Linking and coincidence invariants
Abstract
Given a link map f into a manifold of the form Q = N × R, when can it be deformed to an unlinked position (in some sense, e.g. where its components map to disjoint R-levels) ? Using the language of normal bordism theory as well as the path space approach of Hatcher and Quinn we define obstructions ωε (f), ε = + or ε = -, which often answer this question completely and which, in addition, turn out to distinguish a great number of different link homotopy classes. In certain cases they even allow a complete link homotopy classification. Our development parallels recent advances in Nielsen coincidence theory and leads also to the notion of Nielsen numbers of link maps. In the special case when N is a product of spheres sample calculations are carried out. They involve the homotopy theory of spheres and, in particular, James--Hopf--invariants.
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