Polynomial one-cocycles for knots and closed braids
著者
書誌事項
Polynomial one-cocycles for knots and closed braids
(Series on knots and everything, v. 64)
World Scientific, c2020
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注記
Publishers of colophon: Singapore
Includes bibliographical references (p. 221-225) and index
内容説明・目次
内容説明
Traditionally, knot theory deals with diagrams of knots and the search of invariants of diagrams which are invariant under the well known Reidemeister moves. This book goes one step beyond: it gives a method to construct invariants for one parameter famillies of diagrams and which are invariant under 'higher' Reidemeister moves. Luckily, knots in 3-space, often called classical knots, can be transformed into knots in the solid torus without loss of information. It turns out that knots in the solid torus have a particular rich topological moduli space. It contains many 'canonical' loops to which the invariants for one parameter families can be applied, in order to get a new sort of invariants for classical knots.
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