Quasipositive links and Stein surfaces

We study the generalization of quasipositive links from the three-sphere to arbitrary closed, orientable three-manifolds. Our main result shows that the boundary of any smooth, properly embedded complex curve in a Stein domain is a quasipositive link. This generalizes a result due to Boileau and Ore...

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Veröffentlicht in:	arXiv.org 2020-01
1. Verfasser:	Hayden, Kyle
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Sprache:	eng
Schlagworte:	Links Mathematics - Geometric Topology Mathematics - Symplectic Geometry
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description	We study the generalization of quasipositive links from the three-sphere to arbitrary closed, orientable three-manifolds. Our main result shows that the boundary of any smooth, properly embedded complex curve in a Stein domain is a quasipositive link. This generalizes a result due to Boileau and Orevkov, and it provides the first half of a topological characterization of links in three-manifolds which bound complex curves in a Stein filling. Our arguments replace pseudoholomorphic curve techniques with a study of characteristic and open book foliations on surfaces in three- and four-manifolds.
doi_str_mv	10.48550/arxiv.1703.10150
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subjects	Links Mathematics - Geometric Topology Mathematics - Symplectic Geometry
title	Quasipositive links and Stein surfaces
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