Knot Groups

Knot Groups

Author: Lee Paul Neuwirth

Publisher: Princeton University Press

Published: 1965-03-21

Total Pages: 124

ISBN-13: 9780691079912

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The description for this book, Knot Groups. Annals of Mathematics Studies. (AM-56), Volume 56, will be forthcoming.


Punctured Torus Groups and 2-Bridge Knot Groups (I)

Punctured Torus Groups and 2-Bridge Knot Groups (I)

Author: Hirotaka Akiyoshi

Publisher: Lecture Notes in Mathematics

Published: 2007

Total Pages: 308

ISBN-13:

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Here is the first part of a work that provides a full account of Jorgensen's theory of punctured torus Kleinian groups and its generalization. It offers an elementary and self-contained description of Jorgensen's theory with a complete proof. Through various informative illustrations, readers are naturally led to an intuitive, synthetic grasp of the theory, which clarifies how a very simple fuchsian group evolves into complicated Kleinian groups.


2-Knots and Their Groups

2-Knots and Their Groups

Author: Jonathan Hillman

Publisher: CUP Archive

Published: 1989-03-30

Total Pages: 180

ISBN-13: 9780521378123

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To attack certain problems in 4-dimensional knot theory the author draws on a variety of techniques, focusing on knots in S^T4, whose fundamental groups contain abelian normal subgroups. Their class contains the most geometrically appealing and best understood examples. Moreover, it is possible to apply work in algebraic methods to these problems. Work in four-dimensional topology is applied in later chapters to the problem of classifying 2-knots.


Knot Theory

Knot Theory

Author: Vassily Olegovich Manturov

Publisher: CRC Press

Published: 2004-02-24

Total Pages: 417

ISBN-13: 0203402847

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Since discovery of the Jones polynomial, knot theory has enjoyed a virtual explosion of important results and now plays a significant role in modern mathematics. In a unique presentation with contents not found in any other monograph, Knot Theory describes, with full proofs, the main concepts and the latest investigations in the field. The book is divided into six thematic sections. The first part discusses "pre-Vassiliev" knot theory, from knot arithmetics through the Jones polynomial and the famous Kauffman-Murasugi theorem. The second part explores braid theory, including braids in different spaces and simple word recognition algorithms. A section devoted to the Vassiliev knot invariants follows, wherein the author proves that Vassiliev invariants are stronger than all polynomial invariants and introduces Bar-Natan's theory on Lie algebra respresentations and knots. The fourth part describes a new way, proposed by the author, to encode knots by d-diagrams. This method allows the encoding of topological objects by words in a finite alphabet. Part Five delves into virtual knot theory and virtualizations of knot and link invariants. This section includes the author's own important results regarding new invariants of virtual knots. The book concludes with an introduction to knots in 3-manifolds and Legendrian knots and links, including Chekanov's differential graded algebra (DGA) construction. Knot Theory is notable not only for its expert presentation of knot theory's state of the art but also for its accessibility. It is valuable as a professional reference and will serve equally well as a text for a course on knot theory.


Punctured Torus Groups and 2-Bridge Knot Groups (I)

Punctured Torus Groups and 2-Bridge Knot Groups (I)

Author: Hirotaka Akiyoshi

Publisher: Springer

Published: 2007-05-26

Total Pages: 293

ISBN-13: 3540718079

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Here is the first part of a work that provides a full account of Jorgensen's theory of punctured torus Kleinian groups and its generalization. It offers an elementary and self-contained description of Jorgensen's theory with a complete proof. Through various informative illustrations, readers are naturally led to an intuitive, synthetic grasp of the theory, which clarifies how a very simple fuchsian group evolves into complicated Kleinian groups.


Knot Theory

Knot Theory

Author: Charles Livingston

Publisher: Cambridge University Press

Published: 1993

Total Pages: 276

ISBN-13: 9780883850275

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This book uses only linear algebra and basic group theory to study the properties of knots.


Braid and Knot Theory in Dimension Four

Braid and Knot Theory in Dimension Four

Author: Seiichi Kamada

Publisher: American Mathematical Soc.

Published: 2002

Total Pages: 329

ISBN-13: 0821829696

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Braid theory and knot theory are related via two famous results due to Alexander and Markov. Alexander's theorem states that any knot or link can be put into braid form. Markov's theorem gives necessary and sufficient conditions to conclude that two braids represent the same knot or link. Thus, one can use braid theory to study knot theory and vice versa. In this book, the author generalizes braid theory to dimension four. He develops the theory of surface braids and applies it tostudy surface links. In particular, the generalized Alexander and Markov theorems in dimension four are given. This book is the first to contain a complete proof of the generalized Markov theorem. Surface links are studied via the motion picture method, and some important techniques of this method arestudied. For surface braids, various methods to describe them are introduced and developed: the motion picture method, the chart description, the braid monodromy, and the braid system. These tools are fundamental to understanding and computing invariants of surface braids and surface links. Included is a table of knotted surfaces with a computation of Alexander polynomials. Braid techniques are extended to represent link homotopy classes. The book is geared toward a wide audience, from graduatestudents to specialists. It would make a suitable text for a graduate course and a valuable resource for researchers.


A Survey of Knot Theory

A Survey of Knot Theory

Author: Akio Kawauchi

Publisher: Birkhäuser

Published: 2012-12-06

Total Pages: 431

ISBN-13: 3034892276

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Knot theory is a rapidly developing field of research with many applications, not only for mathematics. The present volume, written by a well-known specialist, gives a complete survey of this theory from its very beginnings to today's most recent research results. An indispensable book for everyone concerned with knot theory.