Algebraic And Combinatorial Methods In Operations Research Proceedings Of The Workshop On Algebraic Structures In Operations Research

Algebraic and Combinatorial Methods in Operations Research

Author : R.E. Burkard

Publisher : Elsevier

Page : 393 pages

File Size : 15,28 MB

Release : 1984-01-01

Category : Mathematics

ISBN : 0080872069

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Book Description

For the first time, this book unites different algebraic approaches for discrete optimization and operations research. The presentation of some fundamental directions of this new fast developing area shows the wide range of its applicability. Specifically, the book contains contributions in the following fields: semigroup and semiring theory applied to combinatorial and integer programming, network flow theory in ordered algebraic structures, extremal optimization problems, decomposition principles for discrete structures, Boolean methods in graph theory and applications.





Combinatorial Optimization

Author : Alexander Schrijver

Publisher : Springer Science & Business Media

Page : 2024 pages

File Size : 21,2 MB

Release : 2003-02-12

Category : Business & Economics

ISBN : 9783540443896

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Book Description

From the reviews: "About 30 years ago, when I was a student, the first book on combinatorial optimization came out referred to as "the Lawler" simply. I think that now, with this volume Springer has landed a coup: "The Schrijver". The box is offered for less than 90.- EURO, which to my opinion is one of the best deals after the introduction of this currency." OR-Spectrum





Books in Print

Author :

Publisher :

Page : 2132 pages

File Size : 14,68 MB

Release : 1994

Category : American literature

ISBN :

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Combinatorial Methods in Topology and Algebra

Author : Bruno Benedetti

Publisher : Springer

Page : 222 pages

File Size : 48,91 MB

Release : 2015-10-31

Category : Mathematics

ISBN : 3319201557

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Book Description

Combinatorics plays a prominent role in contemporary mathematics, due to the vibrant development it has experienced in the last two decades and its many interactions with other subjects. This book arises from the INdAM conference "CoMeTA 2013 - Combinatorial Methods in Topology and Algebra,'' which was held in Cortona in September 2013. The event brought together emerging and leading researchers at the crossroads of Combinatorics, Topology and Algebra, with a particular focus on new trends in subjects such as: hyperplane arrangements; discrete geometry and combinatorial topology; polytope theory and triangulations of manifolds; combinatorial algebraic geometry and commutative algebra; algebraic combinatorics; and combinatorial representation theory. The book is divided into two parts. The first expands on the topics discussed at the conference by providing additional background and explanations, while the second presents original contributions on new trends in the topics addressed by the conference.



Combinatorial Methods

Author : Alexander Mikhalev

Publisher : Springer Science & Business Media

Page : 336 pages

File Size : 11,28 MB

Release : 2004

Category : Mathematics

ISBN : 9780387405629

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Book Description

The main purpose of this book is to show how ideas from combinatorial group theory have spread to two other areas of mathematics: the theory of Lie algebras and affine algebraic geometry. Some of these ideas, in turn, came to combinatorial group theory from low-dimensional topology in the beginning of the 20th Century. This book is divided into three fairly independent parts. Part I provides a brief exposition of several classical techniques in combinatorial group theory, namely, methods of Nielsen, Whitehead, and Tietze. Part II contains the main focus of the book. Here the authors show how the aforementioned techniques of combinatorial group theory found their way into affine algebraic geometry, a fascinating area of mathematics that studies polynomials and polynomial mappings. Part III illustrates how ideas from combinatorial group theory contributed to the theory of free algebras. The focus here is on Schreier varieties of algebras (a variety of algebras is said to be Schreier if any subalgebra of a free algebra of this variety is free in the same variety of algebras).