Link theory in manifolds
著者
書誌事項
Link theory in manifolds
(Lecture notes in mathematics, 1669)
Springer, c1997
大学図書館所蔵 全89件
注記
Includes bibliography (p. [158]-161), index, and symbol index
内容説明・目次
内容説明
Any topological theory of knots and links should be based on simple ideas of intersection and linking. In this book, a general theory of link bordism in manifolds and universal constructions of linking numbers in oriented 3-manifolds are developed. In this way, classical concepts of link theory in the 3-spheres are generalized to a certain class of oriented 3-manifolds (submanifolds of rational homology 3-spheres). The techniques needed are described in the book but basic knowledge in topology and algebra is assumed. The book should be of interst to those working in topology, in particular knot theory and low-dimensional topology.
目次
Link bordism in manifolds.- Enumeration of link bordism in 3-manifolds.- Linking number maps.- Surface structures for links in 3-manifolds.- Link invariants in Betti-trivial 3-manifolds.- Link characteristic and band-operations in Betti-trivial 3-manifolds.- 3-dimensional Betti-trivial submanifolds.
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