The Complex of Hypersurfaces in a Homology Class

Abstract

For a compact oriented smooth n-manifold M and a codimension-1 homology class φ ∈ Hn-1(M, ∂ M), we investigate a simplicial complex S(M, φ) relating the properly embedded hypersurfaces in M representing φ. Its definition is akin to that of other classical complexes, such as the curve complex of a surface or the Kakimizu complex of a knot, with the difference that hypersurfaces are not taken up to isotopy. We prove that S(M, φ) is connected and simply connected in every dimension n. We also show connectedness of a similar complex T(M, φ) adapted to the 3-dimensional case, where only Thurston norm-realizing surfaces are considered. The connectedness results are transported to the complexes S(M, φ), T(M, φ) where hypersurfaces are taken up to isotopy, and for n=2 the simple connectedness result carries over as well. We also briefly discuss extensions to a context studied by Turaev, where regular graphs in 2-complexes are used to represent 1-dimensional cohomology classes. We finish with two applications: we give an alternative proof of the fact that all Seifert surfaces for a fixed knot in a rational homology sphere are tube-equivalent, and we use connectedness of T(M, φ) to define a new 2-invariant of 2-dimensional homology classes in irreducible and boundary-irreducible oriented compact connected 3-manifolds with empty or toroidal boundary.