Z2-Thurston norm in Sol manifolds and embeddability of non-orientable surfaces
Abstract
For every Sol manifold M, we determine the Z2-Thurston norm of every element in H2(M;Z2). Each Sol manifold is either a torus bundle over the circle or a torus semi-bundle, thus corresponds to a torus map. We discuss the action of this torus map on a curve complex for the torus, whose edges connect curve classes of intersection number 2. For torus bundles over the circle, the Z2-Thurston norm of any Z2-homology class equals either zero or the minimum translation distance under the action; and for torus semi-bundles, it equals either zero or the translation distance of a specific curve class. Moreover, we construct incompressible surfaces to realize all the Z2-homology classes. As a consequence, for any torus bundle over the circle or torus semi-bundle, we determine which non-orientable closed surfaces can be embedded in it.
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