Gauss Diagram Invariants for Knots and Links (Mathematics and Its Applications (closed)) Buy on Amazon
Facebook LinkedIn

Gauss Diagram Invariants for Knots and Links (Mathematics and Its Applications (closed))

Author T. Fiedler
Publisher Springer
129.00 USD

Usually ships in 24 hours

Book Details
Author(s) T. Fiedler
Publisher Springer
ISBN / ASIN 0792371127
ISBN-13 9780792371120
Availability Usually ships in 24 hours
Sales Rank #5,175,775
Marketplace United States 🇺🇸
Description
This book contains new numerical isotopy invariants for knots in the product of a surface (not necessarily orientable) with a line and for links in 3-space. These invariants, called Gauss diagram invariants, are defined in a combinatorial way using knot diagrams. The natural notion of global knots is introduced. Global knots generalize closed braids. If the surface is not the disc or the sphere then there are Gauss diagram invariants which distinguish knots that cannot be distinguished by quantum invariants. There are specific Gauss diagram invariants of finite type for global knots. These invariants, called T-invariants, separate global knots of some classes and it is conjectured that they separate all global knots. T-invariants cannot be obtained from the (generalized) Kontsevich integral.
Audience: The book is designed for research workers in low-dimensional topology.
Donate to EbookNetworking
No Prev
No Next