Title of article
Differential 3-knots in 5-space with and without self-intersections
Author/Authors
Ekholm، نويسنده , , Tobias، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2001
Pages
40
From page
157
To page
196
Abstract
Regular homotopy classes of immersions S3→R5 constitute an infinite cyclic group. The classes containing embeddings form a subgroup of index 24. The obstruction for a generic immersion to be regularly homotopic to an embedding is described in terms of geometric invariants of its self-intersection. Geometric properties of self-intersections are used to construct two invariants J and St of generic immersions which are analogous to Arnoldʹs invariants of plane curves [1]. We prove that J and St are independent first-order invariants and that any first-order invariant is a linear combination of these. As by-products, some invariants of immersions S3→R4 are obtained. Using them, we find restrictions on the topology of self-intersections.
Keywords
IMMERSION , Self-intersection , Finite type invariants , Linking numbers , Strangeness
Journal title
Topology
Serial Year
2001
Journal title
Topology
Record number
1545230
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