Presentation of the fundamental groups of complements of shadows

Abstract

A shadowed polyhedron is a simple polyhedron equipped with half integers on regions, called gleams, which represents a compact, oriented, smooth $4$-manifold. The polyhedron is embedded in the $4$-manifold and it is called a shadow of that manifold. A subpolyhedron of a shadow represents a possibly singular subsurface in the $4$-manifold. In this paper, we focus on contractible shadows obtained from the unit disk by attaching annuli along generically immersed closed curves on the disk. In this case, the $4$-manifold is always a $4$-ball. Milnor fibers of plane curve singularities and complexified real line arrangements can be represented in this way. We give a presentation of the fundamental group of the complement of a subpolyhedron of such a shadow in the $4$-ball. The method is very similar to the Wirtinger presentation of links in knot theory.