
Genre | Computers |
ISBN | 1475765851 |
The problem of "Shortest Connectivity", which is discussed here, has a long and convoluted history. Many scientists from many fields as well as laymen have stepped on its stage. Usually, the problem is known as Steiner's Problem and it can be described more precisely in the following way: Given a finite set of points in a metric space, search for a network that connects these points with the shortest possible length. This shortest network must be a tree and is called a Steiner Minimal Tree (SMT). It may contain vertices different from the points which are to be connected. Such points are called Steiner points. Steiner's Problem seems disarmingly simple, but it is rich with possibilities and difficulties, even in the simplest case, the Euclidean plane. This is one of the reasons that an enormous volume of literature has been published, starting in 1 the seventeenth century and continuing until today. The difficulty is that we look for the shortest network overall. Minimum span ning networks have been well-studied and solved eompletely in the case where only the given points must be connected. The novelty of Steiner's Problem is that new points, the Steiner points, may be introduced so that an intercon necting network of all these points will be shorter. This also shows that it is impossible to solve the problem with combinatorial and geometric methods alone.
Branching Solutions To One-dimensional Variational Problems
Title | Branching Solutions To One-dimensional Variational Problems PDF eBook |
Author | Alexandr Ivanov |
Publisher | World Scientific |
Pages | 365 |
Release | 2001-01-17 |
Genre | Mathematics |
ISBN | 981449433X |
This book deals with the new class of one-dimensional variational problems — the problems with branching solutions. Instead of extreme curves (mappings of a segment to a manifold) we investigate extreme networks, which are mappings of graphs (one-dimensional cell complexes) to a manifold. Various applications of the approach are presented, such as several generalizations of the famous Steiner problem of finding the shortest network spanning given points of the plane.
Shortest Connectivity
Title | Shortest Connectivity PDF eBook |
Author | Dietmar Cieslik |
Publisher | Springer Science & Business Media |
Pages | 277 |
Release | 2006-06-02 |
Genre | Business & Economics |
ISBN | 0387235396 |
The aim in this graduate level text is to outline the key mathematical concepts that underpin these important questions in applied mathematics. These concepts involve discrete mathematics (particularly graph theory), optimization, computer science, and several ideas in biology.
Knowledge-Based Intelligent Information and Engineering Systems
Title | Knowledge-Based Intelligent Information and Engineering Systems PDF eBook |
Author | Bogdan Gabrys |
Publisher | Springer Science & Business Media |
Pages | 1360 |
Release | 2006-09-27 |
Genre | Business & Economics |
ISBN | 3540465359 |
The three volume set LNAI 4251, LNAI 4252, and LNAI 4253 constitutes the refereed proceedings of the 10th International Conference on Knowledge-Based Intelligent Information and Engineering Systems, KES 2006, held in Bournemouth, UK in October 2006. The 480 revised papers presented were carefully reviewed and selected from about 1400 submissions. The papers present a wealth of original research results from the field of intelligent information processing.
The Steiner Ratio
Title | The Steiner Ratio PDF eBook |
Author | Dietmar Cieslik |
Publisher | Springer Science & Business Media |
Pages | 247 |
Release | 2013-03-14 |
Genre | Computers |
ISBN | 1475767986 |
Steiner's Problem concerns finding a shortest interconnecting network for a finite set of points in a metric space. A solution must be a tree, which is called a Steiner Minimal Tree (SMT), and may contain vertices different from the points which are to be connected. Steiner's Problem is one of the most famous combinatorial-geometrical problems, but unfortunately it is very difficult in terms of combinatorial structure as well as computational complexity. However, if only a Minimum Spanning Tree (MST) without additional vertices in the interconnecting network is sought, then it is simple to solve. So it is of interest to know what the error is if an MST is constructed instead of an SMT. The worst case for this ratio running over all finite sets is called the Steiner ratio of the space. The book concentrates on investigating the Steiner ratio. The goal is to determine, or at least estimate, the Steiner ratio for many different metric spaces. The author shows that the description of the Steiner ratio contains many questions from geometry, optimization, and graph theory. Audience: Researchers in network design, applied optimization, and design of algorithms.