Introduction To Combinatorial Methods In Geometry
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Author |
: Alexander Kharazishvili |
Publisher |
: CRC Press |
Total Pages |
: 397 |
Release |
: 2024-05-07 |
ISBN-10 |
: 9781040014264 |
ISBN-13 |
: 1040014267 |
Rating |
: 4/5 (64 Downloads) |
Synopsis Introduction to Combinatorial Methods in Geometry by : Alexander Kharazishvili
This book offers an introduction to some combinatorial (also, set-theoretical) approaches and methods in geometry of the Euclidean space Rm. The topics discussed in the manuscript are due to the field of combinatorial and convex geometry. The author’s primary intention is to discuss those themes of Euclidean geometry which might be of interest to a sufficiently wide audience of potential readers. Accordingly, the material is explained in a simple and elementary form completely accessible to the college and university students. At the same time, the author reveals profound interactions between various facts and statements from different areas of mathematics: the theory of convex sets, finite and infinite combinatorics, graph theory, measure theory, classical number theory, etc. All chapters (and also the five Appendices) end with a number of exercises. These provide the reader with some additional information about topics considered in the main text of this book. Naturally, the exercises vary in their difficulty. Among them there are almost trivial, standard, nontrivial, rather difficult, and difficult. As a rule, more difficult exercises are marked by asterisks and are provided with necessary hints. The material presented is based on the lecture course given by the author. The choice of material serves to demonstrate the unity of mathematics and variety of unexpected interrelations between distinct mathematical branches.
Author |
: János Pach |
Publisher |
: John Wiley & Sons |
Total Pages |
: 376 |
Release |
: 2011-10-18 |
ISBN-10 |
: 9781118031360 |
ISBN-13 |
: 1118031369 |
Rating |
: 4/5 (60 Downloads) |
Synopsis Combinatorial Geometry by : János Pach
A complete, self-contained introduction to a powerful and resurgingmathematical discipline . Combinatorial Geometry presents andexplains with complete proofs some of the most important resultsand methods of this relatively young mathematical discipline,started by Minkowski, Fejes Toth, Rogers, and Erd???s. Nearly halfthe results presented in this book were discovered over the pasttwenty years, and most have never before appeared in any monograph.Combinatorial Geometry will be of particular interest tomathematicians, computer scientists, physicists, and materialsscientists interested in computational geometry, robotics, sceneanalysis, and computer-aided design. It is also a superb textbook,complete with end-of-chapter problems and hints to their solutionsthat help students clarify their understanding and test theirmastery of the material. Topics covered include: * Geometric number theory * Packing and covering with congruent convex disks * Extremal graph and hypergraph theory * Distribution of distances among finitely many points * Epsilon-nets and Vapnik--Chervonenkis dimension * Geometric graph theory * Geometric discrepancy theory * And much more
Author |
: Ezra Miller |
Publisher |
: American Mathematical Soc. |
Total Pages |
: 705 |
Release |
: 2007 |
ISBN-10 |
: 9780821837368 |
ISBN-13 |
: 0821837362 |
Rating |
: 4/5 (68 Downloads) |
Synopsis Geometric Combinatorics by : Ezra Miller
Geometric combinatorics describes a wide area of mathematics that is primarily the study of geometric objects and their combinatorial structure. This text is a compilation of expository articles at the interface between combinatorics and geometry.
Author |
: Alexander Mikhalev |
Publisher |
: Springer Science & Business Media |
Total Pages |
: 336 |
Release |
: 2004 |
ISBN-10 |
: 0387405623 |
ISBN-13 |
: 9780387405629 |
Rating |
: 4/5 (23 Downloads) |
Synopsis Combinatorial Methods by : Alexander Mikhalev
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).
Author |
: Alexander Kharazishvili |
Publisher |
: |
Total Pages |
: 0 |
Release |
: 2024 |
ISBN-10 |
: 1032594705 |
ISBN-13 |
: 9781032594705 |
Rating |
: 4/5 (05 Downloads) |
Synopsis Introduction to Combinatorial Methods in Geometry by : Alexander Kharazishvili
"The author's primary intention is to discuss those themes of Euclidean geometry which might be of interest to a sufficiently wide audience of potential readers. Accordingly, the material is explained in a simple and elementary form completely accessible to the college and university students. At the same time, the author reveals profound interactions between various facts and statements from different areas of mathematics: the theory of convex sets, finite and infinite combinatorics, graph theory, measure theory, classical number theory, etc. All chapters (and also the five Appendixes) end with a number of exercises. These provide the reader with some additional information about topics considered in the main text of this book. Naturally, the exercises vary in their difficulty. Among them there are almost trivial, standard, nontrivial, rather difficult, and difficult. As a rule, more or less difficult exercises are marked by asterisks and are provided with necessary hints. The material presented is based on the lecture course given by the author. The choice of material serves to demonstrate the unity of mathematics and variety of unexpected interrelations between distinct mathematical branches"--
Author |
: Martin J. Erickson |
Publisher |
: John Wiley & Sons |
Total Pages |
: 210 |
Release |
: 2011-10-24 |
ISBN-10 |
: 9781118030899 |
ISBN-13 |
: 1118030893 |
Rating |
: 4/5 (99 Downloads) |
Synopsis Introduction to Combinatorics by : Martin J. Erickson
This gradual, systematic introduction to the main concepts of combinatorics is the ideal text for advanced undergraduate and early graduate courses in this subject. Each of the book's three sections--Existence, Enumeration, and Construction--begins with a simply stated first principle, which is then developed step by step until it leads to one of the three major achievements of combinatorics: Van der Waerden's theorem on arithmetic progressions, Polya's graph enumeration formula, and Leech's 24-dimensional lattice. Along the way, Professor Martin J. Erickson introduces fundamental results, discusses interconnection and problem-solving techniques, and collects and disseminates open problems that raise new and innovative questions and observations. His carefully chosen end-of-chapter exercises demonstrate the applicability of combinatorial methods to a wide variety of problems, including many drawn from the William Lowell Putnam Mathematical Competition. Many important combinatorial methods are revisited several times in the course of the text--in exercises and examples as well as theorems and proofs. This repetition enables students to build confidence and reinforce their understanding of complex material. Mathematicians, statisticians, and computer scientists profit greatly from a solid foundation in combinatorics. Introduction to Combinatorics builds that foundation in an orderly, methodical, and highly accessible manner.
Author |
: Dimitry Kozlov |
Publisher |
: Springer Science & Business Media |
Total Pages |
: 416 |
Release |
: 2008-01-08 |
ISBN-10 |
: 3540730516 |
ISBN-13 |
: 9783540730514 |
Rating |
: 4/5 (16 Downloads) |
Synopsis Combinatorial Algebraic Topology by : Dimitry Kozlov
This volume is the first comprehensive treatment of combinatorial algebraic topology in book form. The first part of the book constitutes a swift walk through the main tools of algebraic topology. Readers - graduate students and working mathematicians alike - will probably find particularly useful the second part, which contains an in-depth discussion of the major research techniques of combinatorial algebraic topology. Although applications are sprinkled throughout the second part, they are principal focus of the third part, which is entirely devoted to developing the topological structure theory for graph homomorphisms.
Author |
: Bruce E. Sagan |
Publisher |
: American Mathematical Soc. |
Total Pages |
: 304 |
Release |
: 2020-10-16 |
ISBN-10 |
: 9781470460327 |
ISBN-13 |
: 1470460327 |
Rating |
: 4/5 (27 Downloads) |
Synopsis Combinatorics: The Art of Counting by : Bruce E. Sagan
This book is a gentle introduction to the enumerative part of combinatorics suitable for study at the advanced undergraduate or beginning graduate level. In addition to covering all the standard techniques for counting combinatorial objects, the text contains material from the research literature which has never before appeared in print, such as the use of quotient posets to study the Möbius function and characteristic polynomial of a partially ordered set, or the connection between quasisymmetric functions and pattern avoidance. The book assumes minimal background, and a first course in abstract algebra should suffice. The exposition is very reader friendly: keeping a moderate pace, using lots of examples, emphasizing recurring themes, and frankly expressing the delight the author takes in mathematics in general and combinatorics in particular.
Author |
: Theodore G. Faticoni |
Publisher |
: John Wiley & Sons |
Total Pages |
: 204 |
Release |
: 2014-08-21 |
ISBN-10 |
: 9781118407486 |
ISBN-13 |
: 1118407482 |
Rating |
: 4/5 (86 Downloads) |
Synopsis Combinatorics by : Theodore G. Faticoni
Bridges combinatorics and probability and uniquely includes detailed formulas and proofs to promote mathematical thinking Combinatorics: An Introduction introduces readers to counting combinatorics, offers examples that feature unique approaches and ideas, and presents case-by-case methods for solving problems. Detailing how combinatorial problems arise in many areas of pure mathematics, most notably in algebra, probability theory, topology, and geometry, this book provides discussion on logic and paradoxes; sets and set notations; power sets and their cardinality; Venn diagrams; the multiplication principal; and permutations, combinations, and problems combining the multiplication principal. Additional features of this enlightening introduction include: Worked examples, proofs, and exercises in every chapter Detailed explanations of formulas to promote fundamental understanding Promotion of mathematical thinking by examining presented ideas and seeing proofs before reaching conclusions Elementary applications that do not advance beyond the use of Venn diagrams, the inclusion/exclusion formula, the multiplication principal, permutations, and combinations Combinatorics: An Introduction is an excellent book for discrete and finite mathematics courses at the upper-undergraduate level. This book is also ideal for readers who wish to better understand the various applications of elementary combinatorics.
Author |
: Martin W. Liebeck |
Publisher |
: Cambridge University Press |
Total Pages |
: 505 |
Release |
: 1992-09-10 |
ISBN-10 |
: 9780521406857 |
ISBN-13 |
: 0521406854 |
Rating |
: 4/5 (57 Downloads) |
Synopsis Groups, Combinatorics and Geometry by : Martin W. Liebeck
This volume contains a collection of papers on the subject of the classification of finite simple groups.