Matroids: A Geometric Introduction
Title | Matroids: A Geometric Introduction PDF eBook |
Author | Gary Gordon |
Publisher | Cambridge University Press |
Pages | 411 |
Release | 2012-08-02 |
Genre | Language Arts & Disciplines |
ISBN | 0521145686 |
This friendly introduction helps undergraduate students understand and appreciate matroid theory and its connections to geometry.
Matroid Theory
Title | Matroid Theory PDF eBook |
Author | D. J. A. Welsh |
Publisher | Courier Corporation |
Pages | 450 |
Release | 2010-01-01 |
Genre | Mathematics |
ISBN | 0486474399 |
The theory of matroids connects disparate branches of combinatorial theory and algebra such as graph and lattice theory, combinatorial optimization, and linear algebra. This text describes standard examples and investigation results, and it uses elementary proofs to develop basic matroid properties before advancing to a more sophisticated treatment. 1976 edition.
Matroid Theory
Title | Matroid Theory PDF eBook |
Author | James Oxley |
Publisher | OUP Oxford |
Pages | 0 |
Release | 2011-02-24 |
Genre | Mathematics |
ISBN | 9780199603398 |
This major revision of James Oxley's classic Matroid Theory provides a comprehensive introduction to the subject, covering the basics to more advanced topics. With over 700 exercises and proofs of all relevant major theorems, this book is the ideal reference and class text for academics and graduate students in mathematics and computer science.
Theory of Matroids
Title | Theory of Matroids PDF eBook |
Author | Neil White |
Publisher | Cambridge University Press |
Pages | 341 |
Release | 1986-04-03 |
Genre | Mathematics |
ISBN | 0521309379 |
The theory of matroids is unique in the extent to which it connects such disparate branches of combinatorial theory and algebra as graph theory, lattice theory, design theory, combinatorial optimization, linear algebra, group theory, ring theory and field theory. Furthermore, matroid theory is alone among mathematical theories because of the number and variety of its equivalent axiom systems. Indeed, matroids are amazingly versatile and the approaches to the subject are varied and numerous. This book is a primer in the basic axioms and constructions of matroids. The contributions by various leaders in the field include chapters on axiom systems, lattices, basis exchange properties, orthogonality, graphs and networks, constructions, maps, semi-modular functions and an appendix on cryptomorphisms. The authors have concentrated on giving a lucid exposition of the individual topics; explanations of theorems are preferred to complete proofs and original work is thoroughly referenced. In addition, exercises are included for each topic.
Matroid Theory and its Applications in Electric Network Theory and in Statics
Title | Matroid Theory and its Applications in Electric Network Theory and in Statics PDF eBook |
Author | Andras Recski |
Publisher | Springer Science & Business Media |
Pages | 542 |
Release | 2013-06-29 |
Genre | Mathematics |
ISBN | 3662221438 |
I. The topics of this book The concept of a matroid has been known for more than five decades. Whitney (1935) introduced it as a common generalization of graphs and matrices. In the last two decades, it has become clear how important the concept is, for the following reasons: (1) Combinatorics (or discrete mathematics) was considered by many to be a collection of interesting, sometimes deep, but mostly unrelated ideas. However, like other branches of mathematics, combinatorics also encompasses some gen eral tools that can be learned and then applied, to various problems. Matroid theory is one of these tools. (2) Within combinatorics, the relative importance of algorithms has in creased with the spread of computers. Classical analysis did not even consider problems where "only" a finite number of cases were to be studied. Now such problems are not only considered, but their complexity is often analyzed in con siderable detail. Some questions of this type (for example, the determination of when the so called "greedy" algorithm is optimal) cannot even be answered without matroidal tools.
A Source Book in Matroid Theory
Title | A Source Book in Matroid Theory PDF eBook |
Author | Joseph P. S. Kung |
Publisher | |
Pages | 424 |
Release | 1986 |
Genre | Matroids |
ISBN |
Matrices and Matroids for Systems Analysis
Title | Matrices and Matroids for Systems Analysis PDF eBook |
Author | Kazuo Murota |
Publisher | Springer Science & Business Media |
Pages | 500 |
Release | 1999-11-29 |
Genre | Mathematics |
ISBN | 9783540660248 |
A matroid is an abstract mathematical structure that captures combinatorial properties of matrices. This book offers a unique introduction to matroid theory, emphasizing motivations from matrix theory and applications to systems analysis. This book serves also as a comprehensive presentation of the theory and application of mixed matrices, developed primarily by the present author in the 1990's. A mixed matrix is a convenient mathematical tool for systems analysis, compatible with the physical observation that "fixed constants" and "system parameters" are to be distinguished in the description of engineering systems. This book will be extremely useful to graduate students and researchers in engineering, mathematics and computer science. From the reviews: "...The book has been prepared very carefully, contains a lot of interesting results and is highly recommended for graduate and postgraduate students." András Recski, Mathematical Reviews Clippings 2000m:93006