Quandles and topological pairs : symmetry, knots, and cohomology / Takefumi Nosaka.
2017
QA612.2
Linked e-resources
Linked Resource
Concurrent users
Unlimited
Authorized users
Authorized users
Document Delivery Supplied
Can lend chapters, not whole ebooks
Details
Title
Quandles and topological pairs : symmetry, knots, and cohomology / Takefumi Nosaka.
Author
ISBN
9789811067938 (electronic book)
9811067937 (electronic book)
9789811067921
9811067929
9811067937 (electronic book)
9789811067921
9811067929
Publication Details
Sinagpore : Springer, 2017.
Language
English
Description
1 online resource.
Call Number
QA612.2
Dewey Decimal Classification
514/.2242
Summary
This book surveys quandle theory, starting from basic motivations and going on to introduce recent developments of quandles with topological applications and related topics. The book is written from topological aspects, but it illustrates how esteemed quandle theory is in mathematics, and it constitutes a crash course for studying quandles. More precisely, this work emphasizes the fresh perspective that quandle theory can be useful for the study of low-dimensional topology (e.g., knot theory) and relative objects with symmetry. The direction of research is summarized as “We shall thoroughly (re)interpret the previous studies of relative symmetry in terms of the quandle”. The perspectives contained herein can be summarized by the following topics. The first is on relative objects G/H, where G and H are groups, e.g., polyhedrons, reflection, and symmetric spaces. Next, central extensions of groups are discussed, e.g., spin structures, K2 groups, and some geometric anomalies. The third topic is a method to study relative information on a 3-dimensional manifold with a boundary, e.g., knot theory, relative cup products, and relative group cohomology. For applications in topology, it is shown that from the perspective that some existing results in topology can be recovered from some quandles, a method is provided to diagrammatically compute some “relative homology”. (Such classes since have been considered to be uncomputable and speculative). Furthermore, the book provides a perspective that unifies some previous studies of quandles. The former part of the book explains motivations for studying quandles and discusses basic properties of quandles. The latter focuses on low-dimensional topology or knot theory. Finally, problems and possibilities for future developments of quandle theory are posed.-- Provided by publisher.
Access Note
Access limited to authorized users.
Source of Description
Online resource; title from PDF title page (viewed November 30, 2017).
Series
SpringerBriefs in mathematics.
Available in Other Form
Print version: 9789811067921
Linked Resources
Record Appears in