Francesco Costantino
Published 2005-02-14Version 1
We define and study branched shadows of 4-manifolds as a combination of branched spines of 3-manifolds and Turaev's shadows. We use these objects to combinatorially represent 4-manifolds equipped with $Spin^c$-structures and homotopy classes of almost complex structures. We then use branched shadows to study complex 4-manifolds and prove that each almost complex structure on a 4-handlebody is homotopic to a complex one.
Comments: 24 pages, 9 figures
Bypass attachments and homotopy classes of 2-plane fields in contact topology
An equivalence between the set of graph-knots and the set of homotopy classes of looped graphs
Shadows of acyclic 4-manifolds with sphere boundary
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